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For every natural number n and a fixed prime p, we prove a new congruence for the orbifold Euler characteristic of a group. The p-adic limit of these congruences as n tends to infinity recovers the Brown-Quillen congruence. We apply these results to mapping class groups and using the Harer-Zagier formula we obtain a family of congruences for Bernoulli numbers. We show that these congruences in particular recover classical congruences for Bernoulli numbers due to Kummer, Voronoi, Carlitz, and Cohen.
Irakli Patchkoria (Tue,) studied this question.