Add to ORKGNielsen coincidence theory is concerned with the determination of a lower bound of the minimal number MC [ f; g] of coincidence points for all maps in the homotopy class of a given map. f; g / : X! Y. The Nielsen number N. f; g / is always a lower bound for MC [ f; g]. The relative Nielsen numbe
Abstract. Basic examples show that coincidence theory is intimately related to central subjects of d...
The Nielsen coincidence theory is well understood for a pair of maps between $n$-dimensional compact...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
Abstract. In classical fixed point and coincidence theory the notion of Nielsen numbers has proved t...
AbstractIn this work we generalize two aspects of Nielsen fixed point theory on the complement to Ni...
The Nielsen number is a homotopic invariant and a lower bound for the number of co-incidences of a p...
by Jerzy J e z i e r s k i (Warszawa) Abstract. We define a relative coincidence Nielsen number Nrel...
We give an algorithm to compute the coincidence Nielsen number N(f,g), introduced in [DJ], for pairs...
In this thesis, we develop relative coincidence theory on the complement and equivariant coincidence...
for maps into real projective spaces by Jerzy J e z i e r s k i (Warszawa) Abstract. We give an algo...
AbstractWe extend the Nielsen theory of coincidence sets to equalizer sets, the points where a given...
AbstractThe Nielsen coincidence theory is well understood for a pair of maps (f,g):Mn→Nn where M and...
Abstract. Given two maps f1, f2: Mm − → Nn between manifolds of the in-dicated arbitrary dimensions,...
AbstractThe main thrust of this paper is to generalize certain aspects of equivariant Nielsen fixed ...
AbstractThis work studies the coincidence theory of a pair of maps (f, g) from a complex K into a co...
Abstract. Basic examples show that coincidence theory is intimately related to central subjects of d...
The Nielsen coincidence theory is well understood for a pair of maps between $n$-dimensional compact...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
Abstract. In classical fixed point and coincidence theory the notion of Nielsen numbers has proved t...
AbstractIn this work we generalize two aspects of Nielsen fixed point theory on the complement to Ni...
The Nielsen number is a homotopic invariant and a lower bound for the number of co-incidences of a p...
by Jerzy J e z i e r s k i (Warszawa) Abstract. We define a relative coincidence Nielsen number Nrel...
We give an algorithm to compute the coincidence Nielsen number N(f,g), introduced in [DJ], for pairs...
In this thesis, we develop relative coincidence theory on the complement and equivariant coincidence...
for maps into real projective spaces by Jerzy J e z i e r s k i (Warszawa) Abstract. We give an algo...
AbstractWe extend the Nielsen theory of coincidence sets to equalizer sets, the points where a given...
AbstractThe Nielsen coincidence theory is well understood for a pair of maps (f,g):Mn→Nn where M and...
Abstract. Given two maps f1, f2: Mm − → Nn between manifolds of the in-dicated arbitrary dimensions,...
AbstractThe main thrust of this paper is to generalize certain aspects of equivariant Nielsen fixed ...
AbstractThis work studies the coincidence theory of a pair of maps (f, g) from a complex K into a co...
Abstract. Basic examples show that coincidence theory is intimately related to central subjects of d...
The Nielsen coincidence theory is well understood for a pair of maps between $n$-dimensional compact...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...