# eBook Mathematical models and finite elements for reservoir simulation: Single phase, multiphase, and multicomponent flows through porous media (Studies in mathematics and its applications) download

## by Guy Chavent

**ISBN:**0444700994

**Author:**Guy Chavent

**Publisher:**Sole distributors for the U.S.A. and Canada, Elsevier Science Pub. Co (1986)

**Language:**English

**Pages:**376

**ePub:**1640 kb

**Fb2:**1387 kb

**Rating:**4.3

**Other formats:**lrf lrf mbr rtf

**Category:**Engineering

**Subcategory:**Engineering

Guy Chavent, Jerome Jaffre.

Guy Chavent, Jerome Jaffre. Chavent . Jaffre J. Mathematical models and finite elements for reservoir simulation (1986)(ISBN 0444700994).

Start by marking Mathematical Models and Finite Elements for . Mathematical Models and Finite Elements for Reservoir Simulation (Studies in Mathematics & Its Applications).

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Электронная книга "Mathematical Models and Finite Elements for Reservoir Simulation: Single Phase, Multiphase and Multicomponent Flows through Porous Media", G. Chavent, J. Jaffré. Эту книгу можно прочитать в Google Play Книгах на компьютере, а также на устройствах Android и iOS. Выделяйте текст, добавляйте закладки и делайте заметки, скачав книгу "Mathematical Models and Finite Elements for Reservoir Simulation: Single Phase, Multiphase and Multicomponent Flows through Porous Media" для чтения в офлайн-режиме.

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A finite element approximation technique based on the global pressure variational model is presented, and new approaches to the modelling of various kinds of multiphase flow through porous media ar. .

A finite element approximation technique based on the global pressure variational model is presented, and new approaches to the modelling of various kinds of multiphase flow through porous media are introduced. Much of the material is highly original, and has not been presented elsewhere. Numerical simulators for oil reservoirs have been developed over the last twenty years and are now widely used by oil companies.

Single Phase, Multiphase and Multicomponent Flows through Porous Media. Basic Laws and Models for Flow in Porous Media. Authors: G. Chavent J. The Geometry of the Field. The Basic Laws for One and Two-Phase Flow. The book aims to initiate a rigorous mathematical study of the immiscible flow models, partly by using the novel & pressure' approach in treating incompressible two-phase problems. The mathematical and numerical models should be of great interest to applied mathematicians, and to engineers seeking an alternative approach to reservoir modelling. Read on the Scribd mobile app. Download the free Scribd mobile app to read anytime, anywhere.

PDF On Jan 1, 1986, G. Chavent and others published Mathematical Models and Finite Elements in Reservoir . Chavent and others published Mathematical Models and Finite Elements in Reservoir Simulation. The mathematical model expressing the behavior of two fluids with or without components in a porous medium relies on a strongly nonlinear system of partial differential equations where the unknowns are the pressure and saturation of the phases, see the book of Chen.

Through Porous Media (Studies in Mathematics & its Applications): Foxing on top edge of the book. Bibliographic Details. Title: Mathematical Models and Finite Elements for.

com: Mathematical Models and Finite Elements for Reservoir Simulation: Single Phase, Multiphase and Multicomponent Flows Through Porous Media (Studies in Mathematics & its Applications): Foxing on top edge of the book. Item is intact, but may show shelf wear. Pages may include notes and highlighting. May or may not include supplemental or companion material. Publisher: Elsevier Science Ltd Publication Date: 1986 Binding: Hardcover Book Condition: Acceptable.

KEYWORDS: Porous Medium, Uniqueness of a Solution, Degenerate Equation, Immiscible Two-Phase Flow, Regularization, Phase Mobility. JOURNAL NAME: Applied Mathematics, Vo. N., May 6, 2011

KEYWORDS: Porous Medium, Uniqueness of a Solution, Degenerate Equation, Immiscible Two-Phase Flow, Regularization, Phase Mobility., May 6, 2011. ABSTRACT: We give a sufficient condition for uniqueness for the pressure/saturation system. We establish this condition through analytic arguments, and then construct mobilities (or mobility-like functions) that satisfy the new condition (when the parameter is 2). For the constructed mobilities, we do graphical experiments that show, empirically, that this condition could be satisfied for other values of.