Prym enumerative geometry and a Hurwitz divisor in R2i
Abstract
For i≥2, we compute the first coefficients of the class [D(μ;3)] in the rational Picard group of the moduli of Prym curves R2i, where D(μ;3) is the divisor parametrizing pairs [C,η] for which there exists a degree 2i map π C→ P1 having ramification profile (2,…,2) above two points q1, q2, a triple ramification somewhere else and satisfying OC(π*(q1)-π*(q2)2) η. Furthermore, we provide several new Prym enumerative results related to this situation.
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