Yazar "Mustafayev, Rza" için Fen Edebiyat Fakültesi listeleme
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Dual Spaces Of Local Morrey-Type Spaces
Gogatishvili, Amiran; Mustafayev, Rza (Springer Heidelberg, 2011)In this paper we show that associated spaces and dual spaces of the local Morrey-type spaces are so called complementary local Morrey-type spaces. Our method is based on an application of multidimensional reverse Hardy ... -
Embeddings Between Weighted Copson And Cesaro Function Spaces
Gogatishvili, Amiran; Mustafayev, Rza; Unver, Tugce (Springer Heidelberg, 2017)In this paper, characterizations of the embeddings between weighted Copson function spaces Cop(p1,q1)(u(1),v(1)) and weighted Cesaro function spaces Ces(p2,q2) (u(2) , v(2)) are given. In particular, two-sided estimates ... -
A note on maximal commutators and commutators of maximal functions
Agcayazi, Mujdat; Gogatishvili, Amiran; Koca, Kerim; Mustafayev, Rza (Math Soc Japan, 2015)In this paper maximal commutators and commutators of maximal functions with functions of bounded mean oscillation are investigated. New pointwise estimates for these operators are proved. -
Reverse Hardy-type inequalities for supremal operators with measures
Mustafayev, Rza; Unver, Tugce (Element, 2015)In this paper we characterize the validity of the inequalities parallel to g parallel to(p,(a, b),lambda) <= c parallel to u(x)parallel to g parallel to(infinity,(x,b),mu) parallel to(q,(a,b),nu) and parallel to g parallel ... -
Some new iterated Hardy-type inequalities: the case θ=1
Gogatishvili, Amiran; Mustafayev, Rza; Persson, Lars-Erik (Springer International Publishing Ag, 2013)In this paper we characterize the validity of the Hardy-type inequality parallel to parallel to integral(infinity)(s)h(z)dz parallel to(p,u,(0,t))parallel to(q,w,(0,infinity)) <= c parallel to h parallel to(1,v,(0,infinity)), ... -
Weak-type Estimates in Morrey Spaces for Maximal Commutator and Commutator of Maximal Function
Gogatishvili, Amiran; Mustafayev, Rza; Agcayazi, Mujdat (Tokyo Journal Mathematics Editorial Office Acad Center, 2018)In this paper it is shown that the Hardy-Littlewood maximal operator M is not bounded on Zygmund-Money space M-L(log L),M-lambda,M- O < lambda < n, but M is still bounded on M-L(logL),M-lambda for radially decreasing ...