Higher regulators and values of L-functions of curves

Let K be a global field of char p and let F q be the algebraic closure of F p in K. For an elliptic curve E/K with nonconstant j -invariant, the For any N > 1 invertible in K and finite subgroup T ⊂ E(K) of order N , we compute the mod N reduction of L(T , E/K) and determine an upper-bound for the

We consider the mean squares of L-functions associated to modular forms with respect to Hecke congruence subgroups, expressing the mean value as an inner product. This avoids the discussion of generalized additive divisor problems. As applications, we obtain asymptotic formulas for both weighted and

## Abstract This commentary argues for a functional perspective of the value–engagement relationship, proposing that evaluation determines engagement. I compare this causal direction—from value to engagement—to regulatory engagement theory, which proposes that engagement determines evaluation. I de

We prove an explicit formula for the central values of certain Rankin L-functions. These L-functions are the L-functions attached to Hilbert newforms over a totally real field F , twisted by unitary Hecke characters of a totally imaginary quadratic extension of F . This formula generalizes our forme