Bounds for orders of zeros of a class of Eisenstein series and their applications on dual pairs of eta quotients
Abstract
Let k be an even positive integer, p be a prime and m be a nonnegative integer. We find an upper bound for orders of zeros (at cusps) of a linear combination of classical Eisenstein series of weight k and level pm. As an immediate consequence we find the set of all eta quotients that are linear combinations of these Eisenstein series and hence the set of all eta quotients of level pm whose derivatives are also eta quotients.
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