Journal of Integer Sequences, Vol. 25 (2022), Article 22.9.7

How Does the Gerrymander Sequence Continue?

Manuel Kauers
Institute for Algebra
Johannes Kepler University
Altenberger Straße 69
4040 Linz

Christoph Koutschan
Johann Radon Institute for Computational and Applied Mathematics
Austrian Academy of Sciences
Altenberger Straße 69
4040 Linz

George Spahn
Department of Mathematics
Rutgers University (New Brunswick)
110 Frelinghuysen Road
Piscataway, NJ 08854-8019


We compute a few additional terms of the gerrymander sequence (OEIS sequence A348456) and provide guessed equations for the generating functions of some sequences in its context.

Full version:  pdf,    dvi,    ps,    latex,     Mathematica notebook

(Concerned with sequences A167242 A167247 A348456.)

Received September 5 2022; revised versions received September 6 2022; November 10 2022; November 28 2022. Published in Journal of Integer Sequences, November 28 2022.

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