Arithmetic intersections on non-split Cartan modular curves

Abstract

Let p be a prime number, and let 1,2 < 0 be two coprime fundamental discriminants. When p splits in Q(1) and Q(2) the height pairings of the corresponding CM divisors on Xspl+(p) were determined by Gross--Kohnen--Zagier [GKZ87]. When p is inert, we determine the arithmetic intersection numbers of the corresponding divisors on Xns+(p) at all finite primes. The key point of our analysis is at the prime of bad reduction p: to determine the intersection numbers at p, we provide a moduli interpretation for the smooth locus in the regular model of Xns+(p) over Spec(Z) constructed by Edixhoven--Parent [EP24].