Asymptotic Solving Nonlinear Equations and Idempotent Mathematics

Abstract:

Here we present a way of computation of asymptotic expansions of solutions to algebraic and differential equations and present a survey of some of its applications. The way is based on ideas and algorithms of Power Geometry. Power Geometry has applications in Algebraic Geometry, Differential Algebra, Nonstandard Analysis, Microlocal Analysis, Group Analysis, Tropical/Idempotent Mathematics and so on. We also discuss a connection of Power Geometry with Idempotent Mathematics.

Keywords:

Power Geometry

Publication language:english,
pages:31

Research direction:

Mathematical modelling in actual problems of science and technics