Finite volume methods for solving hyperbolic partial differential equations on curved manifolds

Finite volume methods for solving hyperbolic partial differential equations on curved manifolds

The natural mathematical arena to formulate conservation laws on curve manifolds is that of differential geometry. Ricci developed this branch of mathematics from 1887 to 1896. Subsequent work in differential geometry has made it an indespensible tool for solving in mathematical physics. The idea f...

Descrición completa

Detalles Bibliográficos
Autor Principal:	Rahman, Moshiour
Formato:	Artigo
Idioma:	English
Publicado:	BRAC University 2010
Subjects:	Finite volume methods Curved manifolds Conservation law Wave propagation
Acceso en liña:	http://hdl.handle.net/10361/533

Títulos similares

Finite volume methods for solving hyperbolic problems on euclidean manifolds without radially symmetric initial condition
por: Rahaman, Moshiour, et al.
Publicado: (2010)

Finite difference schemes and partial differential equations /
por: Strikwerda, John C., 1947-
Publicado: (2004)

An introduction to differentiable manifolds and Riemannian geometry /
por: Boothby, William M. (William Munger), 1918-
Publicado: (2003)

Finite element methods for integrodifferential equations /
por: Chen, Chuanmiao
Publicado: (1998)

The finite element method in engineering /
por: Rao, S. S.
Publicado: (2005)

Numerical approximation of a nonlinear parabolic partial differential equation
por: Bhowmik, Samir K.
Publicado: (2010)

Differential geometry of curves & surfaces /
por: Carmo, Manfredo Perdigão Do
Publicado: (2016)

An introduction to manifolds /
por: Tu, Loring W.
Publicado: (2011)

Tensor analysis on manifolds /
por: Bishop, Richard L.
Publicado: (1980)

Algebraic curves : an introduction to algebraic geometry /
por: Fulton, William
Publicado: (1969)

Introduction to smooth manifolds /
por: Lee, John M.
Publicado: (2013)

The arithmetic of elliptic curves /
por: Silverman, Joseph H., 1955-
Publicado: (2009)

Normally Hyperbolic Invariant Manifolds
por: Eldering
Publicado: (2013)

Plant propagation : principles and practices /
Publicado: (2007)

Distortionary Taxation and the Debt Laffer Curve /
por: Husain, Aasim
Publicado: (1992)

Partial Differential Equations
por: Jost
Publicado: (2013)

Partial differential equations /
por: John, Fritz, 1910-
Publicado: (1982)

Partial differential equations /
por: Bit͡s︡adze, A. V. (Andreĭ Vasilʹevich), 1916-
Publicado: (1994)

Manifolds, tensors, and forms : an introduction for mathematicians and physicists /
por: Renteln, Paul, 1959-
Publicado: (2014)

Multiscale methods

Numerical Methods for Partial Differential Equations

Numerical solution of partial differential equations : finite difference methods /
por: Smith, G. D. (Gordon D.)
Publicado: (1985)

Progress in Partial Differential Equations
Publicado: (2013)

Communications in Partial Differential Equations

Communications in Partial Differential Equations

Introduction to partial differential equations /
por: Rao, K. Sankara
Publicado: (1995)

Ordinary and partial differential equations /
por: Raisighania, M. D.
Publicado: (2000)

Introduction to partial differential equations /
por: Rao, K. Sankara
Publicado: (1995)

Study on Chohomology of supermanifolds
por: Ahmed, M. Khondokar
Publicado: (2010)

Meshfree Methods for Partial Differential Equations VI
Publicado: (2013)

Wavelet methods for elliptic partial differential equations
por: Urban, Karsten

Ordinary Differential Equations
por: Bernd J. Schroers
Publicado: (2012)

Algebraic Approaches to Partial Differential Equations
por: Xu
Publicado: (2013)

Analysis and Numerics of Partial Differential Equations
Publicado: (2013)

Nonlinear Partial Differential Equations with Applications
por: RoubÃÄek
Publicado: (2013)

Geometric Partial Differential Equations proceedings
Publicado: (2013)

International Journal of Partial Differential Equations

Calculus of Variations & Partial Differential Equations

Calculus of Variations and Partial Differential Equations

Flattening of the Phillips Curve : Implications for Monetary Policy /
por: Iakova, Dora
Publicado: (2007)