Tag: numbers

Because of the spaces of modular forms are finite dimensions, the decomposition into eigen forms of Hecke, and the formula of duplication for $ Gamma (s) $ there are a lot of identities mixing additive convolution $ oplus $ and multiplicative convolution $ otimes $, the basic example being $ 1 _ { mathbb {Z} ^ 2} ast 1 _ { mathbb {Z} ^ 2} = 1 otimes chi_4 $

It's in algebra $ M, $ oplus generated by modular forms for $ Gamma_0 (N) $ there will be a lot of identifying involving $ otimes $. How do Hecke's algebras and their representations come into play? Is there a more precise formulation, using higher things like automorphic representations?

Do you have heuristics making visible what property of prime numbers says this connection between additive convolution and multiplicative convolution? (if the heuristic implies HR, that's good too)

Assuming that prime numbers have been wildly distributed, can we still expect these identifiers to be identified? The evidence of multiplicative additive identifiers based on the functional equation and the product of Euler L functions, so I ask if it is plausible that the PNT and the HR still play a role. What about convolutions inverses, convolution with modular functions like $ 1 / d (z) $, additive convolution with $ mu (n) $ ?