Spaceability of sets of nowhere Lq functions

Abstract

We say that a function f:[0,1]→ is nowhere Lq if, for each nonvoid open subset U of [0,1], the restriction f|U is not in Lq(U). For a fixed 1 ≤ p <∞, we will show that the set Sp f ∈ Lp[0,1]: f is nowhere Lq, for each p<q ≤ ∞, united with 0, contains an isometric and complemented copy of p. In particular, this improves a result from G. Botelho, V. F\'avaro, D. Pellegrino, and J. B. Seoane-Sep\'ulveda, Lp[0,1] q>p Lq[0,1] is spaceable for every p>0, preprint, 2011., since Sp turns out to be spaceable. In addition, our result is a generalization of one of the main results from S. Gab, P. L. Kaufmann, and L. Pellegrini, Spaceability and algebrability of sets of nowhere integrable functions, preprint, 2011.