Invariants of an augmentation of Γ0(n)

The signature of ⌫ eN , where e is square free, is completely determined if 0 e s 3 or N is odd or e g ⌿, where ⌿ is the set of all square free integers e g ‫ގ‬ such that Ž . i if e is odd, then e admits no divisors of the form 8 k q 3, Ž . ii if e is even, then e admits no divisors of the form 8

For a ring R, denote by Spec (Ä; R) the Ä-spectrum of the -invariant of strongly uniform right R-modules. Recent realization techniques of Goodearl and Wehrung show that Spec (ℵ1; R) is full for a suitable von Neumann regular algebra R, but the techniques do not extend to cardinals Ä ¿ ℵ1. By a dire

To every symmetric bilinear space X, of regular uncountable dimension , Ž . Ž . Ž . Ž Ž . . an invariant ⌫ X, g P P rF F where F F is the club filter can be assigned. We prove that in dimension / the spectrum of ⌫ cannot be determined in 2 ZFC. For this, on the one hand we show that under CH, ⌫ att

Given the orthonormal basis of Hecke eigenforms in S 2k ðGð1ÞÞ; Luo established an associated probability measure dm k on the modular surface Gð1Þ=H that tends weakly to the invariant measure on Gð1Þ=H: We generalize his result to the arithmetic surface G 0 ðNÞ=H where N51 is square-free.