Weighted inequalities involving Hardy and Copson operators
[ X ]
Tarih
2022
Yazarlar
Dergi Başlığı
Dergi ISSN
Cilt Başlığı
Yayıncı
Academic Press Inc Elsevier Science
Erişim Hakkı
info:eu-repo/semantics/openAccess
Özet
We characterize a four-weight inequality involving the Hardy operator and the Copson operator. More precisely, given p(1), p(2), q(1), q(2) is an element of (0, infinity), we find necessary and sufficient conditions on non-negative measurable functions u(1), u(2), v(1), v(2) on (0, infinity) for which there exists a positive constant c such that the inequality (integral(infinity)(0)(integral(t)(0)f(s)(p2) v(2)(s)(p2)ds)(q2/p2) u(2)(t)(q2)dt)(1/q2) <= c(integral(infinity)(0)(integral(infinity)(t)f(s)(p1) v(1) (s)(p1) ds)(q1/p1) u(1)(t)(q1)dt)(1/q1) holds for every non-negative measurable function f on (0, infinity). The proof is based on discretizing and antidiscretizing techniques. The principal innovation consists in development of a new method which carefully avoids duality techniques and therefore enables us to obtain the characterization in previously unavailable situations, solving thereby a long-standing open problem. We then apply the characterization of the inequality to the establishing of criteria for embeddings between weighted Copson spaces Cop(p1,q1)(u(1), v(1)) and weighted Cesaro spaces Ces(p2,q2)(u(2), v(2)), and also between spaces S-q(w) equipped with the norm parallel to f parallel to(Sq(w)) = (integral(infinity)(0)[f**(t) - f*(t)](q)w(t) dt)(1/q) and classical Lorentz spaces of type Lambda. (C) 2022 Published by Elsevier Inc.
Açıklama
Anahtar Kelimeler
Hardy operator; Copson operator; Weighted inequality; Discretization
Kaynak
Journal of Functional Analysis
WoS Q Değeri
Q1
Scopus Q Değeri
Q1
Cilt
283
Sayı
12
