This paper is the second in a series devoted to describing the integral Chow ring of the moduli stacks RHg of hyperelliptic Prym pairs. For fixed genus g, the stack RHg is the disjoint union of (g+1) /2 components RHgⁿ for n = 1, , (g+1) /2. In this paper, we give presentations and compute the integral Chow rings of the components RHg^ (g+1) /2 for odd g. As an application, we also obtain presentations and Chow rings for all irreducible components of the moduli stack of hyperelliptic Spin curves of odd genus. An intermediate result of independent interest is the computation of the integral Chow ring of the moduli stack of unordered pairs of divisors of the same even degree in P¹.
Cela et al. (Tue,) studied this question.