Dimension growth for affine varieties

Abstract

We prove uniform upper bounds on the number of integral points of bounded height on affine varieties. If X is an irreducible affine variety of degree d≥ 4 in An which is not the preimage of a curve under a linear map An An- X+1, then we prove that X has at most Od,n,(B X - 1 + ) integral points up to height B. This is a strong analogue of dimension growth for projective varieties, and improves upon a theorem due to Pila, and a theorem due to Browning-Heath-Brown-Salberger. Our techniques follow the p-adic determinant method, in the spirit of Heath-Brown, but with improvements due to Salberger, Walsh, and Castryck-Cluckers-Dittmann-Nguyen. The main difficulty is to count integral points on lines on an affine surface in A3, for which we develop point-counting results for curves in P1× P1. We also formulate and prove analogous results over global fields, following work by Paredes-Sasyk.

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