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Difference between revisions of "Compressors"
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− | This page provides an overview of the primary categories of natural gas compressor services and a description of the different classifications and types of compressors available to the industry. Adiabatic and polytropic compression theory are discussed with supporting definition of terminology. | + | This page provides an overview of the primary categories of natural gas compressor services and a description of the different classifications and types of compressors available to the industry. Adiabatic and polytropic compression theory are discussed with supporting definition of terminology. |
+ | |||
+ | == Compression theory == | ||
− | |||
Specific topics relating to compression theory include: | Specific topics relating to compression theory include: | ||
− | * Power requirement | + | *Power requirement |
− | * Isentropic exponent | + | *Isentropic exponent |
− | * Compressibility factor | + | *Compressibility factor |
− | * Intercooling | + | *Intercooling |
− | * Adiabatic and polytropic efficiency | + | *Adiabatic and polytropic efficiency |
− | * Actual and standard volume flow rates | + | *Actual and standard volume flow rates |
− | * Mass flow rates | + | *Mass flow rates |
− | * Inlet and discharge pressures | + | *Inlet and discharge pressures |
− | * Inlet and discharge temperatures | + | *Inlet and discharge temperatures |
− | * Adiabatic and polytropic head | + | *Adiabatic and polytropic head |
+ | |||
+ | Major components and construction features of [[Centrifugal_compressor|centrifugal]] and [[Reciprocating_compressor|reciprocating compressors]] are emphasized. Installation, safety, and maintenance considerations also are discussed in their erspective pages. | ||
+ | |||
+ | == Oil and gas compressor uses == | ||
+ | |||
+ | Compressors used in the oil and gas industry are divided into six groups according to their intended service. These are: | ||
− | + | *Flash gas compressors | |
+ | *Gas lift compressors | ||
+ | *Reinjection compressors | ||
+ | *Booster compressors | ||
+ | *Vapor-recovery compressors | ||
+ | *Casinghead compressors | ||
− | == | + | === Flash gas compressors === |
− | |||
− | + | Flash gas compressors are used in oil handling facilities to compress gas that is “flashed” from a hydrocarbon liquid when the liquid flows from a higher pressure to a lower pressure separator. Flash gas compressors typically handle low flow rates and produce high compression ratios. | |
− | |||
− | |||
− | |||
− | |||
− | |||
− | === | + | === Gas lift compressors === |
− | |||
− | + | [[Gas_lift|Gas lift]] compressors are frequently used in oil handling facilities where compression of formation gases and gas lift gas is required. Gas lift compressor duty is frequently of low to medium throughput with high compression ratios. Many gas lift compressors are installed on offshore facilities. | |
− | [[ | ||
− | ===Reinjection compressors=== | + | === Reinjection compressors === |
− | |||
− | + | The reinjection of natural gas is employed to increase or to maintain oil production. Reinjection compressors can be required to deliver gas at discharge pressures in excess of 10,000 psi. Reinjection compressors also are used for underground storage of natural gas. Compressors, applied to these services, have large compression ratios, high power requirements, and low volume flow rates. | |
− | |||
− | === | + | === Booster compressors === |
− | |||
− | ===Casinghead compressors=== | + | Gas transmission through pipelines results in pressure drop because of friction losses. Booster compressors are used to restore the pressure drop from these losses. Selection of these compressors involves evaluating the economic trade-off of distance between pipeline boosting stations and life-cycle cost of each compressor station. Booster compressors also are used in fields that are experiencing pressure decline. Most centrifugal pipeline booster compressors are gas turbine driven, although the use of variable-speed motor drives is becoming more prevalent. Low-speed integral gas engine reciprocating compressors also are used for gas transmission applications. Booster compressors typically are designed for high throughput rates and low compression ratio. Many booster applications can be configured in a single-stage centrifugal compressor. |
− | Casinghead compressors are usually used with electric submersible pumps and rod pumps where formation gas is required to be separated downhole and then transported through the annulus. Often the compressor discharge is routed to either a booster or flash gas compressor or to a low-pressure gathering system. Like vapor recovery compressors, casinghead compressors operate with low suction pressures, high compression ratios, and low gas throughput rates. | + | |
+ | === Vapor recovery compressors === | ||
+ | |||
+ | Vapor recovery compressors are used to gather gas from tanks and other low-pressure equipment in the facility. Often the gas from a vapor recovery compressor is routed to a flash gas, gas lift, or booster compressor for further compression. Low suction pressures, high compression ratios, and low gas throughput rates characterize these compressors. | ||
+ | |||
+ | === Casinghead compressors === | ||
+ | |||
+ | Casinghead compressors are usually used with electric submersible pumps and rod pumps where formation gas is required to be separated downhole and then transported through the annulus. Often the compressor discharge is routed to either a booster or flash gas compressor or to a low-pressure gathering system. Like vapor recovery compressors, casinghead compressors operate with low suction pressures, high compression ratios, and low gas throughput rates. | ||
+ | |||
+ | == Classification and types == | ||
− | |||
Compressors are classified into two major categories: | Compressors are classified into two major categories: | ||
− | ===Positive displacement compressors=== | + | === Positive displacement compressors === |
+ | |||
Positive displacement compressors are further divided into: | Positive displacement compressors are further divided into: | ||
− | * [[ | + | *[[Reciprocating_compressor|Reciprocating]] |
− | * [[ | + | *[[Rotary_positive_displacement_compressors|Rotary types]] |
+ | |||
+ | === Dynamic or kinetic compressors === | ||
− | |||
Dynamic compressors are continuous-flow machines in which a rapidly rotating element accelerates the gas as it passes through the element, converting the velocity head into pressure, partially in the rotating element and partially in stationary diffusers or blades. Dynamic compressors are further divided into: | Dynamic compressors are continuous-flow machines in which a rapidly rotating element accelerates the gas as it passes through the element, converting the velocity head into pressure, partially in the rotating element and partially in stationary diffusers or blades. Dynamic compressors are further divided into: | ||
− | * [[ | + | *[[Centrifugal_compressor|Centrifugal]] |
− | * Axial-flow | + | *Axial-flow |
− | * Mixed-flow types | + | *Mixed-flow types |
+ | |||
+ | == Compression theory == | ||
− | |||
Both positive displacement and dynamic compressors are governed by a few basic principles derived from the laws of thermodynamics. This section defines terminology and discusses the operating principles essential for understanding compressor design, operation, and maintenance. | Both positive displacement and dynamic compressors are governed by a few basic principles derived from the laws of thermodynamics. This section defines terminology and discusses the operating principles essential for understanding compressor design, operation, and maintenance. | ||
− | ===Isentropic (adiabatic) compression=== | + | === Isentropic (adiabatic) compression === |
+ | |||
An adiabatic process is one in which no heat is added or removed from the system. Adiabatic compression is expressed by | An adiabatic process is one in which no heat is added or removed from the system. Adiabatic compression is expressed by | ||
− | [[File: | + | [[File:Vol3 page 265 eq 001.PNG|RTENOTITLE]] ................(1) |
− | where | + | where ''k'' = ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> = ratio of specific heats, dimensionless. |
− | ''k'' = ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> = ratio of specific heats, dimensionless. | ||
− | Although compressors are designed to remove as much heat as possible, some heat gain is inevitable. Nevertheless, the adiabatic compression cycle is rather closely approached by most positive displacement compressors and is generally the base to which they are referred. | + | Although compressors are designed to remove as much heat as possible, some heat gain is inevitable. Nevertheless, the adiabatic compression cycle is rather closely approached by most positive displacement compressors and is generally the base to which they are referred. |
− | ===Polytropic compression=== | + | === Polytropic compression === |
A polytropic process is one in which changes in gas characteristics during compression are considered. Dynamic compressors generally follow the polytropic cycle as defined by the formula | A polytropic process is one in which changes in gas characteristics during compression are considered. Dynamic compressors generally follow the polytropic cycle as defined by the formula | ||
− | [[File: | + | [[File:Vol3 page 266 eq 001.PNG|RTENOTITLE]]................(2) |
− | where | + | where ''n'' = polytropic exponent. |
− | ''n'' = polytropic exponent. | ||
− | The polytropic exponent n is experimentally determined for a given type of machine and may be lower or higher than the adiabatic exponent ''k''. Because the value of ''n'' changes during the compression process, an average value is used. | + | The polytropic exponent n is experimentally determined for a given type of machine and may be lower or higher than the adiabatic exponent ''k''. Because the value of ''n'' changes during the compression process, an average value is used. |
When inlet and discharge pressures and temperatures are known, the polytropic exponent can be determined from the relationship | When inlet and discharge pressures and temperatures are known, the polytropic exponent can be determined from the relationship | ||
− | [[File: | + | [[File:Vol3 page 267 eq 001.PNG|RTENOTITLE]]................(3) |
+ | |||
+ | === Head === | ||
− | + | Head is simply the work expressed in foot pounds per pound of gas or N-m/kg. At a given compressor speed and capacity, the head developed by a centrifugal compressor is the same regardless of the nature of the gas being compressed. The pressure rise produced by the given amount of head varies with the density of the gas. | |
− | + | ==== Isentropic (adiabatic) head ==== | |
− | |||
In an isentropic compression process, head is calculated by '''Eq. 4'''. | In an isentropic compression process, head is calculated by '''Eq. 4'''. | ||
− | [[File: | + | [[File:Vol3 page 267 eq 002.PNG|RTENOTITLE]]................(4) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''H''<sub>''is''</sub> |
− | |= | + | | = |
− | | | + | | isentropic head, ft-lbf/lbm, |
|- | |- | ||
− | |'' | + | | ''z''<sub>avg</sub> |
− | |= | + | | = |
− | | | + | | average compressibility factor, dimensionless, |
|- | |- | ||
− | |'' | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | | | + | | suction temperature, °R, |
|- | |- | ||
− | |'' | + | | ''S'' |
− | |= | + | | = |
− | | | + | | gas specific-gravity (standard atmospheric air = 1.00), |
|- | |- | ||
− | | | + | | ''P''<sub>''d''</sub> |
+ | | = | ||
+ | | discharge pressure, psia, | ||
|- | |- | ||
− | |''P''<sub>''s''</sub> | + | | and |
− | |= | + | |- |
− | |suction pressure, psia. | + | | ''P''<sub>''s''</sub> |
+ | | = | ||
+ | | suction pressure, psia. | ||
|} | |} | ||
− | ====Polytropic head==== | + | ==== Polytropic head ==== |
+ | |||
In a polytropic compression process, head is defined by | In a polytropic compression process, head is defined by | ||
− | [[File: | + | [[File:Vol3 page 267 eq 003.PNG|RTENOTITLE]]................(5) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | | | + | | ''H''<sub>''p''</sub> |
+ | | = | ||
+ | | polytropic head, ft-lbf/lbm, | ||
|- | |- | ||
− | |''η''<sub>''p''</sub> | + | | and |
− | |= | + | |- |
− | |polytropic efficiency. | + | | ''η''<sub>''p''</sub> |
+ | | = | ||
+ | | polytropic efficiency. | ||
|} | |} | ||
− | ===Adiabatic or isentropic efficiency=== | + | === Adiabatic or isentropic efficiency === |
− | Adiabatic efficiency is defined as the ratio of work output for an ideal isentropic compression process to the work input to develop the required head. | + | Adiabatic efficiency is defined as the ratio of work output for an ideal isentropic compression process to the work input to develop the required head. |
For a given compressor operating point, the actual or predicted isentropic efficiency can be calculated with '''Eq. 6'''. | For a given compressor operating point, the actual or predicted isentropic efficiency can be calculated with '''Eq. 6'''. | ||
− | [[File: | + | [[File:Vol3 page 268 eq 001.PNG|RTENOTITLE]]................(6) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''η''<sub>''is''</sub> |
− | |= | + | | = |
− | | | + | | isentropic efficiency, |
|- | |- | ||
− | |''T''<sub>'' | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | | | + | | suction temperature, °R, |
|- | |- | ||
− | | | + | | ''T''<sub>''d''</sub> |
+ | | = | ||
+ | | discharge temperature (actual or predicted), °R, | ||
|- | |- | ||
− | |''k'' | + | | and |
− | |= | + | |- |
− | |ratio of specific heats, ''C''<sub>''p''</sub>/''C''<sub>''v''</sub>. | + | | ''k'' |
+ | | = | ||
+ | | ratio of specific heats, ''C''<sub>''p''</sub>/''C''<sub>''v''</sub>. | ||
|} | |} | ||
− | ===Polytropic efficiency=== | + | === Polytropic efficiency === |
The efficiency of the polytropic compression process is given by | The efficiency of the polytropic compression process is given by | ||
− | [[File: | + | [[File:Vol3 page 268 eq 002.PNG|RTENOTITLE]]................(7) |
− | where | + | where ''η''<sub>''p''</sub> = polytropic efficiency. |
− | ''η''<sub>''p''</sub> = polytropic efficiency. | ||
− | ===Compressibility factory=== | + | === Compressibility factory === |
The perfect gas equation derived from Charles’ and Boyle’s laws makes it possible to determine the weight of a given gas as determined by the equation | The perfect gas equation derived from Charles’ and Boyle’s laws makes it possible to determine the weight of a given gas as determined by the equation | ||
− | [[File: | + | [[File:Vol3 page 269 eq 001.PNG|RTENOTITLE]]................(8) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''P'' |
− | |= | + | | = |
− | | | + | | pressure, |
|- | |- | ||
− | |'' | + | | ''V'' |
− | |= | + | | = |
− | | | + | | volume, |
|- | |- | ||
− | |'' | + | | ''N'' |
− | |= | + | | = |
− | | | + | | number of moles, |
|- | |- | ||
− | | | + | | ''R'' |
+ | | = | ||
+ | | constant for a specific gas, | ||
|- | |- | ||
− | |''T'' | + | | and |
− | |= | + | |- |
− | |temperature. | + | | ''T'' |
+ | | = | ||
+ | | temperature. | ||
|} | |} | ||
In reality, all gases deviate from the ideal gas laws to some degree. This deviation is defined as a compressibility factor, z , applied as a multiplier to the basic formula. Therefore, '''Eq. 8''' is modified to include the compressibility factor as shown next. | In reality, all gases deviate from the ideal gas laws to some degree. This deviation is defined as a compressibility factor, z , applied as a multiplier to the basic formula. Therefore, '''Eq. 8''' is modified to include the compressibility factor as shown next. | ||
− | [[File: | + | [[File:Vol3 page 269 eq 002.PNG|RTENOTITLE]]................(9) |
− | ===Flow or capacity=== | + | === Flow or capacity === |
Compressor flow (capacity) can be specified in three ways: | Compressor flow (capacity) can be specified in three ways: | ||
− | * Mass (weight) flow | + | *Mass (weight) flow |
− | * Standard volume flow | + | *Standard volume flow |
− | * Actual (inlet) volume flow | + | *Actual (inlet) volume flow |
+ | |||
+ | ==== Mass or weight flow ==== | ||
+ | |||
+ | Mass flow is expressed as mass per unit of time, most often pounds-mass per minute (lbm/min) or kilograms per minute (kg/min). Mass flow is a specific value independent of gas properties and compressor inlet conditions. Mass flow can be specified on either a wet (water vapor included) or dry basis. | ||
− | ==== | + | ==== Standard volume flow ==== |
− | |||
− | + | Standard volume flow is the most common term used by the industry to describe volumetric flow because it is independent of actual gas pressures or temperatures. It is the volume per unit of time using pressures and temperatures that have been corrected to "standard" conditions. These conditions apply to pressure, temperature, molecular weight, and compressibility. The standards must be known and held constant. For purposes of this text, the standard conditions used are | |
− | Standard volume flow is the most common term used by the industry to describe volumetric flow because it is independent of actual gas pressures or temperatures. It is the volume per unit of time using pressures and temperatures that have been corrected to "standard" conditions. These conditions apply to pressure, temperature, molecular weight, and compressibility. The standards must be known and held constant. For purposes of this text, the standard conditions used are | ||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |temperature | + | | pressure |
− | |= | + | | = |
− | |60 °F, | + | | 14.7 psia, |
+ | |- | ||
+ | | temperature | ||
+ | | = | ||
+ | | 60 °F, | ||
|- | |- | ||
− | |compressibility | + | | compressibility |
− | |= | + | | = |
− | |1.00, | + | | 1.00, |
|- | |- | ||
− | |and | + | | and |
|- | |- | ||
− | |molecular weight | + | | molecular weight |
− | |= | + | | = |
− | |MW of subject gas. | + | | MW of subject gas. |
|} | |} | ||
Standard volume flow is usually dry and expressed in millions of standard cubic feet per day (MMScf/D). | Standard volume flow is usually dry and expressed in millions of standard cubic feet per day (MMScf/D). | ||
− | ====Actual inlet volume flow==== | + | ==== Actual inlet volume flow ==== |
− | Actual volume flow is defined as the amount of volume per unit of time at the inlet to the compressor. Actual volume flow is normally expressed in actual cubic feet per minute (ACFM) or actual cubic meters per hour (m<sup>3</sup>/hr). When gas composition and pressure and temperature are known, the specification of actual volume is appropriate because the fundamental performance characteristic of the compressor is sensitive only to actual volume flow at the inlet. | + | |
+ | Actual volume flow is defined as the amount of volume per unit of time at the inlet to the compressor. Actual volume flow is normally expressed in actual cubic feet per minute (ACFM) or actual cubic meters per hour (m<sup>3</sup>/hr). When gas composition and pressure and temperature are known, the specification of actual volume is appropriate because the fundamental performance characteristic of the compressor is sensitive only to actual volume flow at the inlet. | ||
Mass flow can be converted to actual volume flow with '''Eq. 10'''. | Mass flow can be converted to actual volume flow with '''Eq. 10'''. | ||
− | [[File: | + | [[File:Vol3 page 269 eq 003.PNG|RTENOTITLE]]................(10) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''W'' |
− | |= | + | | = |
− | | | + | | mass flow, lbm/min., |
|- | |- | ||
− | |'' | + | | ''R'' |
− | |= | + | | = |
− | | | + | | universal gas constant = 1,545, |
|- | |- | ||
− | |'' | + | | ''MW'' |
− | |= | + | | = |
− | | | + | | molecular weight, |
|- | |- | ||
− | |'' | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | | | + | | suction temperature, °R, |
|- | |- | ||
− | | | + | | ''z''<sub>''s''</sub> |
+ | | = | ||
+ | | compressibility at inlet, | ||
|- | |- | ||
− | |''P''<sub>''s''</sub> | + | | and |
− | |= | + | |- |
− | |absolute suction pressure, psia. | + | | ''P''<sub>''s''</sub> |
+ | | = | ||
+ | | absolute suction pressure, psia. | ||
|} | |} | ||
Standard volume flow can be converted to actual volume flow with '''Eq. 11'''. | Standard volume flow can be converted to actual volume flow with '''Eq. 11'''. | ||
− | [[File: | + | [[File:Vol3 page 270 eq 001.PNG|RTENOTITLE]]................(11) |
− | where | + | where ''Q''<sub>''g''</sub> = standard volume flow, MMscf/D. |
− | ''Q''<sub>''g''</sub> = standard volume flow, MMscf/D. | ||
− | ===Compression ratio=== | + | === Compression ratio === |
− | Compression ratio, ''R''<sub>''c''</sub>, is simply the absolute discharge pressure divided by the absolute suction pressure. As expressed in '''Eq. 3''', temperature ratio increases with pressure ratio. Temperature limits related to the mechanical design of compressors often will dictate the maximum pressure ratio that can be achieved in a stage of compression. (Refer to section on intercooling below.) | + | Compression ratio, ''R''<sub>''c''</sub>, is simply the absolute discharge pressure divided by the absolute suction pressure. As expressed in '''Eq. 3''', temperature ratio increases with pressure ratio. Temperature limits related to the mechanical design of compressors often will dictate the maximum pressure ratio that can be achieved in a stage of compression. (Refer to section on intercooling below.) |
− | ===Intercooling=== | + | === Intercooling === |
− | Where large pressure ratios are needed, splitting the compression duty into one or more stages with intercooling between stages can be the most energy efficient arrangement. The energy savings must be compared with the capital and maintenance investment necessary to provide the cooling. In addition to the thermodynamic benefit, intercooled compression systems result in lower discharge temperatures, which reduce the need for special compressor materials. | + | Where large pressure ratios are needed, splitting the compression duty into one or more stages with intercooling between stages can be the most energy efficient arrangement. The energy savings must be compared with the capital and maintenance investment necessary to provide the cooling. In addition to the thermodynamic benefit, intercooled compression systems result in lower discharge temperatures, which reduce the need for special compressor materials. |
− | ===Power requirement=== | + | === Power requirement === |
− | The total power requirement of a compressor for a given duty is the sum of the gas power and the friction power. The gas power is directly proportional to head and mass flow and inversely proportional to efficiency. Mechanical losses in the bearings and, to a lesser extent, in the seals are the primary source of friction power. | + | The total power requirement of a compressor for a given duty is the sum of the gas power and the friction power. The gas power is directly proportional to head and mass flow and inversely proportional to efficiency. Mechanical losses in the bearings and, to a lesser extent, in the seals are the primary source of friction power. |
For centrifugal compressors, the gas power can be calculated as | For centrifugal compressors, the gas power can be calculated as | ||
− | [[File: | + | [[File:Vol3 page 270 eq 002.PNG|RTENOTITLE]]................(12) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''GHP'' |
− | |= | + | | = |
− | | | + | | gas power, horsepower, |
|- | |- | ||
− | | | + | | ''W'' |
+ | | = | ||
+ | | mass flow, lbm/min., | ||
|- | |- | ||
− | |''H''<sub>''p''</sub> | + | | and |
− | |= | + | |- |
− | |polytropic head, ft-lbf/lbm. | + | | ''H''<sub>''p''</sub> |
+ | | = | ||
+ | | polytropic head, ft-lbf/lbm. | ||
|} | |} | ||
For reciprocating compressors, the gas power can be calculated as | For reciprocating compressors, the gas power can be calculated as | ||
− | [[File: | + | [[File:Vol3 page 270 eq 003.PNG|RTENOTITLE]]................(13) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |'' | + | | ''P''<sub>1</sub> |
− | |= | + | | = |
− | |inlet | + | | inlet pressure, psia, |
|- | |- | ||
− | |'' | + | | ''V''<sub>1</sub> |
− | |= | + | | = |
− | | | + | | inlet volume, ACFM, |
|- | |- | ||
− | | | + | | ''P''<sub>2</sub> |
+ | | = | ||
+ | | discharge pressure, psia, | ||
|- | |- | ||
− | |''CE'' | + | | and |
− | |= | + | |- |
− | |compression efficiency (assume 0.85 for estimating purposes). | + | | ''CE'' |
+ | | = | ||
+ | | compression efficiency (assume 0.85 for estimating purposes). | ||
|} | |} | ||
− | ===Compressor selection=== | + | === Compressor selection === |
Proper selection of the compressor type and number of stages can be accomplished only after considering a number of factors. (For the purposes of this chapter, discussion is limited to centrifugal vs. reciprocating compressors.) Basic information needed for the proper selection includes: | Proper selection of the compressor type and number of stages can be accomplished only after considering a number of factors. (For the purposes of this chapter, discussion is limited to centrifugal vs. reciprocating compressors.) Basic information needed for the proper selection includes: | ||
− | * Volume and mass flow of gas to be compressed | + | *Volume and mass flow of gas to be compressed |
− | * Suction pressure | + | *Suction pressure |
− | * Discharge pressure | + | *Discharge pressure |
− | * Suction temperature | + | *Suction temperature |
− | * Gas specific gravity | + | *Gas specific gravity |
− | * Available types of drivers | + | *Available types of drivers |
− | The required volume flow and discharge pressure define a point on a graphic representation of compressor coverage, as shown in '''Fig. 6'''. Examination of this chart reveals that, in general, centrifugal compressors are appropriate for high flow applications, and reciprocating compressors are better suited to low flow rates. | + | The required volume flow and discharge pressure define a point on a graphic representation of compressor coverage, as shown in '''Fig. 6'''. Examination of this chart reveals that, in general, centrifugal compressors are appropriate for high flow applications, and reciprocating compressors are better suited to low flow rates. |
− | <gallery widths=300px heights=200px> | + | <gallery widths="300px" heights="200px"> |
File:Vol3 Page 271 Image 0001.png|'''Fig. 6—Compressor selection. Areas indicate regions of best performance (courtesy of Dresser-Rand).''' | File:Vol3 Page 271 Image 0001.png|'''Fig. 6—Compressor selection. Areas indicate regions of best performance (courtesy of Dresser-Rand).''' | ||
</gallery> | </gallery> | ||
− | ===Number of stages of compression=== | + | === Number of stages of compression === |
Using the specified overall pressure ratio and suction temperature (and an assumed efficiency), the discharge temperature for compression of gas with a known k value in a single stage can be estimated by rewriting '''Eq. 7'''. | Using the specified overall pressure ratio and suction temperature (and an assumed efficiency), the discharge temperature for compression of gas with a known k value in a single stage can be estimated by rewriting '''Eq. 7'''. | ||
− | [[File: | + | [[File:Vol3 page 271 eq 001.PNG|RTENOTITLE]]................(14) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |''T''<sub> | + | | ''T''<sub>2</sub> |
− | |= | + | | = |
− | | | + | | estimated absolute discharge temperature, °R, |
|- | |- | ||
− | |'' | + | | ''T''<sub>1</sub> |
− | |= | + | | = |
− | |specified absolute suction | + | | specified absolute suction temperature, °R, |
|- | |- | ||
− | |''P''<sub> | + | | ''P''<sub>1</sub> |
− | |= | + | | = |
− | |specified absolute | + | | specified absolute suction pressure, psia, |
|- | |- | ||
− | |'' | + | | ''P''<sub>2</sub> |
− | |= | + | | = |
− | | | + | | specified absolute discharge pressure, psia, |
|- | |- | ||
− | |'' | + | | ''k'' |
− | |= | + | | = |
− | | | + | | ratio of specific heats, |
|- | |- | ||
− | | | + | | ''η''<sub>''p''</sub> |
− | | | + | | = |
− | | | + | | assumed polytropic efficiency, |
|- | |- | ||
− | | | + | | |
+ | | ≈ | ||
+ | | 0.72 to 0.85 for centrifugal compressors, | ||
|- | |- | ||
− | | | + | | and |
− | |≈ | + | |- |
− | |1.00 for reciprocating compressors. | + | | |
+ | | ≈ | ||
+ | | 1.00 for reciprocating compressors. | ||
|} | |} | ||
If the single-stage discharge temperature is too high (typical limit is 300 to 350 °F), it is necessary to configure the compression equipment in more than one stage. Calculating the compression ratio per stage with '''Eq. 15''' does the evaluation of a multistage design. | If the single-stage discharge temperature is too high (typical limit is 300 to 350 °F), it is necessary to configure the compression equipment in more than one stage. Calculating the compression ratio per stage with '''Eq. 15''' does the evaluation of a multistage design. | ||
− | [[File: | + | [[File:Vol3 page 272 eq 001.PNG|RTENOTITLE]]................(15) |
+ | |||
+ | where | ||
− | |||
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | | | + | | ''R''<sub>sect</sub> |
+ | | = | ||
+ | | compression ratio per section, | ||
|- | |- | ||
− | |''n'' | + | | and |
− | |= | + | |- |
− | |number of sections. | + | | ''n'' |
+ | | = | ||
+ | | number of sections. | ||
|} | |} | ||
Using the previous equations and prudent assumptions, it is possible to determine the minimum number of stages required to accomplish a given overall compression ratio without exceeding temperature limits. | Using the previous equations and prudent assumptions, it is possible to determine the minimum number of stages required to accomplish a given overall compression ratio without exceeding temperature limits. | ||
− | ==Nomenclature== | + | == Nomenclature == |
{| | {| | ||
− | |||
− | |||
− | |||
|- | |- | ||
− | |''C''<sub>''p''</sub>/''C''<sub>''v''</sub> | + | | ''k'' |
− | |= | + | | = |
− | |ratio of specific heats, dimensionless | + | | ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> |
+ | |- | ||
+ | | ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> | ||
+ | | = | ||
+ | | ratio of specific heats, dimensionless | ||
|- | |- | ||
− | |''n'' | + | | ''n'' |
− | |= | + | | = |
− | |polytropic exponent | + | | polytropic exponent |
|- | |- | ||
− | |''H''<sub>''is''</sub> | + | | ''H''<sub>''is''</sub> |
− | |= | + | | = |
− | |isentropic head, ft-lbf/lbm, | + | | isentropic head, ft-lbf/lbm, |
|- | |- | ||
− | |''z''<sub>avg</sub> | + | | ''z''<sub>avg</sub> |
− | |= | + | | = |
− | |average compressibility factor, dimensionless, | + | | average compressibility factor, dimensionless, |
|- | |- | ||
− | |''T''<sub>''s''</sub> | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | |suction temperature, °R, | + | | suction temperature, °R, |
|- | |- | ||
− | |''S'' | + | | ''S'' |
− | |= | + | | = |
− | |gas specific-gravity (standard atmospheric air = 1.00), | + | | gas specific-gravity (standard atmospheric air = 1.00), |
|- | |- | ||
− | |''P''<sub>''d''</sub> | + | | ''P''<sub>''d''</sub> |
− | |= | + | | = |
− | |discharge pressure, psia, | + | | discharge pressure, psia, |
|- | |- | ||
− | |''P''<sub>''s''</sub> | + | | ''P''<sub>''s''</sub> |
− | |= | + | | = |
− | |suction pressure, psia | + | | suction pressure, psia |
|- | |- | ||
− | |''H''<sub>''p''</sub> | + | | ''H''<sub>''p''</sub> |
− | |= | + | | = |
− | |polytropic head, ft-lbf/lbm, | + | | polytropic head, ft-lbf/lbm, |
|- | |- | ||
− | |''η''<sub>''p''</sub> | + | | ''η''<sub>''p''</sub> |
− | |= | + | | = |
− | |polytropic efficiency | + | | polytropic efficiency |
|- | |- | ||
− | |''η''<sub>''is''</sub> | + | | ''η''<sub>''is''</sub> |
− | |= | + | | = |
− | |isentropic efficiency, | + | | isentropic efficiency, |
|- | |- | ||
− | |''T''<sub>''s''</sub> | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | |suction temperature, °R, | + | | suction temperature, °R, |
|- | |- | ||
− | |''T''<sub>''d''</sub> | + | | ''T''<sub>''d''</sub> |
− | |= | + | | = |
− | |discharge temperature (actual or predicted), °R, | + | | discharge temperature (actual or predicted), °R, |
|- | |- | ||
− | |''k'' | + | | ''k'' |
− | |= | + | | = |
− | |ratio of specific heats, ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> | + | | ratio of specific heats, ''C''<sub>''p''</sub>/''C''<sub>''v''</sub> |
|- | |- | ||
− | |''η''<sub>''p''</sub> | + | | ''η''<sub>''p''</sub> |
− | |= | + | | = |
− | |polytropic efficiency | + | | polytropic efficiency |
|- | |- | ||
− | |''P'' | + | | ''P'' |
− | |= | + | | = |
− | |pressure, | + | | pressure, |
|- | |- | ||
− | |''V'' | + | | ''V'' |
− | |= | + | | = |
− | |volume, | + | | volume, |
|- | |- | ||
− | |''N'' | + | | ''N'' |
− | |= | + | | = |
− | |number of moles, | + | | number of moles, |
|- | |- | ||
− | |''R'' | + | | ''R'' |
− | |= | + | | = |
− | |constant for a specific gas, | + | | constant for a specific gas, |
|- | |- | ||
− | |''T'' | + | | ''T'' |
− | |= | + | | = |
− | |temperature | + | | temperature |
|- | |- | ||
− | |''W'' | + | | ''W'' |
− | |= | + | | = |
− | |mass flow, lbm/min., | + | | mass flow, lbm/min., |
|- | |- | ||
− | |''R'' | + | | ''R'' |
− | |= | + | | = |
− | |universal gas constant = 1,545, | + | | universal gas constant = 1,545, |
|- | |- | ||
− | |''MW'' | + | | ''MW'' |
− | |= | + | | = |
− | |molecular weight, | + | | molecular weight, |
|- | |- | ||
− | |''T''<sub>''s''</sub> | + | | ''T''<sub>''s''</sub> |
− | |= | + | | = |
− | |suction temperature, °R, | + | | suction temperature, °R, |
|- | |- | ||
− | |''z''<sub>''s''</sub> | + | | ''z''<sub>''s''</sub> |
− | |= | + | | = |
− | |compressibility at inlet, | + | | compressibility at inlet, |
|- | |- | ||
− | |''P''<sub>''s''</sub> | + | | ''P''<sub>''s''</sub> |
− | |= | + | | = |
− | |absolute suction pressure, psia | + | | absolute suction pressure, psia |
|- | |- | ||
− | |''Q''<sub>''g''</sub> | + | | ''Q''<sub>''g''</sub> |
− | |= | + | | = |
− | |standard volume flow, MMscf/D | + | | standard volume flow, MMscf/D |
|- | |- | ||
− | |''GHP'' | + | | ''GHP'' |
− | |= | + | | = |
− | |gas power, horsepower, | + | | gas power, horsepower, |
|- | |- | ||
− | |''W'' | + | | ''W'' |
− | |= | + | | = |
− | |mass flow, lbm/min., | + | | mass flow, lbm/min., |
|- | |- | ||
− | |''H''<sub>''p''</sub> | + | | ''H''<sub>''p''</sub> |
− | |= | + | | = |
− | |polytropic head, ft-lbf/lbm | + | | polytropic head, ft-lbf/lbm |
|- | |- | ||
− | |''P''<sub>1</sub> | + | | ''P''<sub>1</sub> |
− | |= | + | | = |
− | |inlet pressure, psia, | + | | inlet pressure, psia, |
|- | |- | ||
− | |''V''<sub>1</sub> | + | | ''V''<sub>1</sub> |
− | |= | + | | = |
− | |inlet volume, ACFM, | + | | inlet volume, ACFM, |
|- | |- | ||
− | |''P''<sub>2</sub> | + | | ''P''<sub>2</sub> |
− | |= | + | | = |
− | |discharge pressure, psia, | + | | discharge pressure, psia, |
|- | |- | ||
− | |''CE'' | + | | ''CE'' |
− | |= | + | | = |
− | |compression efficiency (assume 0.85 for estimating purposes) | + | | compression efficiency (assume 0.85 for estimating purposes) |
|- | |- | ||
− | |''T''<sub>2</sub> | + | | ''T''<sub>2</sub> |
− | |= | + | | = |
− | |estimated absolute discharge temperature, °R, | + | | estimated absolute discharge temperature, °R, |
|- | |- | ||
− | |''T''<sub>1</sub> | + | | ''T''<sub>1</sub> |
− | |= | + | | = |
− | |specified absolute suction temperature, °R, | + | | specified absolute suction temperature, °R, |
|- | |- | ||
− | |''P''<sub>1</sub> | + | | ''P''<sub>1</sub> |
− | |= | + | | = |
− | |specified absolute suction pressure, psia, | + | | specified absolute suction pressure, psia, |
|- | |- | ||
− | |''P''<sub>2</sub> | + | | ''P''<sub>2</sub> |
− | |= | + | | = |
− | |specified absolute discharge pressure, psia, | + | | specified absolute discharge pressure, psia, |
|- | |- | ||
− | |''k'' | + | | ''k'' |
− | |= | + | | = |
− | |ratio of specific heats, | + | | ratio of specific heats, |
|- | |- | ||
− | |''η''<sub>''p''</sub> | + | | ''η''<sub>''p''</sub> |
− | |= | + | | = |
− | |assumed polytropic efficiency, | + | | assumed polytropic efficiency, |
|- | |- | ||
− | | | + | | |
− | |≈ | + | | ≈ |
− | |0.72 to 0.85 for centrifugal compressors, | + | | 0.72 to 0.85 for centrifugal compressors, |
|- | |- | ||
− | |and | + | | and |
|- | |- | ||
− | | | + | | |
− | |≈ | + | | ≈ |
− | |1.00 for reciprocating compressors | + | | 1.00 for reciprocating compressors |
|- | |- | ||
− | |''R''<sub>sect</sub> | + | | ''R''<sub>sect</sub> |
− | |= | + | | = |
− | |compression ratio per section, | + | | compression ratio per section, |
|- | |- | ||
− | |''n'' | + | | ''n'' |
− | |= | + | | = |
− | |number of sections | + | | number of sections |
|} | |} | ||
− | ==References== | + | == References == |
+ | |||
Use this section for citation of items referenced in the text to show your sources. [The sources should be available to the reader, i.e., not an internal company document.] | Use this section for citation of items referenced in the text to show your sources. [The sources should be available to the reader, i.e., not an internal company document.] | ||
− | ==Noteworthy papers in OnePetro== | + | == Noteworthy papers in OnePetro == |
+ | |||
Use this section to list papers in OnePetro that a reader who wants to learn more should definitely read | Use this section to list papers in OnePetro that a reader who wants to learn more should definitely read | ||
− | ==External links== | + | == External links == |
+ | |||
Use this section to provide links to relevant material on websites other than PetroWiki and OnePetro | Use this section to provide links to relevant material on websites other than PetroWiki and OnePetro | ||
− | ==See also== | + | == See also == |
+ | |||
[[PEH:Compressors]] | [[PEH:Compressors]] | ||
− | [[Centrifugal compressor]] | + | [[Centrifugal_compressor|Centrifugal compressor]] |
+ | |||
+ | [[Reciprocating_compressor|Reciprocating compressor]] | ||
− | [[ | + | [[Rotary_positive_displacement_compressors|Rotary positive displacement compressors]] |
− | [[ | + | [[Category:4.1.6 Compressors, engines and turbines]] |
Revision as of 19:16, 1 June 2015
This page provides an overview of the primary categories of natural gas compressor services and a description of the different classifications and types of compressors available to the industry. Adiabatic and polytropic compression theory are discussed with supporting definition of terminology.
Compression theory
Specific topics relating to compression theory include:
- Power requirement
- Isentropic exponent
- Compressibility factor
- Intercooling
- Adiabatic and polytropic efficiency
- Actual and standard volume flow rates
- Mass flow rates
- Inlet and discharge pressures
- Inlet and discharge temperatures
- Adiabatic and polytropic head
Major components and construction features of centrifugal and reciprocating compressors are emphasized. Installation, safety, and maintenance considerations also are discussed in their erspective pages.
Oil and gas compressor uses
Compressors used in the oil and gas industry are divided into six groups according to their intended service. These are:
- Flash gas compressors
- Gas lift compressors
- Reinjection compressors
- Booster compressors
- Vapor-recovery compressors
- Casinghead compressors
Flash gas compressors
Flash gas compressors are used in oil handling facilities to compress gas that is “flashed” from a hydrocarbon liquid when the liquid flows from a higher pressure to a lower pressure separator. Flash gas compressors typically handle low flow rates and produce high compression ratios.
Gas lift compressors
Gas lift compressors are frequently used in oil handling facilities where compression of formation gases and gas lift gas is required. Gas lift compressor duty is frequently of low to medium throughput with high compression ratios. Many gas lift compressors are installed on offshore facilities.
Reinjection compressors
The reinjection of natural gas is employed to increase or to maintain oil production. Reinjection compressors can be required to deliver gas at discharge pressures in excess of 10,000 psi. Reinjection compressors also are used for underground storage of natural gas. Compressors, applied to these services, have large compression ratios, high power requirements, and low volume flow rates.
Booster compressors
Gas transmission through pipelines results in pressure drop because of friction losses. Booster compressors are used to restore the pressure drop from these losses. Selection of these compressors involves evaluating the economic trade-off of distance between pipeline boosting stations and life-cycle cost of each compressor station. Booster compressors also are used in fields that are experiencing pressure decline. Most centrifugal pipeline booster compressors are gas turbine driven, although the use of variable-speed motor drives is becoming more prevalent. Low-speed integral gas engine reciprocating compressors also are used for gas transmission applications. Booster compressors typically are designed for high throughput rates and low compression ratio. Many booster applications can be configured in a single-stage centrifugal compressor.
Vapor recovery compressors
Vapor recovery compressors are used to gather gas from tanks and other low-pressure equipment in the facility. Often the gas from a vapor recovery compressor is routed to a flash gas, gas lift, or booster compressor for further compression. Low suction pressures, high compression ratios, and low gas throughput rates characterize these compressors.
Casinghead compressors
Casinghead compressors are usually used with electric submersible pumps and rod pumps where formation gas is required to be separated downhole and then transported through the annulus. Often the compressor discharge is routed to either a booster or flash gas compressor or to a low-pressure gathering system. Like vapor recovery compressors, casinghead compressors operate with low suction pressures, high compression ratios, and low gas throughput rates.
Classification and types
Compressors are classified into two major categories:
Positive displacement compressors
Positive displacement compressors are further divided into:
Dynamic or kinetic compressors
Dynamic compressors are continuous-flow machines in which a rapidly rotating element accelerates the gas as it passes through the element, converting the velocity head into pressure, partially in the rotating element and partially in stationary diffusers or blades. Dynamic compressors are further divided into:
- Centrifugal
- Axial-flow
- Mixed-flow types
Compression theory
Both positive displacement and dynamic compressors are governed by a few basic principles derived from the laws of thermodynamics. This section defines terminology and discusses the operating principles essential for understanding compressor design, operation, and maintenance.
Isentropic (adiabatic) compression
An adiabatic process is one in which no heat is added or removed from the system. Adiabatic compression is expressed by
where k = C_{p}/C_{v} = ratio of specific heats, dimensionless.
Although compressors are designed to remove as much heat as possible, some heat gain is inevitable. Nevertheless, the adiabatic compression cycle is rather closely approached by most positive displacement compressors and is generally the base to which they are referred.
Polytropic compression
A polytropic process is one in which changes in gas characteristics during compression are considered. Dynamic compressors generally follow the polytropic cycle as defined by the formula
where n = polytropic exponent.
The polytropic exponent n is experimentally determined for a given type of machine and may be lower or higher than the adiabatic exponent k. Because the value of n changes during the compression process, an average value is used.
When inlet and discharge pressures and temperatures are known, the polytropic exponent can be determined from the relationship
Head
Head is simply the work expressed in foot pounds per pound of gas or N-m/kg. At a given compressor speed and capacity, the head developed by a centrifugal compressor is the same regardless of the nature of the gas being compressed. The pressure rise produced by the given amount of head varies with the density of the gas.
Isentropic (adiabatic) head
In an isentropic compression process, head is calculated by Eq. 4.
where
H_{is} | = | isentropic head, ft-lbf/lbm, |
z_{avg} | = | average compressibility factor, dimensionless, |
T_{s} | = | suction temperature, °R, |
S | = | gas specific-gravity (standard atmospheric air = 1.00), |
P_{d} | = | discharge pressure, psia, |
and | ||
P_{s} | = | suction pressure, psia. |
Polytropic head
In a polytropic compression process, head is defined by
where
H_{p} | = | polytropic head, ft-lbf/lbm, |
and | ||
η_{p} | = | polytropic efficiency. |
Adiabatic or isentropic efficiency
Adiabatic efficiency is defined as the ratio of work output for an ideal isentropic compression process to the work input to develop the required head.
For a given compressor operating point, the actual or predicted isentropic efficiency can be calculated with Eq. 6.
where
η_{is} | = | isentropic efficiency, |
T_{s} | = | suction temperature, °R, |
T_{d} | = | discharge temperature (actual or predicted), °R, |
and | ||
k | = | ratio of specific heats, C_{p}/C_{v}. |
Polytropic efficiency
The efficiency of the polytropic compression process is given by
where η_{p} = polytropic efficiency.
Compressibility factory
The perfect gas equation derived from Charles’ and Boyle’s laws makes it possible to determine the weight of a given gas as determined by the equation
where
P | = | pressure, |
V | = | volume, |
N | = | number of moles, |
R | = | constant for a specific gas, |
and | ||
T | = | temperature. |
In reality, all gases deviate from the ideal gas laws to some degree. This deviation is defined as a compressibility factor, z , applied as a multiplier to the basic formula. Therefore, Eq. 8 is modified to include the compressibility factor as shown next.
Flow or capacity
Compressor flow (capacity) can be specified in three ways:
- Mass (weight) flow
- Standard volume flow
- Actual (inlet) volume flow
Mass or weight flow
Mass flow is expressed as mass per unit of time, most often pounds-mass per minute (lbm/min) or kilograms per minute (kg/min). Mass flow is a specific value independent of gas properties and compressor inlet conditions. Mass flow can be specified on either a wet (water vapor included) or dry basis.
Standard volume flow
Standard volume flow is the most common term used by the industry to describe volumetric flow because it is independent of actual gas pressures or temperatures. It is the volume per unit of time using pressures and temperatures that have been corrected to "standard" conditions. These conditions apply to pressure, temperature, molecular weight, and compressibility. The standards must be known and held constant. For purposes of this text, the standard conditions used are
pressure | = | 14.7 psia, |
temperature | = | 60 °F, |
compressibility | = | 1.00, |
and | ||
molecular weight | = | MW of subject gas. |
Standard volume flow is usually dry and expressed in millions of standard cubic feet per day (MMScf/D).
Actual inlet volume flow
Actual volume flow is defined as the amount of volume per unit of time at the inlet to the compressor. Actual volume flow is normally expressed in actual cubic feet per minute (ACFM) or actual cubic meters per hour (m^{3}/hr). When gas composition and pressure and temperature are known, the specification of actual volume is appropriate because the fundamental performance characteristic of the compressor is sensitive only to actual volume flow at the inlet.
Mass flow can be converted to actual volume flow with Eq. 10.
where
W | = | mass flow, lbm/min., |
R | = | universal gas constant = 1,545, |
MW | = | molecular weight, |
T_{s} | = | suction temperature, °R, |
z_{s} | = | compressibility at inlet, |
and | ||
P_{s} | = | absolute suction pressure, psia. |
Standard volume flow can be converted to actual volume flow with Eq. 11.
where Q_{g} = standard volume flow, MMscf/D.
Compression ratio
Compression ratio, R_{c}, is simply the absolute discharge pressure divided by the absolute suction pressure. As expressed in Eq. 3, temperature ratio increases with pressure ratio. Temperature limits related to the mechanical design of compressors often will dictate the maximum pressure ratio that can be achieved in a stage of compression. (Refer to section on intercooling below.)
Intercooling
Where large pressure ratios are needed, splitting the compression duty into one or more stages with intercooling between stages can be the most energy efficient arrangement. The energy savings must be compared with the capital and maintenance investment necessary to provide the cooling. In addition to the thermodynamic benefit, intercooled compression systems result in lower discharge temperatures, which reduce the need for special compressor materials.
Power requirement
The total power requirement of a compressor for a given duty is the sum of the gas power and the friction power. The gas power is directly proportional to head and mass flow and inversely proportional to efficiency. Mechanical losses in the bearings and, to a lesser extent, in the seals are the primary source of friction power.
For centrifugal compressors, the gas power can be calculated as
where
GHP | = | gas power, horsepower, |
W | = | mass flow, lbm/min., |
and | ||
H_{p} | = | polytropic head, ft-lbf/lbm. |
For reciprocating compressors, the gas power can be calculated as
where
P_{1} | = | inlet pressure, psia, |
V_{1} | = | inlet volume, ACFM, |
P_{2} | = | discharge pressure, psia, |
and | ||
CE | = | compression efficiency (assume 0.85 for estimating purposes). |
Compressor selection
Proper selection of the compressor type and number of stages can be accomplished only after considering a number of factors. (For the purposes of this chapter, discussion is limited to centrifugal vs. reciprocating compressors.) Basic information needed for the proper selection includes:
- Volume and mass flow of gas to be compressed
- Suction pressure
- Discharge pressure
- Suction temperature
- Gas specific gravity
- Available types of drivers
The required volume flow and discharge pressure define a point on a graphic representation of compressor coverage, as shown in Fig. 6. Examination of this chart reveals that, in general, centrifugal compressors are appropriate for high flow applications, and reciprocating compressors are better suited to low flow rates.
Number of stages of compression
Using the specified overall pressure ratio and suction temperature (and an assumed efficiency), the discharge temperature for compression of gas with a known k value in a single stage can be estimated by rewriting Eq. 7.
where
T_{2} | = | estimated absolute discharge temperature, °R, |
T_{1} | = | specified absolute suction temperature, °R, |
P_{1} | = | specified absolute suction pressure, psia, |
P_{2} | = | specified absolute discharge pressure, psia, |
k | = | ratio of specific heats, |
η_{p} | = | assumed polytropic efficiency, |
≈ | 0.72 to 0.85 for centrifugal compressors, | |
and | ||
≈ | 1.00 for reciprocating compressors. |
If the single-stage discharge temperature is too high (typical limit is 300 to 350 °F), it is necessary to configure the compression equipment in more than one stage. Calculating the compression ratio per stage with Eq. 15 does the evaluation of a multistage design.
where
R_{sect} | = | compression ratio per section, |
and | ||
n | = | number of sections. |
Using the previous equations and prudent assumptions, it is possible to determine the minimum number of stages required to accomplish a given overall compression ratio without exceeding temperature limits.
Nomenclature
k | = | C_{p}/C_{v} |
C_{p}/C_{v} | = | ratio of specific heats, dimensionless |
n | = | polytropic exponent |
H_{is} | = | isentropic head, ft-lbf/lbm, |
z_{avg} | = | average compressibility factor, dimensionless, |
T_{s} | = | suction temperature, °R, |
S | = | gas specific-gravity (standard atmospheric air = 1.00), |
P_{d} | = | discharge pressure, psia, |
P_{s} | = | suction pressure, psia |
H_{p} | = | polytropic head, ft-lbf/lbm, |
η_{p} | = | polytropic efficiency |
η_{is} | = | isentropic efficiency, |
T_{s} | = | suction temperature, °R, |
T_{d} | = | discharge temperature (actual or predicted), °R, |
k | = | ratio of specific heats, C_{p}/C_{v} |
η_{p} | = | polytropic efficiency |
P | = | pressure, |
V | = | volume, |
N | = | number of moles, |
R | = | constant for a specific gas, |
T | = | temperature |
W | = | mass flow, lbm/min., |
R | = | universal gas constant = 1,545, |
MW | = | molecular weight, |
T_{s} | = | suction temperature, °R, |
z_{s} | = | compressibility at inlet, |
P_{s} | = | absolute suction pressure, psia |
Q_{g} | = | standard volume flow, MMscf/D |
GHP | = | gas power, horsepower, |
W | = | mass flow, lbm/min., |
H_{p} | = | polytropic head, ft-lbf/lbm |
P_{1} | = | inlet pressure, psia, |
V_{1} | = | inlet volume, ACFM, |
P_{2} | = | discharge pressure, psia, |
CE | = | compression efficiency (assume 0.85 for estimating purposes) |
T_{2} | = | estimated absolute discharge temperature, °R, |
T_{1} | = | specified absolute suction temperature, °R, |
P_{1} | = | specified absolute suction pressure, psia, |
P_{2} | = | specified absolute discharge pressure, psia, |
k | = | ratio of specific heats, |
η_{p} | = | assumed polytropic efficiency, |
≈ | 0.72 to 0.85 for centrifugal compressors, | |
and | ||
≈ | 1.00 for reciprocating compressors | |
R_{sect} | = | compression ratio per section, |
n | = | number of sections |
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