Distribution of slopes for L-invariants
Abstract
Fix a prime p≥5, an integer N≥1 relatively prime to p, and an irreducible residual global Galois representation r: GalQ→ GL2(Fp). In this paper, we utilize ghost series to study p-adic slopes of L-invariants for r-newforms. More precisely, under a locally reducible and strongly generic condition for r: (1) we determine the slopes of L-invariants associated to r-newforms of weight k and level 0(Np), with at most O(logpk) exceptions; (2) we establish the integrality of these slopes; (3) we prove an equidistribution property for these slopes as the weight k tends to infinity, which confirms the equidistribution conjecture for L-invariants proposed by Bergdall--Pollack recently.
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