AbstractIn this paper we define model solvmanifold pairs and their diagonal type selfmaps in the tradition of Heath and Keppelmann. We derive an explicit formula for computing the relative Nielsen number N(F;X,A) on these spaces and selfmaps F:(X,A)→(X,A). We find that model solvmanifold pairs often exhibit interesting Schirmer theory, meaning N(F;X,A)>max{N(F),N(F|A)}
AbstractIn this paper we present two (not independent) applications of the surplus Nielsen number of...
AbstractIt is known that the relative Nielsen number N(f; X, A), the Nielsen number of the complemen...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
AbstractIn this paper we define model solvmanifold pairs and their diagonal type selfmaps in the tra...
In this paper we construct a class of solvmanifolds and certain (diagonal type) self maps on them. T...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
AbstractWe introduce a relative fixed point index indAf of a self-map of a polyhedral pair f : (X, A...
AbstractLet f:(X,A)→(X,A) be a self map of a pair of compact polyhedra. We define two new Nielsen ty...
Using averaging formulas, we compute the Lefschetz, Nielsen and Reidemeister numbers of maps on infr...
AbstractIn this paper, we introduce a Nielsen type number N∗(f,P) for any selfmap f of a partially o...
Abstract. In classical fixed point and coincidence theory the notion of Nielsen numbers has proved t...
AbstractLet ƒ:(X,A1,A2) → (X,A1,A2) be a selfmap of a triad which consist of a compact connected pol...
AbstractLet ƒ: (X, A)→(X, A) be a selfmap of a pair of compact polyhedra. A surplus Nielsen number S...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
This third paper of the series gives the necessarily lengthy illustrations of the main results of th...
AbstractIn this paper we present two (not independent) applications of the surplus Nielsen number of...
AbstractIt is known that the relative Nielsen number N(f; X, A), the Nielsen number of the complemen...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
AbstractIn this paper we define model solvmanifold pairs and their diagonal type selfmaps in the tra...
In this paper we construct a class of solvmanifolds and certain (diagonal type) self maps on them. T...
AbstractLet f: (X, A)→(X, A) be an admissible selfmap of a pair of metrizable ANR's. A Nielsen numbe...
AbstractWe introduce a relative fixed point index indAf of a self-map of a polyhedral pair f : (X, A...
AbstractLet f:(X,A)→(X,A) be a self map of a pair of compact polyhedra. We define two new Nielsen ty...
Using averaging formulas, we compute the Lefschetz, Nielsen and Reidemeister numbers of maps on infr...
AbstractIn this paper, we introduce a Nielsen type number N∗(f,P) for any selfmap f of a partially o...
Abstract. In classical fixed point and coincidence theory the notion of Nielsen numbers has proved t...
AbstractLet ƒ:(X,A1,A2) → (X,A1,A2) be a selfmap of a triad which consist of a compact connected pol...
AbstractLet ƒ: (X, A)→(X, A) be a selfmap of a pair of compact polyhedra. A surplus Nielsen number S...
AbstractThe Reidemeister number R(f) is an upper bound for the Nielsen number N(f) of a selfmap f. F...
This third paper of the series gives the necessarily lengthy illustrations of the main results of th...
AbstractIn this paper we present two (not independent) applications of the surplus Nielsen number of...
AbstractIt is known that the relative Nielsen number N(f; X, A), the Nielsen number of the complemen...
AbstractA theorem of D. Anosov states that, for any selfmap f: M → M of a compact nilmanifold M, N(f...
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