Iwasawa theory for Rankin--Selberg products of p-non-ordinary eigenforms

Abstract

Let f and g be two modular forms which are non-ordinary at p. The theory of Beilinson-Flach elements gives rise to four rank-one non-integral Euler systems for the Rankin-Selberg convolution f g, one for each choice of p-stabilisations of f and g. We prove (modulo a hypothesis on non-vanishing of p-adic L-fuctions) that the p-parts of these four objects arise as the images under appropriate projection maps of a single class in the wedge square of Iwasawa cohomology, confirming a conjecture of Lei-Loeffler-Zerbes. Furthermore, we define an explicit logarithmic matrix using the theory of Wach modules, and show that this describes the growth of the Euler systems and p-adic L-functions associated to f g in the cyclotomic tower. This allows us to formulate "signed" Iwasawa main conjectures for f g in the spirit of Kobayashi's -Iwasawa theory for supersingular elliptic curves; and we prove one inclusion in these conjectures under our running hypotheses.