On Banach frameness of degenerate weighted exponential system

This work deals with the frameness of weighted exponential system E ( ω , Z ) = { ω ( t ) e i n t } n ∈ Z in the space L p ( − π , π ) , p > 1 , with the weight function ω ( t ) of general form. Basis properties of E ( ω , Z ) in L p ( − π , π ) , p > 1 , are studied, in other words, the crite...

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Vydáno v:	Fixed point theory and algorithms for sciences and engineering Ročník 2025; číslo 1; s. 26 - 15
Hlavní autoři:	Ismailov, Migdad I., Simsir Acar, Kader
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Cham Springer International Publishing 23.09.2025 Springer Nature B.V SpringerOpen
Témata:	Analysis Applications of Mathematics Atomic properties Banach spaces Basicity Completeness Decomposition Differential Geometry Frameness Mathematical and Computational Biology Mathematics Mathematics and Statistics Minimality Muckenhoupt condition Topology Weighted exponential system Weighting functions 46B15 Completeness 46E30 Minimality Muckenhoupt condition Basicity 42C15 Weighted exponential system Frameness
ISSN:	2730-5422, 2730-5422
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Shrnutí:	This work deals with the frameness of weighted exponential system E ( ω , Z ) = { ω ( t ) e i n t } n ∈ Z in the space L p ( − π , π ) , p > 1 , with the weight function ω ( t ) of general form. Basis properties of E ( ω , Z ) in L p ( − π , π ) , p > 1 , are studied, in other words, the criteria of completeness, minimality and basicity of the system E ( ω , Z ) in the space L p ( − π , π ) , p > 1 , are given. Sufficient conditions for the completeness and minimality of E ( ω , Z ∖ F ) in L p ( − π , π ) , p > 1 , are found, where F is an arbitrary finite nonempty subset of the set of integers Z . A different method to prove that the system E ( ω , Z ∖ F ) does not form a Schauder basis for L p ( − π , π ) , p > 1 , is given. Theorem on a property of expansion system and criterion of Banach frameness for E ( ω , Z ) in L p ( − π , π ) , p > 1 , are proved. In particular, it is proved that the system E ( ω , Z ) with defect cannot form atomic decomposition for L p ( − π , π ) , p > 1 . The obtained results are the generalizations of those on the atomic decomposition of power weighted exponential system in L p ( − π , π ) , p > 1 , and the frameness of weighted exponential system in L 2 ( − π , π ) .
Bibliografie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	2730-5422 2730-5422
DOI:	10.1186/s13663-025-00805-5