On the vanishing of some mock theta functions at odd roots of unity

Abstract

We consider the problem of whether or not certain mock theta functions vanish at the roots of unity with an odd order. We prove for any such function f(q) that there exists a constant C>0 such that for any odd integer n>C the function f(q) does vanish at the primitive n-th roots of unity. This leads us to conjecture that f(q) does not vanish at the primitive n-th roots of unity for any odd positive integer n.

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