Singular boundary value problems via the Conley index

Authors

  • Tomáš Gedeon
  • Konstantin Mischaikow

Keywords

Singular boundary value problems, Conley index

Abstract

We use Conley index theory to solve the singular boundary value problem $\varepsilon^2D u_{xx} + f(u,\varepsilon u_x,x) = 0$ on an interval $[-1,1]$, where $u \in \mathbb R^n$ and $D$ is a diagonal matrix, with separated boundary conditions. Since we use topological methods the assumptions we need are weaker then the standard set of assumptions. The Conley index theory is used here not for detection of an invariant set, but for tracking certain cohomological information, which guarantees existence of a solution to the boundary value problem.

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Published

2006-12-01

How to Cite

1.
GEDEON, Tomáš and MISCHAIKOW, Konstantin. Singular boundary value problems via the Conley index. Topological Methods in Nonlinear Analysis. Online. 1 December 2006. Vol. 28, no. 2, pp. 263 - 283. [Accessed 5 July 2025].

Issue

Vol 28, No 2 (December 2006)

Section

Articles

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