2022
DOI: 10.4153/s0008439522000054
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Stieltjes interlacing of the zeros of

Abstract: Let $j_n$ be the modular function obtained by applying the nth Hecke operator on the classical j-invariant. For $n>m\ge 2$ , we prove that between any two zeros of $j_m$ on the unit circle of the fundamental domain, there is a zero of $j_n$ .

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