Fixed points of orientation-preserving full transformation
Abstract
Let OPn be the monoid of all orientation-preserving full transformations on Xn=\1,…, n\ with the natural order. For α ∈ OPn, let F(α)=\y∈ Xn: yα=y\ and F(n,m)=|\α:|F(α)|=m\|. Umar posed the question about the number F(n,m) of elements of OPn with m fixed points. In this paper, we show that the number F(n,m) of OPn is 2nn-m for 2≤slant m≤slant n and get the expectation and probability distribution of the cardinality of fixed-point set F(α) for α∈OPn.
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