Modular forms for \(GL(r, Fq[T])\): Hecke operators and growth of expansion coefficients

Abstract

We determine the action of the Hecke operators \(Tp,i\) on the coefficient forms \(g1, …, gr-1, gr = \), and \(h\), which together generate the ring of modular forms for \(GL(r, Fq[T])\). All these are eigenforms with powers of \(π\) as eigenvalues, where \(π\) is the monic generator of the prime ideal \(p\) of \(Fq[T]\). We further describe the growth of the \(t\)-expansion coefficients of the discriminant function \(\). It is such that the product expansion of \(\) as well as the \(t\)-expansion of each modular form converges on the natural fundamental domain for \(GL(r, Fq[T])\).

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