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A Lefschetz-type coincidence theorem

Peter Saveliev — 1999

Fundamenta Mathematicae

A Lefschetz-type coincidence theorem for two maps f,g: X → Y from an arbitrary topological space to a manifold is given: $I_{f g} = λ_{f g}$ , that is, the coincidence index is equal to the Lefschetz number. It follows that if $λ_{f g} \neq 0$ then there is an x ∈ X such that f(x) = g(x). In particular, the theorem contains well-known coincidence results for (i) X,Y manifolds, f boundary-preserving, and (ii) Y Euclidean, f with acyclic fibres. It also implies certain fixed point results for multivalued maps with “point-like” (acyclic)...

Fixed points and selections of set-valued maps on spaces with convexity.

Saveliev, Peter — 2000

International Journal of Mathematics and Mathematical Sciences

Higher-order Nielsen numbers.

Saveliev, Peter — 2005

Fixed Point Theory and Applications [electronic only]

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