Bounds in Cohen’s idempotent theorem

Bounds in Cohen’s idempotent theorem

Suppose that G is a finite Abelian group and write W(G) for the set of cosets of subgroups of G. We show that if f:G→Z satisfies the estimate ∥f∥A(G)≤M with respect to the Fourier algebra norm, then there is some z:W(G)→Z such that f=∑W∈W(G)z(W)1W and ∥z∥ℓ1(W(G))=exp(M4+o(1)).

Библиографические подробности
Главный автор:	Sanders, T
Формат:	Journal article
Опубликовано:	Springer Verlag 2020

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