On the proportions of soluble forms in some families of locally soluble binary quartic forms

Abstract

An integral binary quartic form is said to be locally soluble (resp. soluble) if the corresponding genus one curve has a rational point over Qv for every place v of Q (resp. over Q). We consider the proportion of soluble integral binary quartic forms in locally soluble forms. Bhargava showed the proportion is positive when one considers all binary quartics, and Bhargava--Ho proved the proportion is zero for a subfamily. In this paper, we estimate the proportions for some other subfamilies. It relies on results for elliptic curves y2=x3-n2x by Heath-Brown, Xiong--Zaharescu and Smith.