Generalized Lefschetz numbers of pushout maps

Let D be a finite set of positive integers with maximum bigger than two and ti,,.(rii,,.) be the number of n-edged rooted maps on the orientable (nonorientable) surface of type 9 whose face degrees (or, dually, vertex degrees) all lie in D. Define A&)= 1 ~g,&", ll>O cl,(x)= 1 fis,"X". ## Il>O We

In this paper we provide an algebraic approach to the generalized Stirling numbers (GSN). By defining a group that contains the GSN, we obtain a unified interpretation for important combinatorial functions like the binomials, Stirling numbers, Gaussian polynomials. In particular we show that many GS

Let f : (X, A) → (X, A) be a self map of a pair of compact polyhedra. We define two new Nielsen type numbers m(f ; X, A) and m(f ; X -A), which are lower bounds for the number of fixed points on X and on Cl(X -A), the closure of X -A in X, respectively. These relative homotopy theoretic lower bounds