When is the Bloch-Okounkov q-bracket modular?

Published 16 Oct 2018 in math.NT and math.AG | (1810.06987v2)

Abstract: We obtain a condition describing when the quasimodular forms given by the Bloch-Okounkov theorem as $q$-brackets of certain functions on partitions are actually modular. This condition involves the kernel of an operator {\Delta}. We describe an explicit basis for this kernel, which is very similar to the space of classical harmonic polynomials.

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Authors (1)

Jan-Willem M. van Ittersum

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