The Littlewood-Paley-Rubio de Francia inequality in Morrey-Campanato spaces

doi:10.1070/SM2014V205N07ABEH004407

Title: The Littlewood-Paley-Rubio de Francia inequality in Morrey-Campanato spaces

Journal Article · Thu Jul 31 00:00:00 EDT 2014 · Sbornik. Mathematics

DOI:https://doi.org/10.1070/SM2014V205N07ABEH004407· OSTI ID:22364926

Osipov, N. N., E-mail: nicknick@pdmi.ras.ru ^[1]

St. Petersburg Department of the Steklov Mathematical Institute, Russian Academy of Sciences (Russian Federation)

Rubio de Francia proved a one-sided Littlewood-Paley inequality for arbitrary intervals in L{sup p}, 2≤p<∞. In this article, his methods are developed and employed to prove an analogue of this type of inequality for exponents p 'beyond the index p=∞', that is, for spaces of Hölder functions and BMO. Bibliography: 14 titles. (paper)

Cite

Export

Save

OSTI ID:: 22364926

Journal Information:: Sbornik. Mathematics, Vol. 205, Issue 7; Other Information: Country of input: International Atomic Energy Agency (IAEA); ISSN 1064-5616

Country of Publication:: United States

Language:: English

Similar Records

Hardy-Littlewood theorem for trigonometric series with {alpha}-monotone coefficients

Journal Article · Thu Dec 31 00:00:00 EST 2009 · Sbornik. Mathematics · OSTI ID:22364926

Dyachenko, Mikhail I; Nursultanov, Erlan D

Net spaces and inequalities of Hardy-Littlewood type

Journal Article · Thu Apr 30 00:00:00 EDT 1998 · Sbornik. Mathematics · OSTI ID:22364926

Nursultanov, E D

Weighted inequalities for quasilinear integral operators on the semi-axis and applications to Lorentz spaces

Journal Article · Wed Aug 31 00:00:00 EDT 2016 · Sbornik. Mathematics · OSTI ID:22364926

Prokhorov, D V; Stepanov, V D

Related Subjects

97 MATHEMATICAL METHODS AND COMPUTING
CALCULATION METHODS
FUNCTIONS
INDEXES
MATHEMATICAL SOLUTIONS
SPACE

Title: The Littlewood-Paley-Rubio de Francia inequality in Morrey-Campanato spaces

Citation Formats

Similar Records

Related Subjects