Coincidence theory for spaces which fiber over a nilmanifold.
Wong, Peter (2004)
Fixed Point Theory and Applications [electronic only]
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Displaying similar documents to “Coincidence free pairs of maps”
Coincidence theory for spaces which fiber over a nilmanifold.
Wecken type problems for self-maps of the Klein bottle.
Gonçalves, D.L., Kelly, M.R. (2006)
Fixed Point Theory and Applications [electronic only]
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Geometric and homotopy theoretic methods in Nielsen coincidence theory.
Koschorke, Ulrich (2006)
Fixed Point Theory and Applications [electronic only]
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Higher-order Nielsen numbers.
Saveliev, Peter (2005)
Fixed Point Theory and Applications [electronic only]
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Connectivity properties for subspaces of function spaces determined by fixed points.
Gonçalves, Daciberg L., Kelly, Michael R. (2003)
Abstract and Applied Analysis
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On bundles over a sphere with fibre Euclidean space
C. Wall (1967)
Fundamenta Mathematicae
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Two topological definitions of a Nielsen number for coincidences of noncompact maps.
Andres, Jan, Väth, Martin (2004)
Fixed Point Theory and Applications [electronic only]
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On generalizing the Nielsen coincidence theory to non-oriented manifolds
Jerzy Jezierski (1999)
Banach Center Publications
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We give an outline of the Nielsen coincidence theory emphasizing differences between the oriented and non-oriented cases.
Epsilon Nielsen coincidence theory
Marcio Fenille (2014)
Open Mathematics
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We construct an epsilon coincidence theory which generalizes, in some aspect, the epsilon fixed point theory proposed by Robert Brown in 2006. Given two maps f, g: X → Y from a well-behaved topological space into a metric space, we define µ ∈(f, g) to be the minimum number of coincidence points of any maps f 1 and g 1 such that f 1 is ∈ 1-homotopic to f, g 1 is ∈ 2-homotopic to g and ∈ 1 + ∈ 2 < ∈. We prove that if Y is a closed Riemannian manifold, then it is possible to attain µ...