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
AbstractLet f:(X,A)→(X,A) be a self map of a pair of compact polyhedra. We define two new Nielsen ty...
AbstractTwo homotopy invariant Nielsen type numbers exist for periodic points of a self-map ƒ: X → X...
AbstractSuppose M1,M2 are compact, connected orientable manifolds of the same dimension. Then for al...
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...
AbstractIn this paper and its sequel we give results and methods for evaluating the Nielsen type num...
AbstractIn this paper, we introduce a Nielsen type number N∗(f,P) for any selfmap f of a partially o...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
AbstractIn this paper, we introduce a Nielsen type number NF(ƒ, p) for a fibre preserving map ƒ of a...
AbstractIt is known that the relative Nielsen number N(f; X, A), the Nielsen number of the complemen...
AbstractFor f:X→X, with X a compact manifold, Nielsen periodic point theory involves the calculation...
AbstractIn the first paper we showed for all maps f on nilmanifolds, and for weakly Jiang maps on so...
AbstractIn this note, we generalize the various existing local and relative Nielsen type numbers to ...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
AbstractLet f:(X,A)→(X,A) be a self map of a pair of compact polyhedra. We define two new Nielsen ty...
AbstractTwo homotopy invariant Nielsen type numbers exist for periodic points of a self-map ƒ: X → X...
AbstractSuppose M1,M2 are compact, connected orientable manifolds of the same dimension. Then for al...
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...
AbstractIn this paper and its sequel we give results and methods for evaluating the Nielsen type num...
AbstractIn this paper, we introduce a Nielsen type number N∗(f,P) for any selfmap f of a partially o...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
AbstractIn this paper, we introduce a Nielsen type number NF(ƒ, p) for a fibre preserving map ƒ of a...
AbstractIt is known that the relative Nielsen number N(f; X, A), the Nielsen number of the complemen...
AbstractFor f:X→X, with X a compact manifold, Nielsen periodic point theory involves the calculation...
AbstractIn the first paper we showed for all maps f on nilmanifolds, and for weakly Jiang maps on so...
AbstractIn this note, we generalize the various existing local and relative Nielsen type numbers to ...
AbstractD. Anosov shows that N(f)=|L(f)| for all continuous selfmaps f on a nilmanifold. For a given...
AbstractLet f:(X,A)→(X,A) be a self map of a pair of compact polyhedra. We define two new Nielsen ty...
AbstractTwo homotopy invariant Nielsen type numbers exist for periodic points of a self-map ƒ: X → X...
AbstractSuppose M1,M2 are compact, connected orientable manifolds of the same dimension. Then for al...
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