Decline Curve Analysis - wiki.pengtools.com

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Contents

1 Brief
2 Math & Physics
3 Discussion
4 Workflow
- 4.1 Nomenclature
5 References

Brief

Decline Curve Analysis (DCA) is an empirical method for rate decline analysis and rate forecasting published by Arps in 1945 ^[1].

DCA is applied for Wells and Reservoirs production forecasting.

Math & Physics

Note	Rate	Cumulative
Hyperbolic decline, 0 < b < 1 ^[2]	$q(t) = \frac{q_i}{(1+b\ D_i\ t)^{1/b}}$	$Q = \frac{q^b_i}{D_i\ (1-b)} (q^{1-b}_i-q(t)^{1-b})$
Exponential decline, b = 0	$q(t) = {q_i}\ e^{-D_i\ t}$	$Q = \frac{q_i-q(t)}{D_i}$
Harmonic decline, b = 1	$q(t) = \frac{q_i}{1+D_i\ t}$	$Q = \frac{q_i}{D_i} ln{\frac{q_i}{q(t)}}$

Discussion

If one has a need to convert decline factor D_i to the actual annual decline in %:

if\ b > 0, a = (1 - (1 + b\ D_i)^{- 1 / b}) \times 100

if\ b = 0, a = (1 - e^{-D_i}) \times 100

Workflow

Create Field https://ep.pengtools.com/field/index
Upload Wells https://ep.pengtools.com/well/index
Upload Wells Daily Measures https://ep.pengtools.com/daily/measures/upload
Open DCA tool https://ep.pengtools.com/typecurve/oil-plot

Nomenclature

a

= annual decline, %

b

= decline curve parametr, dimensionless

D_i

= decline factor per time t, dimensionless

q_i

= initial rate, any rate units applies

q(t)

= rate at time t, any rate units applies

Q

= cumulatve rate at time t, any rate units applies

t

= forecast time, days

References

↑ Arps, J. J. (1945). "Analysis of Decline Curves". Transactions of the AIME. Society of Petroleum Engineers. 160 (01).
↑ "KAPPA Dynamic Data Analysis (DDA) book".

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