AbstractAs the title suggests, this paper gives a Nielsen theory of coincidences of iterates of two self maps f,g:X→X of a closed manifold X. The idea is, as much as possible, to generalize Nielsen type periodic point theory, but there are many obstacles. Familiar results as in periodic point theory are obtained, but often require stronger hypotheses
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractIn addition to the many different Nielsen-type numbers that have been introduced to study fi...
The Nielsen number is a homotopic invariant and a lower bound for the number of co-incidences of a p...
As the title suggests, this paper gives a Nielsen theory of coincidences of iterates of two self map...
AbstractAs the title suggests, this paper gives a Nielsen theory of coincidences of iterates of two ...
The Nielsen coincidence theory on topological manifolds by Jerzy J e z i e r s k i (Warszawa) Abstra...
In classical fixed point and coincidence theory, the notion of Nielsen numbers has proved to be extr...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
for maps into real projective spaces by Jerzy J e z i e r s k i (Warszawa) Abstract. We give an algo...
by Jerzy J e z i e r s k i (Warszawa) Abstract. We define a relative coincidence Nielsen number Nrel...
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,...
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 authors study the coincidence theory for pairs of maps from the Torus to the Klein bottle. Reide...
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractIn addition to the many different Nielsen-type numbers that have been introduced to study fi...
The Nielsen number is a homotopic invariant and a lower bound for the number of co-incidences of a p...
As the title suggests, this paper gives a Nielsen theory of coincidences of iterates of two self map...
AbstractAs the title suggests, this paper gives a Nielsen theory of coincidences of iterates of two ...
The Nielsen coincidence theory on topological manifolds by Jerzy J e z i e r s k i (Warszawa) Abstra...
In classical fixed point and coincidence theory, the notion of Nielsen numbers has proved to be extr...
AbstractNielsen coincidence theory is extended to manifolds with boundary. For X and Y compact conne...
for maps into real projective spaces by Jerzy J e z i e r s k i (Warszawa) Abstract. We give an algo...
by Jerzy J e z i e r s k i (Warszawa) Abstract. We define a relative coincidence Nielsen number Nrel...
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,...
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 authors study the coincidence theory for pairs of maps from the Torus to the Klein bottle. Reide...
In this paper we continue to study (“strong”) Nielsen coincidence numbers (which were introduced rec...
AbstractIn addition to the many different Nielsen-type numbers that have been introduced to study fi...
The Nielsen number is a homotopic invariant and a lower bound for the number of co-incidences of a p...
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