Diagonal quartic surfaces with a Brauer-Manin obstruction

Abstract

In this paper we investigate the quantity of diagonal quartic surfaces a0 X04 + a1 X14 + a2 X24 +a3 X34 = 0 which have a Brauer-Manin obstruction to the Hasse principle. We are able to find an asymptotic formula for the quantity of such surfaces ordered by height. The proof uses a generalization of a method of Heath-Brown on sums over linked variables. We also show that there exists no uniform formula for a generic generator in this family.