Partial differential equations: modeling, analysis, computation / R.M.M. Mattheij, S.W. Rienstra, J.H.M. ten Thije Boonkkamp.
Material type:
TextSeries: SIAM monographs on mathematical modeling and computationPublication details: Philadelphia ; Hyderabad ; Society for Industrial and Applied Mathematics 2018.Description: xxxiii, 665 pages : 24 cmISBN: - 9789386235411
- 22 515.353 M431P
| Item type | Current library | Call number | Status | Date due | Barcode |
|---|---|---|---|---|---|
| Gift Books | Library and Documentation Division PGRRL | 515.353 M431P (Browse shelf(Opens below)) | Available | G016901 |
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| 515.352 R56I An introduction to ordinary differential equations / | 515.353 Ev14P-2 Partial differential equations/ | 515.353 H289P Partial differential equations : | 515.353 M431P Partial differential equations: | 515.353 M994L-4 Linear partial differential equations for scientists and engineers / | 515.353 P657P-3 Partial differential equations and boundary-value problems with applications / | 515.353 V449P Partial differential equations : |
Gifted by NBHM
Differential and difference equations --
Characterization and classification --
Fourrier theory --
Distribution and fundamental solutions --
Approximation by finite differences --
The equations of continuum mechanics and electromagnetics --
The art of modeling --
The analysis of elliptic equations --
Numerical methods for elliptic equations --
Analysis of parabolic equations --
Numerical methods for parabolic equations --
Analysis of hyperbolic equations --
Numerical methods for scalar hyperbolic equations --
Numerical methods for hyperbolic systems --
Perturbation methods --
Modeling, analyzing, and simulating problems from practice.
Partial differential equations (PDEs) are used to describe a large variety of physical phenomena, from fluid flow to electromagnetic fields, and are indispensable to such disparate fields as aircraft simulation and computer graphics. While most existing texts on PDEs deal with either analytical or numerical aspects of PDEs, this innovative and comprehensive textbook features a unique approach that integrates analysis and numerical solution methods and includes a third component - modeling - to address real-life problems. The authors believe that modeling can be learned only by doing; hence a separate chapter containing 16 user-friendly case studies of elliptic, parabolic, and hyperbolic equations is included and numerous exercises are included in all other chapters.
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