Rademacher-type formula and higher order Turán inequalities for -regular overpartitions
Abstract
For ≥ 2, let A(n) count the number of overpartitions of n with no parts divisible by . In this article, we employ the circle method to derive a Rademacher-type formula for A(n), when is a squarefree odd integer. As an application, we derive higher order Tuŕan inequalities for the -regular overpartition function using a result of Griffin, Ono, Rolen, and Zagier.
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