Add to ORKGIn the study of fixed point theorems for a continuous map f: X ~ X, X a compact connected metric ANR, there are several interesting numbers associated with the map f. Namely, they are the Lefschetz number L(f), the Nielse
AbstractLet p: E→B be a principal G-bundle where G is a compact connected Lie group, p′:E′→B′ be a f...
In the study of the fixed point properties of a con tinuous map f: X + X from a compact, connected A...
This paper concerns a formula which relates the Lefschetz number L( f ) for a map f:M&#x...
Let f: X ~ X be a continuous map on a compact connected ANR X into itself. The Nielsen fixed point t...
AbstractIn this paper, we introduce a Nielsen type number NF(ƒ, p) for a fibre preserving map ƒ of a...
Let f: X-> X be a continuous map from a compact connected ANR, X, into itself. We are interested ...
Let $f\colon M\to M$ be a self-map on a $3$-dimensional flat Riemannian $M$. We compute the Lefschet...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
1. Introduction. Let F = (E,p,B) denote a (orientable) fiber space and suppose we have a fiber prese...
Let f: X → X be a map of a compact, connected Riemannian manifold, with or without boundary. For >...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
AbstractLet X be a connected, finite dimensional, locally compact polyhedron. Let f:U→X be a compact...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
Using averaging formulas, we compute the Lefschetz, Nielsen and Reidemeister numbers of maps on infr...
The relative Reidemeister number, denoted by $\text{\rm R}(f;X,A)$, is an upper bound for the rela...
AbstractLet p: E→B be a principal G-bundle where G is a compact connected Lie group, p′:E′→B′ be a f...
In the study of the fixed point properties of a con tinuous map f: X + X from a compact, connected A...
This paper concerns a formula which relates the Lefschetz number L( f ) for a map f:M&#x...
Let f: X ~ X be a continuous map on a compact connected ANR X into itself. The Nielsen fixed point t...
AbstractIn this paper, we introduce a Nielsen type number NF(ƒ, p) for a fibre preserving map ƒ of a...
Let f: X-> X be a continuous map from a compact connected ANR, X, into itself. We are interested ...
Let $f\colon M\to M$ be a self-map on a $3$-dimensional flat Riemannian $M$. We compute the Lefschet...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
1. Introduction. Let F = (E,p,B) denote a (orientable) fiber space and suppose we have a fiber prese...
Let f: X → X be a map of a compact, connected Riemannian manifold, with or without boundary. For >...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
AbstractLet X be a connected, finite dimensional, locally compact polyhedron. Let f:U→X be a compact...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
Using averaging formulas, we compute the Lefschetz, Nielsen and Reidemeister numbers of maps on infr...
The relative Reidemeister number, denoted by $\text{\rm R}(f;X,A)$, is an upper bound for the rela...
AbstractLet p: E→B be a principal G-bundle where G is a compact connected Lie group, p′:E′→B′ be a f...
In the study of the fixed point properties of a con tinuous map f: X + X from a compact, connected A...
This paper concerns a formula which relates the Lefschetz number L( f ) for a map f:M&#x...