On a Conjecture of Yui and Zagier II
Abstract
Yui and Zagier made some fascinating conjectures on the factorization on the norm of the difference of Weber class invariants f( a1) - f( a2) based on their calculation in YZ. Here ai belong two diferent ideal classes of discrimants Di in imagainary quadratic fields Q(Di). In LY, we proved these conjectures and their generalizations when (D1, D2) =1 using the so-called big CM value formula of Borcherds lifting. In this sequel, we prove the conjectures when Q(D1) =Q(D2) using the so-called small CM value formula. In addition, we give a precise factorization formula for the resultant of two different Weber class invariant polynomials for distinct orders.
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