A New Approach for Modeling Dual Porosity Reservoirs Using Recovery Curves

Publikationen: Thesis / Studienabschlussarbeiten und HabilitationsschriftenDissertation

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A New Approach for Modeling Dual Porosity Reservoirs Using Recovery Curves. / Pirker, Barbara.
2008. 142 S.

Publikationen: Thesis / Studienabschlussarbeiten und HabilitationsschriftenDissertation

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@phdthesis{6e54346c99ab4b46a36afcbdb3efe4d5,
title = "A New Approach for Modeling Dual Porosity Reservoirs Using Recovery Curves",
abstract = "Up to now, the dual continuum concept has been used to model dual porosity reservoirs. The mass exchange between the matrix and the fracture system is described by the so-called transfer term, based on the Kazemi approach using a single value for the shape factor. The deficiencies of the dual continuum approach are well known. This work introduces a new method and an appropriate workflow which assures a considerably higher physical reality, captures the heterogeneity of the matrix domain in a better way, and is more practical and computationally efficient. The work presumes that the shape factor can not be seen as a single average value. Instead, a statistical distribution of the shape factor has to be considered. Single porosity small-scale models are used to simulate the matrix depletion processes. The results of these small scale simulations are the recovery curves, which will be consolidated according to any given shape factor distribution. The consolidated recovery curves as function of time, are the best possible representation of the recovery from any simulation cell. They are directly used to describe the matrix-fracture mass transfer in full field simulation models. The conventional transfer function is not replaced completely, the recovery curve method can be used in combination with it. The applicability of the new approach is demonstrated on a real field example.",
keywords = "dual porosity, matrix block, recovery processes, reservoir simulation, doppelp{\"o}r{\"o}se Lagerst{\"a}tte, Matrix Block, Ent{\"o}lungsprozesse, Lagerst{\"a}ttensimulation",
author = "Barbara Pirker",
note = "no embargo",
year = "2008",
language = "English",

}

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TY - BOOK

T1 - A New Approach for Modeling Dual Porosity Reservoirs Using Recovery Curves

AU - Pirker, Barbara

N1 - no embargo

PY - 2008

Y1 - 2008

N2 - Up to now, the dual continuum concept has been used to model dual porosity reservoirs. The mass exchange between the matrix and the fracture system is described by the so-called transfer term, based on the Kazemi approach using a single value for the shape factor. The deficiencies of the dual continuum approach are well known. This work introduces a new method and an appropriate workflow which assures a considerably higher physical reality, captures the heterogeneity of the matrix domain in a better way, and is more practical and computationally efficient. The work presumes that the shape factor can not be seen as a single average value. Instead, a statistical distribution of the shape factor has to be considered. Single porosity small-scale models are used to simulate the matrix depletion processes. The results of these small scale simulations are the recovery curves, which will be consolidated according to any given shape factor distribution. The consolidated recovery curves as function of time, are the best possible representation of the recovery from any simulation cell. They are directly used to describe the matrix-fracture mass transfer in full field simulation models. The conventional transfer function is not replaced completely, the recovery curve method can be used in combination with it. The applicability of the new approach is demonstrated on a real field example.

AB - Up to now, the dual continuum concept has been used to model dual porosity reservoirs. The mass exchange between the matrix and the fracture system is described by the so-called transfer term, based on the Kazemi approach using a single value for the shape factor. The deficiencies of the dual continuum approach are well known. This work introduces a new method and an appropriate workflow which assures a considerably higher physical reality, captures the heterogeneity of the matrix domain in a better way, and is more practical and computationally efficient. The work presumes that the shape factor can not be seen as a single average value. Instead, a statistical distribution of the shape factor has to be considered. Single porosity small-scale models are used to simulate the matrix depletion processes. The results of these small scale simulations are the recovery curves, which will be consolidated according to any given shape factor distribution. The consolidated recovery curves as function of time, are the best possible representation of the recovery from any simulation cell. They are directly used to describe the matrix-fracture mass transfer in full field simulation models. The conventional transfer function is not replaced completely, the recovery curve method can be used in combination with it. The applicability of the new approach is demonstrated on a real field example.

KW - dual porosity

KW - matrix block

KW - recovery processes

KW - reservoir simulation

KW - doppelpöröse Lagerstätte

KW - Matrix Block

KW - Entölungsprozesse

KW - Lagerstättensimulation

M3 - Doctoral Thesis

ER -