講義案内 前田研究室 maedalab Diffusion1D

ABSTRACT: The decomposition method is applied to examples of hyperbolic, parabolic, and elliptic partlal differential equations without use of linearlzatlon techniques.. We

We use subfunctions and superfunctions to derive su ffi cient conditions for the existence of extremal solutions to initial value problems for ordinary differential equations

We also point out that even for some semilinear partial differential equations with simple characteristics Theorem 11 and Theorem 12 imply new results for the local solvability in

Secondly, we establish some existence- uniqueness theorems and present sufficient conditions ensuring the H 0 -stability of mild solutions for a class of parabolic stochastic

Sickel.; Sobolev spaces of fractional order, Nemytskij operators and nonlinear partial differential equations, 1996, New York. Svetlin

Rach, Equality of partial solutions in the decomposition method for linear or nonlinear partial differential equations, Computers & Mathematics with Applications 19 (1990),

Rach, Equality of partial solutions in the decomposition method for linear or nonlinear partial differential equations, Computers & Mathematics with Applications 19 (1990),

The final-value problem for systems of partial differential equations play an important role in engineering areas, which aims to obtain the previous data of a physical field from