Oleg Reinov
Published 2022-03-30Version 1
A result of G. Pisier says that a convolution operator $\star f : M(G) \to C(G),$ where $G$ is a compact Abelian group, can be factored through a Hilbert space if and only if $f$ has the absolutely summable set of Fourier coefficients. P. Saab (2010) generalized this result in some directions in the vector-valued cases. We give some further generalizations of the results of G. Pisier and P. Saab, considering, in particular, the factorizations of the operators through the operators of Schatten classes in Hilbert spaces. Also, some related theorem on the factorization of operators through the operators of the Lorentz-Schatten classes are obtained.
Fourier coefficients of functions in power-weighted $L_2$-spaces and conditionality constants of bases in Banach spaces
Convex-transitive characterizations of Hilbert spaces
$\ell_p$ (p>2) does not coarsely embed into a Hilbert space
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