AbstractThe generalized Lefschetz number of a selfmap on a finite CW complex is a trace-like quantity that captures both the Lefschetz number and the Nielsen number of the map. In this paper, we will define a relative generalized Lefschetz number for a selfmap f:(X, A) →(X, A) of a finite CW pair, in terms of the generalized Lefschetz numbers of the maps f on X and fA=f∣A on A. From this number one can extract the relative Nielsen number, thereby allowing us to compute it as a trace
Abstract: A class of CW-complexes, called self-similar complexes, is introduced, together with C*-al...
WOS: 000348242800004The goal of this paper is to develop some applications of the Lefschetz fixed po...
AbstractLet X be a connected, locally finite polyhedron. For U a compact, connected subpolyhedron of...
AbstractThe generalized Lefschetz number of a selfmap on a finite CW complex is a trace-like quantit...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
Let A, $X_1$ and $X_2$ be topological spaces and let $i_1 : A → X_1$, $i_2: A → X_2$ be continuous m...
AbstractThere is a useful way of defining a new map ƒ from other given maps ƒA, ƒ1 and ƒ2: the pusho...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
AbstractFor a self-map map ƒ of a given space X, we study the relations among the sequence of intege...
For a self-map f of a given space X, we study the relations among the sequence of integers {L(f(n))}...
Let $f\colon M\to M$ be a self-map on a $3$-dimensional flat Riemannian $M$. We compute the Lefschet...
Let/. It :0 ---0 G be any two self maps of a compact connected oriented Lie group G. In this paper, ...
124 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1999.The thesis obtains the Lefsch...
The reduced Lefschetz number, that is, L(⋅)−1 where L(⋅) denotes the Lefschetz numbe...
AbstractA Lefschetz formula is given that relates loops in a regular finite graph to traces of a cer...
Abstract: A class of CW-complexes, called self-similar complexes, is introduced, together with C*-al...
WOS: 000348242800004The goal of this paper is to develop some applications of the Lefschetz fixed po...
AbstractLet X be a connected, locally finite polyhedron. For U a compact, connected subpolyhedron of...
AbstractThe generalized Lefschetz number of a selfmap on a finite CW complex is a trace-like quantit...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
Let A, $X_1$ and $X_2$ be topological spaces and let $i_1 : A → X_1$, $i_2: A → X_2$ be continuous m...
AbstractThere is a useful way of defining a new map ƒ from other given maps ƒA, ƒ1 and ƒ2: the pusho...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
AbstractFor a self-map map ƒ of a given space X, we study the relations among the sequence of intege...
For a self-map f of a given space X, we study the relations among the sequence of integers {L(f(n))}...
Let $f\colon M\to M$ be a self-map on a $3$-dimensional flat Riemannian $M$. We compute the Lefschet...
Let/. It :0 ---0 G be any two self maps of a compact connected oriented Lie group G. In this paper, ...
124 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1999.The thesis obtains the Lefsch...
The reduced Lefschetz number, that is, L(⋅)−1 where L(⋅) denotes the Lefschetz numbe...
AbstractA Lefschetz formula is given that relates loops in a regular finite graph to traces of a cer...
Abstract: A class of CW-complexes, called self-similar complexes, is introduced, together with C*-al...
WOS: 000348242800004The goal of this paper is to develop some applications of the Lefschetz fixed po...
AbstractLet X be a connected, locally finite polyhedron. For U a compact, connected subpolyhedron of...
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