On the quantitative variation of congruence ideals and integral periods of modular forms

Abstract

We prove the conjecture of Pollack and Weston on the quantitative analysis of the level lowering congruence \`a la Ribet for modular forms of higher weight. It was formulated and studied in the context of the integral Jacquet-Langlands correspondence and anticyclotomic Iwasawa theory for modular forms of weight two and square-free level for the first time. We use a completely different method based on the R=T theorem established by Diamond-Flach-Guo and Dimitrov and an explicit comparison of adjoint L-values. We briefly discuss arithmetic applications of our main result at the end.