Weakly holomorphic modular forms in prime power levels of genus zero
Abstract
Let Mk(N) be the space of weight k, level N weakly holomorphic modular forms with poles only at the cusp at ∞. We explicitly construct a canonical basis for Mk(N) for N∈\8,9,16,25\, and show that many of the Fourier coefficients of the basis elements in M0(N) are divisible by high powers of the prime dividing the level N. Additionally, we show that these basis elements satisfy a Zagier duality property, and extend Griffin's results on congruences in level 1 to levels 2, 3, 4, 5, 7, 8, 9, 16, and 25.
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