L-invariants, p-adic heights and factorization of p-adic L-functions

Abstract

We continue with our study of the non-critical exceptional zeros of Katz' p-adic L-functions attached to a CM field K, following two threads. In the first thread, we redefine our (group-ring-valued) L-invariant associated to each Zp-extension K of K in terms of p-adic height pairings and interpolate them as K varies to a universal (multivariate) group-ring-valued L-invariant. In the second thread, we use our results to study the exceptional zeros of the non-genuine Rankin--Selberg p-adic L-functions attached to the self-products of nearly ordinary CM families, via the factorization statements we establish. The factorization theorems are extensions of the results due to Greenberg and Palvannan.