Global A1 degrees of covering maps between modular curves

Abstract

Given a projective smooth curve X over any field k, we discuss two notions of global A1 degree of a finite morphism of smooth curves f: X P1k satisfying certain conditions. One originates from computing the Euler number of the pullback of the line bundle OP1(1) as a generalization of Kass and Wickelgren's construction of Euler numbers. The other originates from the construction of global A1 degree of morphisms of projective curves by Kass, Levine, Solomon, and Wickelgren as a generalization of Morel's construction of A1-Brouwer degree of a morphism f: P1k P1k. We prove that under certain conditions on N, both notions of global A1 degrees of covering maps between modular curves X0(N) X(1), X1(N) X(1), and X(N) X(1) agree to be equal to sums of hyperbolic elements 1 + -1 in the Grothendieck-Witt ring GW(k) for any field k whose characteristic is coprime to N and the pullback of OP1(1) is relatively oriented.

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