On the basic sequence structure of variable exponent Lebesgue spaces

Jos\'e L. Ansorena; Glenier Bello

arXiv:2512.19538·math.FA·December 23, 2025

On the basic sequence structure of variable exponent Lebesgue spaces

Jos\'e L. Ansorena, Glenier Bello

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Abstract

We study the subsymmetric basic sequence structure of variable exponent Lebesgue spaces $L_{P}$ built from index functions $P : Ω \to (0, \infty]$ on $σ$ -finite measure spaces $(Ω, Σ, μ)$ . Specifically, we prove that if $P$ is bounded away from infinity, then any complemented subsymmetric basic sequence of $L_{P}$ is equivalent to the canonical basis of $ℓ_{r}$ for some $r \geq 1$ in the essential range of $P$ .

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TopicsAdvanced Banach Space Theory · Approximation Theory and Sequence Spaces · Advanced Harmonic Analysis Research