Résume |
In this talk, we try to outline an approach to the study of anticyclotomic Iwasawa theory of modular forms when the fixed prime p is inert in the relevant quadratic imaginary field. Following ideas of Castella-Do for the "p split" case, one can envisage a construction of an anticyclotomic Euler system arising from a suitable manipulation of diagonal cycles. We will report on this work in progress, trying to underline the main difficulties arising in the "p inert" setting. |