Isometries of combinatorial Banach spaces

Published 16 Jul 2019 in math.FA | (1907.06815v2)

Abstract: We prove that every isometry between two combinatorial spaces is determined by a permutation of the canonical unit basis combined with a change of signs. As a consequence, we show that in the case of Schreier spaces, all the isometries are given by a change of signs of the elements of the basis. Our results hold for both the real and the complex cases.

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