Low-lying zeros of Hilbert modular L-functions weighted by powers of central L-values
Abstract
Let F(k,q) be the set of primitive Hilbert modular forms of weight k and prime level q, with trivial central character. We study the one-level density of low-lying zeros of L(s,π) weighted by powers of central L-values L(1/2,π)r, where π runs through F(k,q). For r=1,2,3, we show that the resulting distributions Wr match with predictions from Random Matrix Theory. For general r ≥ 1, we also formulate a conjectural formula for Wr based on the ``recipe'' method.
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