ON DENSENESS OF C-0(infinity)(Omega) AND COMPACTNESS IN Lp(x)(Omega) FOR 0 < p(x) < 1

The main goal of this paper is to prove the denseness of C-0(infinity)(Omega) in L-p(x) (Omega)for 0 < p(x) < 1. We construct a family of potential type identity approximations and prove a modular inequality in L-p(x) (Omega)for 0 < p(x) < 1. As an application we prove an analogue of the Kolmogorov Riesz type compactness theorem in L-p(x)(Omega) for 0 < p(x) < 1.

Authors

Bandaliev R.A. ^1, ² , Hasanov S.G.^1, ³

Journal

Moscow Mathematical Journal

Publisher

Independent University of Moscow

Number of issue

Language

English

Pages

1-13

Status

Published

Volume

Year

2018

Organizations

¹ ANAS, Inst Math & Mech, AZ-1141 Baku, Azerbaijan
² RUDN Univ, SM Nikolskii Inst Math, Moscow 117198, Russia
³ Gandja State Univ, Gandja, Azerbaijan

Keywords

L-p(x) spaces; denseness; potential type identity approximations; modular inequality; compactness

Date of creation

19.10.2018

Date of change

19.10.2018

Short link

https://repository.rudn.ru/en/records/article/record/9155/

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Other records

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REVIEW OF I. A. BUBNOVA, V. I. ZYKOVA, V. V. KRASNYKH, N. V. UFIMTSEVA (2017). (NEO)PSYCHOLINGUISTICS AND (PSYCHO)LINGUOCULTUROLOGY: NEW SCIENCES ABOUT HOMO LOQUENS, MOSCOW: GNOSIS, 390 PP.