Euler systems and the symmetric square of a Hida family
Abstract
Let p≥7 be a prime number. We build a non-trivial Euler system for the symmetric square of a p-adic Hida family of modular forms interpolating the Euler system constructed by Loeffler-Zerbes for the symmetric square of a p-ordinary newform. As a second contribution, we prove an algebraic functional equation for dual Selmer groups in this setting. Finally, building on recent work by Büyükboduk-Ganguly on functional equations of algebraic (Rankin-Selberg) p-adic L-functions, we prove a divisibility result towards the Iwasawa main conjecture for the symmetric square of a Hida family.
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