On interlacing of zeros of certain family of modular forms

Abstract

Let k=12 m(k)+s 12 for s∈ \0,4,6,8,10,14\, be an even integer and f be a normalised modular form of weight k with real Fourier coefficients, written as f=Ek+Σj=1m(k)ajEk-12jj. Under suitable conditions on aj (rectifying an earlier result of Getz), we show that all the zeros of f, in the standard fundamental domain for the action of SL(2, Z) on the upper half plane, lies on the arc A:= \ ei θ : π2 θ 2π3 \. Further, extending a result of Nozaki, we show that for certain family \fk\k of normalised modular forms, the zeros of fk and fk+12 interlace on A:= \ ei θ : π2 < θ < 2π3 \.