Modular forms and almost linear dependence of graded dimensions
Abstract
For every positive integral level k we study arithmetic properties of certain holomorphic modular forms associated to modular invariant spaces spanned by graded dimensions of Lsl2(k 0)-modules. We found a necessary and sufficient condition for their vanishing and showed that these modular forms resemble classical Eisenstein series E2k+2(τ). Furthermore, we derived similar results for M(p,p') Virasoro minimal models, thus generalizing some results of Mortenson, Ono and the author.
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