AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f) = ¦L(f)¦ where N(f) and L(f) denote the Nielsen and the Lefschetz numbers of f, respectively. We generalize this result for relative Nielsen type numbers to selfmaps of pairs of nilmanifolds. As an application, we estimate the minimal number of periodic points of prime power period
AbstractMcCord (1991) claimed that Nielsen coincidence numbers and Lefschetz coincidence numbers are...
AbstractFor f:X→X, with X a compact manifold, Nielsen periodic point theory involves the calculation...
We study the asymptotic behavior of the sequence of the Nielsen numbers $\{N(f^k)\}$, the essential ...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
Two homotopy invariant Nielsen type numbers exist for periodic points of a self-map f:X --> X of ...
AbstractLet f:(X,A)→(X,A) be a self-map of a pair of compact ANRs, with X connected. In 1989 the sec...
Two homotopy invariant Nielsen type numbers exist for periodic points of a self-map f:X --> X of ...
AbstractTwo homotopy invariant Nielsen type numbers exist for periodic points of a self-map ƒ: X → X...
AbstractIn this paper and its sequel we give results and methods for evaluating the Nielsen type num...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
AbstractIn the first paper we showed for all maps f on nilmanifolds, and for weakly Jiang maps on so...
This third paper of the series gives the necessarily lengthy illustrations of the main results of th...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
This paper continues [4], and discusses the Nielsen-type number N-PHI(n)(f) of periodic points of al...
AbstractMcCord (1991) claimed that Nielsen coincidence numbers and Lefschetz coincidence numbers are...
AbstractFor f:X→X, with X a compact manifold, Nielsen periodic point theory involves the calculation...
We study the asymptotic behavior of the sequence of the Nielsen numbers $\{N(f^k)\}$, the essential ...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
Abstract:- D. Anosov showed that for any selfmap f: X! X of a nilmanifold X,N(f) = L(f) whereN(f) a...
Two homotopy invariant Nielsen type numbers exist for periodic points of a self-map f:X --> X of ...
AbstractLet f:(X,A)→(X,A) be a self-map of a pair of compact ANRs, with X connected. In 1989 the sec...
Two homotopy invariant Nielsen type numbers exist for periodic points of a self-map f:X --> X of ...
AbstractTwo homotopy invariant Nielsen type numbers exist for periodic points of a self-map ƒ: X → X...
AbstractIn this paper and its sequel we give results and methods for evaluating the Nielsen type num...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
AbstractIn the first paper we showed for all maps f on nilmanifolds, and for weakly Jiang maps on so...
This third paper of the series gives the necessarily lengthy illustrations of the main results of th...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
This paper continues [4], and discusses the Nielsen-type number N-PHI(n)(f) of periodic points of al...
AbstractMcCord (1991) claimed that Nielsen coincidence numbers and Lefschetz coincidence numbers are...
AbstractFor f:X→X, with X a compact manifold, Nielsen periodic point theory involves the calculation...
We study the asymptotic behavior of the sequence of the Nielsen numbers $\{N(f^k)\}$, the essential ...
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