Genus formulas for families of modular curves
Abstract
For each open subgroup H≤ GL2(Z), there is a modular curve XH, defined as a quotient of the full modular curve X(N), where N is the level of H. The genus formula of a modular curve is well known for X0(N), X1(N), X(N), Xsp(N), Xns(N), and XS4(p) for p prime. We explicitly work out the invariants of the genus formulas for Xsp+(N), Xns+(N), and Xarith,1(M,MN). In Table 1, we provide the invariants of the genus formulas for all of the modular curves listed.
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