Modified Jacobi forms of index zero (II)
Abstract
For a negative integer k let Jk be the space of modified Jacobi forms of weight k and index 0 on SL2(Z). For each positive integer m we consider certain subspace Jkm of Jk which satisfies Jk=m=1∞ Jkm. By observing a relation between coefficients of the Fourier development of a modified Jacobi form we show that Jkm is finite-dimensional.
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