Two topological definitions of a Nielsen number for coincidences of noncompact maps

The Nielsen number is a homotopic invariant and a lower bound for the number of coincidences of a pair of continuous functions. We give two homotopic (topological) definitions of this number in general situations, based on the approaches of Wecken and Nielsen, respectively, and we discuss why these definitions do not coincide and correspond to two completely different approaches to coincidence theory.

Authors and Affiliations

1. Department of Mathematical Analysis, Faculty of Science, Palacký University, Tomkova 40, Olomouc-Hejčín, 779 00, Czech Republic

   Jan Andres

2. Department of Mathematics, University of Würzburg, Am Hubland, Würzburg, D-97074, Germany

   Martin Väth

3. Fachbereich Mathematik und Informatik (WE1), Freie Universität Berlin, Arnimallee 2-6, Berlin, 14195, Germany

   Martin Väth

Corresponding author

Correspondence to Jan Andres.

Reprints and Permissions