Calculations of rock matrix modulus based on a linear regression relation
He Xi-Lei1, He Zhen-Hua1, Wang Rui-Liang2, Wang Xu-Ben1, and Jiang Lian1
1. State key laboratory of oil and gas reservoir geology and exploitation, Chengdu University of Technology, Chengdu 610059, China.
2. CNOOC Shenzhen Inc. Shenzhen 518067, China.
Abstract:
The rock matrix bulk modulus or its inverse, the compressive coefficient, is an important input parameter for fluid substitution by the Biot-Gassmann equation in reservoir prediction. However, it is not easy to accurately estimate the bulk modulus by using conventional methods. In this paper, we present a new linear regression equation for calculating the parameter. In order to get this equation, we fi rst derive a simplifi ed Gassmann equation by using a reasonable assumption in which the compressive coefficient of the saturated pore fl uid is much greater than the rock matrix, and, second, we use the Eshelby-Walsh relation to replace the equivalent modulus of a dry rock in the Gassmann equation. Results from the rock physics analysis of rock sample from a carbonate area show that rock matrix compressive coeffi cients calculated with water-saturated and dry rock samples using the linear regression method are very close (their error is less than 1%). This means the new method is accurate and reliable.
HE Xi-Lei,HE Zhen-Hua,WANG Rui-Liang et al. Calculations of rock matrix modulus based on a linear regression relation[J]. APPLIED GEOPHYSICS, 2011, 8(3): 155-162.
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2011, Vol. 8 
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