Let $k$ be a positive integer divisible by 4, $p\>k$ a prime, $f$ an elliptic cuspidal eigenform (ordinary at $p$) of weight $k-1$, level 4 and non-trivial character. In this paper we provide evidence for the Bloch-Kato conjecture for the motives ${\text{ad}}^{0}M(-1)$ and ${\text{ad}}^{0}M\left(2\right)$, where $M$ is the motif attached to $f$. More precisely, we prove that under certain conditions the $p$-adic valuation of the algebraic part of the symmetric square $L$-function of $f$ evaluated at $k$ provides a lower bound for the $p$-adic valuation of the order of the Pontryagin...

Let $\ell \ne p$ be two different prime numbers, let $F$ be a local non archimedean field of residual characteristic $p$, and let ${\overline{𝐐}}_{\ell },{\overline{𝐙}}_{\ell },{\overline{𝐅}}_{\ell }$ be an algebraic closure of the field of $\ell$-adic numbers ${𝐐}_{\ell }$, the ring of integers of ${\overline{𝐐}}_{\ell }$, the residual field of ${\overline{𝐙}}_{\ell }$. We proved the existence and the unicity of a Langlands local correspondence over ${\overline{𝐅}}_{\ell }$ for all $n\ge 2$, compatible with the reduction modulo $\ell$ in [V5], without using $L$ and $ϵ$factors of pairs. We conjecture that the Langlands local correspondence over ${\overline{𝐐}}_{\ell }$ respects congruences modulo $\ell$ between...