Abstract
We make use of the notion of ‘doubled fixed point’ in the graph of an exceeding mapping, to give new combinatorial interpretations (a) for the Euler finite-difference tableau relating the sequence n! to the sequence of derangement numbers, and (b) for the Seidel tableau generating the Genocchi numbers of first and second kind. Further consequences are derived for the combinatorial theory of Genocchi numbers and allied polynomials.
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