Description |
Abstract: For a Hecke eigenform $f$, we state an adjoint L-value formula
relative to each quaternion algebra $D$ over ${\mathbb Q}$ with
discriminant $\partial$ and reduced norm $N$. A key to prove the formula
is the theta correspondence for the quadratic ${\mathbb Q}$-space $(D,N)$.
Under the $R={\mathbb T}$-theorem, $p$-part of the Bloch-Kato conjecture
is known; so, the formula is an adjoint Selmer class number formula. We
also describe how to relate the formula to a consequence of the Tate
conjecture for quaternionic Shimura varieties.
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