A theoretical introduction to numerical analysis

By: Ryaben'kii, Victor S.; Tsynkov, Semyon VMaterial type: TextTextPublication details: Boca Raton Chapman & Hall (Taylor & Francis group) 2007Description: xiii, 537 ppISBN: 9781584886075Subject(s): Mathematics; AnalysisLOC classification: QA297
Contents:
1. Introduction; I. Interpolation of functions. Quadratures; 2. Algebraic interpolation; 3. Trigonometric interpolation; 4. Computation of definite integrals. Quadratures; II Systems of Scalar equations; 5. Systems of linear algebraic equations: direct methods; 6. Iterative methods for solving linear systems; 7. Overdetermined linear systems. The method of least squares; 8. Numerical solution of nonlinear equations and systems; III. The method of finite differences for the numerical solution of differential equation; 9. Numerical solution of ordinary differential equations; 10. Finite-difference schemes for partial differential equations; 11. Discontinuous solutions and methods of their computation; 12. Discrete methods for elliptic problems; IV. The methods of boundary equations for the numerical solution of boundary value problems; 13. Boundary integral equations and the method of boundary elements; 14. Boundary equations with projections and the method of difference potentials
List(s) this item appears in: Gift Books
Tags from this library: No tags from this library for this title. Log in to add tags.
    Average rating: 0.0 (0 votes)

1. Introduction;
I. Interpolation of functions. Quadratures;
2. Algebraic interpolation;
3. Trigonometric interpolation;
4. Computation of definite integrals. Quadratures;
II Systems of Scalar equations;
5. Systems of linear algebraic equations: direct methods;
6. Iterative methods for solving linear systems;
7. Overdetermined linear systems. The method of least squares;
8. Numerical solution of nonlinear equations and systems;
III. The method of finite differences for the numerical solution of differential equation;
9. Numerical solution of ordinary differential equations;
10. Finite-difference schemes for partial differential equations;
11. Discontinuous solutions and methods of their computation;
12. Discrete methods for elliptic problems;
IV. The methods of boundary equations for the numerical solution of boundary value problems;
13. Boundary integral equations and the method of boundary elements;
14. Boundary equations with projections and the method of difference potentials

There are no comments on this title.

to post a comment.