On growth of systole along congruence coverings of Hilbert modular varieties
Abstract
We study how the systole of principal congruence coverings of a Hilbert modular variety grows when the degree of the covering goes to infinity. We prove that given a Hilbert modular variety M of real dimension 2n, the sequence of principal congruence coverings MI eventually satisfies sysπ1(MI)≥ 43n(vol(MI))-c, where c is a constant independent of MI.
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