Serre's problem on the density of isotropic fibres in conic bundles

Abstract

Let π:X P1Q be a non-singular conic bundle over Q having n non-split fibres and denote by N(π,B) the cardinality of the fibres of Weil height at most B that possess a rational point. Serre showed in 1990 that a direct application of the large sieve yields N(π,B) B2( B)-n/2 and raised the problem of proving that this is the true order of magnitude of N(π,B) under the necessary assumption that there exists at least one smooth fibre with a rational point. We solve this problem for all non-singular conic bundles of rank at most 3. Our method comprises the use of Hooley neutralisers, estimating divisor sums over values of binary forms, and an application of the Rosser-Iwaniec sieve.