Diniz, D.Muñoz-Fernández, Gustavo A.Pellegrino, D.Seoane Sepúlveda, Juan Benigno2023-06-192023-06-192014-020002-9939https://hdl.handle.net/20.500.14352/33480The Bohnenblust-Hille inequality was obtained in 1931 and ( in the case of real scalars) asserts that for every positive integer m there is a constant Cm so that ((N)Sigma(i1 , . . . , im=1)vertical bar T(e(i1) (,...,) e(im))vertical bar(2m/m+1))(m+1/2) <= C-m parallel to T parallel to for all positive integers N and every m-linear mapping T : l(infinity)(N) x...x l(infinity)(N) -> R. Since then, several authors have obtained upper estimates for the values of C-m. However, the novelty presented in this short note is that we provide lower (and non-trivial) bounds for C-m.engjournal articlehttp://www.ams.org/journals/proc/2014-142-02/S0002-9939-2013-11791-0/S0002-9939-2013-11791-0.pdfhttp://www.ams.org/restricted access517Absolutely summing operatorsBohnenblust-Hille TheoremBohnenblust-Hille inequalityÁlgebra1201 Álgebra