Factorisation of two-variable p-adic L-functions
Abstract
Let f be a modular form which is non-ordinary at p. Kim and Loeffler have recently constructed two-variable p-adic L-functions associated to f. In the case where ap=0, they showed that, as in the one-variable case, Pollack's plus and minus splitting applies to these new objects. In this short note, we show that such a splitting can be generalised to the case where ap0 using Sprung's logarithmic matrix.
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