A description of interpolation spaces for quasi-Banach couples by real   $K$-method

Sergey V. Astashkin; Per G. Nilsson

arXiv:2112.13248·math.FA·December 2, 2022

A description of interpolation spaces for quasi-Banach couples by real $K$-method

Sergey V. Astashkin, Per G. Nilsson

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Abstract

The main aim of this paper is to develop a general approach, which allows to extend the basics of Brudnyi-Kruglyak interpolation theory to the realm of quasi-Banach lattices. We prove that all $K$ -monotone quasi-Banach lattices with respect to a $L$ -convex quasi-Banach lattice couple have in fact a stronger property of the so-called $K (p, q)$ -monotonicity for some $0 < q \leq p \leq 1$ , which allows us to get their description by the real $K$ -method. Moreover, we obtain a refined version of the $K$ -divisibility property for Banach lattice couples and then prove an appropriate version of this property for $L$ -convex quasi-Banach lattice couples. The results obtained are applied to refine interpolation properties of couples of sequence $l^{p}$ - and function $L^{p}$ -spaces, considered for the full range $0 < p < \infty$ .

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TopicsAdvanced Numerical Analysis Techniques · Differential Equations and Boundary Problems · Numerical methods in inverse problems