Cyclic Sieving for Strong Dichotomy Enumeration
Abstract
Agustín-Aquino solved, in terms of the table of marks of (Z/2kZ), the problem of enumerating the classes of bicolour self-complementary and rigid patterns in Z/2kZ (also known as strong dichotomy classes). In particular, the rigid pattern-inventory polynomial appeared, for odd k, to yield the number of strong classes with negative sign when evaluated in -1, and it was conjectured that this is true for k a power of an odd prime. Here we prove the conjecture is true for k odd in general.
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