The variation of zeros of the Miller basis

Abstract

We exhibit a connection between the variation of zeros in the Miller basis of modular forms qm+O(q+1) and a logarithmic version Sδ of the Szego curve, where δ=m/. When δ<0.6194 we show that all the zeros are on the unit arc for k 0, while if δ is asymptotically close to 1, we show that all the zeros lie on Sδ. In general, we posit that for all δ, the zeros are located on the union of the unit arc and the log Szego curve, obtaining a partial result, and find conjectural thresholds for m/ with all zeros on the unit arc, and no zeros on the arc. Finally, we enumerate all algebraic zeros of Miller forms up to -m≤ 25.