On Fp-roots of the Hilbert class polynomial modulo p

Abstract

The Hilbert class polynomial HO(x)∈ Z[x] attached to an order O in an imaginary quadratic field K is the monic polynomial whose roots are precisely the distinct j-invariants of elliptic curves over C with complex multiplication by O. Let p be a prime inert in K and strictly greater than |disc(O)|. We show that the number of Fp-roots of HO(x)\!\! p is either zero or |Pic(O)[2]| by exhibiting a free and transitive action of Pic(O)[2] on the set of Fp-roots of HO(x)\!\! p whenever it is nonempty. We also provide a concrete criterion for the nonemptiness of the set of Fp-roots. A similar result was first obtained by Xiao et al.~[Int. J. Number Theory, DOI: 10.1142/S1793042122500555] and generalized much further by Li et al.~[arXiv:2108.00168] (that covers the current result) with a different approach.