arXiv:2403.19855 Abstract | arXiv Analytics

arXiv:2403.19855 [math.FA]Abstract References Reviews Resources

Spaceability of sets of non-injective maps

Published 2024-03-28Version 1

Generalizing a recent result on lineability of sets of non-injective linear operators, we prove, for quite general linear spaces $A$ of maps from an arbitraty set to a sequence space, that, for every $0 \neq f \in A$, the subset of $A$ of non-injective maps contains an infinite dimensional subspace of $A$ containing $f$. We provide aplications of the main result to spaces of linear operators between quasi-Banach spaces, to spaces of linear operators belonging to an operator ideal, and, in the nonlinear setting, to linear spaces of homogeneous polynomials and to linear spaces of vector-valued Lispshitz functions on metric spaces.

Comments: 12 pages

Categories: math.FA

Subjects: 15A03, 46B87, 47B10

Keywords: spaceability, general linear spaces, infinite dimensional subspace, vector-valued lispshitz functions, non-injective linear operators

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