Let be a finite connected complex and a fibration over a compact nilmanifold . For any finite complex and maps , we show that the Nielsen coincidence number vanishes if the Reidemeister coincidence number is infinite. If, in addition, is a compact manifold and is the constant map at a point , then is deformable to a map such that .</p
Let f1, …, fk: M → N be maps between closed manifolds, N(f1, …, fk ) and R(f1, …, fk ) be the Nielse...
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractThe Nielsen coincidence theory is well understood for a pair of maps (f,g):Mn→Nn where M and...
LetY be a finite connected complex and p: Y →N a fibration over a compact nilmanifold N. For any fin...
Given a pair of maps f, g: N1 → N2 where N1, N2 are compact nilmanifolds of the same dimension, in [...
AbstractLet us consider a compact orientable manifold M and (f,g) a pair of selfmaps of M. When M be...
Dedicated to Albrecht Dold on the occasion of his 80th birthday Abstract. Let M → B, N → B be fibrat...
Abstract. Given two maps f1, f2: Mm − → Nn between manifolds of the in-dicated arbitrary dimensions,...
Let M -> B, N -> B be fibrations and f(1), f(2): M -> N be a pair of fibre-preserving maps. Using no...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
The Nielsen coincidence theory is well understood for a pair of maps between $n$-dimensional compact...
AbstractThis work studies the coincidence theory of a pair of maps (f, g) from a complex K into a co...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
the converse of the Lefschetz coincidence theorem by Peter Wong (Lewiston, Me.) Abstract. Let f, g: ...
Let $M \to B$, $N \to B$ be fibrations and $f_1,f_2\colon M \to N$ be a pair of fibre-preserving m...
Let f1, …, fk: M → N be maps between closed manifolds, N(f1, …, fk ) and R(f1, …, fk ) be the Nielse...
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractThe Nielsen coincidence theory is well understood for a pair of maps (f,g):Mn→Nn where M and...
LetY be a finite connected complex and p: Y →N a fibration over a compact nilmanifold N. For any fin...
Given a pair of maps f, g: N1 → N2 where N1, N2 are compact nilmanifolds of the same dimension, in [...
AbstractLet us consider a compact orientable manifold M and (f,g) a pair of selfmaps of M. When M be...
Dedicated to Albrecht Dold on the occasion of his 80th birthday Abstract. Let M → B, N → B be fibrat...
Abstract. Given two maps f1, f2: Mm − → Nn between manifolds of the in-dicated arbitrary dimensions,...
Let M -> B, N -> B be fibrations and f(1), f(2): M -> N be a pair of fibre-preserving maps. Using no...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
The Nielsen coincidence theory is well understood for a pair of maps between $n$-dimensional compact...
AbstractThis work studies the coincidence theory of a pair of maps (f, g) from a complex K into a co...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
the converse of the Lefschetz coincidence theorem by Peter Wong (Lewiston, Me.) Abstract. Let f, g: ...
Let $M \to B$, $N \to B$ be fibrations and $f_1,f_2\colon M \to N$ be a pair of fibre-preserving m...
Let f1, …, fk: M → N be maps between closed manifolds, N(f1, …, fk ) and R(f1, …, fk ) be the Nielse...
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractThe Nielsen coincidence theory is well understood for a pair of maps (f,g):Mn→Nn where M and...
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