Extending functions from Nikolskii-Besov spaces of mixed smoothness beyond domains of certain kind

TL;DR

This paper develops extension operators for Nikolskii and Besov spaces of mixed smoothness defined via $L_p$-averaged moduli, broadening the class of domains and spaces where such extensions are possible.

Contribution

It introduces new continuous linear extension operators for these function spaces on certain domains, expanding the scope of known extension theorems.

Findings

Constructed continuous extension operators for Nikolskii and Besov spaces.

Broadened the class of spaces where extension theorems apply.

Established continuity of partial differentiation operators in these spaces.

Abstract

The article examines Nikolskii and Besov spaces with norms defined using $L_p$-averaged mixed moduli of continuity of functions of appropriate orders, instead of mixed moduli of continuity of known orders for certain mixed derivative functions. The author builds continuous linear mappings of such spaces of functions defined in domains of certain type to ordinary Nikolskii and Besov spaces of mixed smoothness in $ \mathbb R^d, $ that are function extension operators, thus incurring coincidence of both kinds of spaces in the said domains. It also significantly broadens the class of Nikolskii and Besov spaces of mixed smoothness for which the theorems of those kind of extension have been derived. Under certain conditions, operators of partial differentiation from the aforementioned function spaces of mixed smoothness to Lebesgue spaces have been established to be continuous.