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149 results on '"Vagif S. Guliyev"'

1. Fractional integral related to Schrödinger operator on vanishing generalized mixed Morrey spaces

Author

Vagif S. Guliyev, Ali Akbulut, and Suleyman Celik

Subjects
Schrödinger operator, Fractional integral, Vanishing generalized mixed Morrey space, Commutator, BMO, Analysis, QA299.6-433
Abstract

Abstract With b belonging to a new B M O θ ( ρ ) $BMO_{\theta}(\rho )$ space, L = − △ + V $L=-\triangle +V$ is a Schrödinger operator on R n ${\mathbb{R}^{n}}$ with nonnegative potential V belonging to the reverse Hölder class R H n / 2 $RH_{n/2}$ . The fractional integral operator associated with L is denoted by I β L ${\mathcal{I}}_{\beta}^{L}$ . We investigate the boundedness of I β L ${\mathcal{I}}_{\beta}^{L}$ and [ b , I β L ] $[b,{\mathcal{I}}_{\beta}^{L}]$ , which are its commutators with b θ ( ρ ) $b_{\theta}(\rho )$ on vanishing generalized mixed Morrey spaces V M p → , φ α , V $VM_{\vec{p},\varphi}^{\alpha ,V}$ related to Schrödinger operation and generalized mixed Morrey spaces M p → , φ α , V $M_{\vec{p},\varphi}^{\alpha ,V}$ . The boundedness of the operator I β L ${\mathcal{I}}_{\beta}^{L}$ is ensured by finding sufficient conditions on the pair ( φ 1 , φ 2 ) $(\varphi _{1},\varphi _{2})$ , which goes from M p → , φ 1 α , V $M_{\vec{p},\varphi _{1}}^{\alpha ,V}$ to M q → , φ 2 α , V $M_{\vec{q},\varphi _{2}}^{\alpha ,V}$ , and from V M p → , φ 1 α , V $VM_{\vec{p},\varphi _{1}}^{\alpha ,V}$ to V M q → , φ 2 α , V $VM_{\vec{q},\varphi _{2}}^{\alpha ,V}$ , ∑ i = 1 n 1 p i − ∑ i = 1 n 1 q i = β $\sum \limits _{i=1}^{n}\frac{1}{p_{i}}-\sum \limits _{i=1}^{n}\frac{1}{q_{i}}=\beta $ . When b belongs to B M O θ ( ρ ) $BMO_{\theta}(\rho )$ and ( φ 1 , φ 2 ) $(\varphi _{1},\varphi _{2})$ satisfies some conditions, we also show that the commutator operator [ b , I β L ] $[b,{\mathcal{I}}_{\beta}^{L}]$ is bounded from M p → , φ 1 α , V $M_{\vec{p},\varphi _{1}}^{\alpha ,V}$ to M q → , φ 2 α , V $M_{\vec{q},\varphi _{2}}^{\alpha ,V}$ and from V M p → , φ 1 α , V $VM_{\vec{p},\varphi _{1}}^{\alpha ,V}$ to V M q → , φ 2 α , V $VM_{\vec{q},\varphi _{2}}^{\alpha ,V}$ .

Published
2024
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2. Morrey-type estimates for commutator of fractional integral associated with Schrödinger operators on the Heisenberg group

Author

Vagif S. Guliyev, Ali Akbulut, and Faiq M. Namazov

Subjects
Schrödinger operator, Heisenberg group, Central generalized Morrey space, Campanato space, Fractional integral, Commutator, Mathematics, QA1-939
Abstract

Abstract Let L=−ΔHn+V $L=-\Delta_{\mathbb{H}_{n}}+V$ be a Schrödinger operator on the Heisenberg group Hn $\mathbb{H}_{n}$, where the nonnegative potential V belongs to the reverse Hölder class RHq1 $RH_{q_{1}}$ for some q1≥Q/2 $q_{1} \ge Q/2$, and Q is the homogeneous dimension of Hn $\mathbb{H} _{n}$. Let b belong to a new Campanato space Λνθ(ρ) $\Lambda_{\nu }^{ \theta }(\rho )$, and let IβL $\mathcal{I}_{\beta }^{L}$ be the fractional integral operator associated with L. In this paper, we study the boundedness of the commutators [b,IβL] $[b,\mathcal{I}_{\beta }^{L}]$ with b∈Λνθ(ρ) $b \in \Lambda_{\nu }^{\theta }(\rho )$ on central generalized Morrey spaces LMp,φα,V(Hn) $LM_{p,\varphi }^{\alpha ,V}(\mathbb{H}_{n})$, generalized Morrey spaces Mp,φα,V(Hn) $M_{p,\varphi }^{\alpha ,V}(\mathbb{H}_{n})$, and vanishing generalized Morrey spaces VMp,φα,V(Hn) $VM_{p,\varphi }^{\alpha ,V}(\mathbb{H}_{n})$ associated with Schrödinger operator, respectively. When b belongs to Λνθ(ρ) $\Lambda_{\nu }^{\theta }(\rho )$ with θ>0 $\theta >0$, 0

Published
2018
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3. Global regularity in Orlicz-Morrey spaces of solutions to nondivergence elliptic equations with VMO coefficients

Author

Vagif S. Guliyev, Aysel A. Ahmadli, Mehriban N. Omarova, and Lubomira G. Softova

Subjects
Generalized Orlicz-Morrey spaces, Calderon-Zygmund integrals, commutators, VMO, elliptic equations, Dirichlet problem, Mathematics, QA1-939
Abstract

We show continuity in generalized Orlicz-Morrey spaces $M_{\Phi,\varphi}(\mathbb{R}^n)$ of sublinear integral operators generated by Calderon-Zygmund operator and their commutators with BMO functions. The obtained estimates are used to study global regularity of the solution of the Dirichlet problem for linear uniformly elliptic operator $\mathcal{L}=\sum_{i,j=1}^n a^{ij}(x)D_{ij}$ with discontinuous coefficients. We show that $\mathcal{L} u\in M_{\Phi,\varphi}$ implies the second-order derivatives belong to $M_{\Phi,\varphi}$.

Published
2018

4. Commutator of fractional integral with Lipschitz functions associated with Schrödinger operator on local generalized Morrey spaces

Author

Vagif S. Guliyev and Ali Akbulut

Subjects
Schrödinger operator, Fractional integral, Commutator, Lipschitz function, Local generalized Morrey space, Analysis, QA299.6-433
Abstract

Abstract Let L=−Δ+V $L=-\Delta+V$ be a Schrödinger operator on Rn $\mathbb{R}^{n}$, where n≥3 $n\ge3$ and the nonnegative potential V belongs to the reverse Hölder class RHq1 $RH_{q_{1}}$ for some q1>n/2 $q_{1} > n/2$. Let b belong to a new Campanato space Λνθ(ρ) $\Lambda_{\nu}^{\theta}(\rho)$ and IβL $\mathcal {I}_{\beta}^{L}$ be the fractional integral operator associated with L. In this paper, we study the boundedness of the commutators [b,IβL] $[b,\mathcal {I}_{\beta}^{L}]$ with b∈Λνθ(ρ) $b \in\Lambda_{\nu}^{\theta}(\rho)$ on local generalized Morrey spaces LMp,φα,V,{x0} $LM_{p,\varphi}^{\alpha,V,\{x_{0}\}}$, generalized Morrey spaces Mp,φα,V $M_{p,\varphi}^{\alpha,V}$ and vanishing generalized Morrey spaces VMp,φα,V $VM_{p,\varphi}^{\alpha,V}$ associated with Schrödinger operator, respectively. When b belongs to Λνθ(ρ) $\Lambda_{\nu}^{\theta}(\rho)$ with θ>0 $\theta >0$, 0

Published
2018
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7. On the Riesz Potential and Its Commutators on Generalized Orlicz-Morrey Spaces

Author

Vagif S. Guliyev and Fatih Deringoz

Subjects
Mathematics, QA1-939
Abstract

We consider generalized Orlicz-Morrey spaces MΦ,φ(ℝn) including their weak versions WMΦ,φ(ℝn). In these spaces we prove the boundedness of the Riesz potential from MΦ,φ1(ℝn) to MΨ,φ2(ℝn) and from MΦ,φ1(ℝn) to WMΨ,φ2(ℝn). As applications of those results, the boundedness of the commutators of the Riesz potential on generalized Orlicz-Morrey space is also obtained. In all the cases the conditions for the boundedness are given either in terms of Zygmund-type integral inequalities on (φ1,φ2), which do not assume any assumption on monotonicity of φ1(x,r), φ2(x,r) in r.

Published
2014
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9. Boundedness of a Class of Sublinear Operators and Their Commutators on Generalized Morrey Spaces

Author

Vagif S. Guliyev, Seymur S. Aliyev, and Turhan Karaman

Subjects
Mathematics, QA1-939
Abstract

The authors study the boundedness for a large class of sublinear operator T generated by Calderón-Zygmund operator on generalized Morrey spaces Mp,φ. As an application of this result, the boundedness of the commutator of sublinear operators Ta on generalized Morrey spaces is obtained. In the case a∈BMO(ℝn), 1

Published
2011
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10. Boundedness of the Maximal, Potential and Singular Operators in the Generalized Morrey Spaces

Author

Vagif S. Guliyev

Subjects
Mathematics, QA1-939
Abstract

We consider generalized Morrey spaces ℳp,ω(ℝn) with a general function ω(x,r) defining the Morrey-type norm. We find the conditions on the pair (ω1,ω2) which ensures the boundedness of the maximal operator and Calderón-Zygmund singular integral operators from one generalized Morrey space ℳp,ω1(ℝn) to another ℳp,ω2(ℝn), 1

Published
2009
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13. Commutators of fractional maximal operator in variable Lebesgue spaces over bounded quasi‐metric measure spaces

Author

Vagif S. Guliyev and Stefan G. Samko

Subjects
General Mathematics, General Engineering, Quasi-metric measure spaces, Fractional maximal function, Commutators, Variable Lebesgue spaces, BMO
Abstract

We study the fractional maximal commutators Mb,𝜂 and the commutators[b, M𝜂] of the fractional maximal operator with b ∈ BMO(X) in the variable Lebesgue spaces Lp(·)(X) over bounded quasi-metric measure spaces. We give necessary and sufficient conditions for the boundedness of the operators Mb,𝜂 and [b, M𝜂] on the spaces Lp(·)(X) when b ∈ BMO(X). Furthermore, we obtain some new characterizations for certain subspaces of BMO(X). info:eu-repo/semantics/publishedVersion

Published
2022
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15. Riesz potential and its commutators on generalized weighted Orlicz–Morrey spaces

Author

Vagif S. Guliyev, Fatih Deringoz, Fen Edebiyat Fakültesi, and Fatih Deringöz / 10.1007/s11117-017-0504-y

Subjects
Mathematics::Functional Analysis, Generalized weighted Orlicz–Morrey space, Commutator, General Mathematics, Mathematics::Analysis of PDEs, Mathematics::Classical Analysis and ODEs, Riesz potential, BMO
Abstract

In the present paper, we shall give a characterization for the Adams-type bound-edness of the Riesz potential and its commutators on the generalized weightedOrlicz–Morrey spaces. We also give a characterization for the BMO space via theboundedness of the commutator of the Riesz potential.

Published
2022
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17. Calderón-Zygmund operators with kernels of Dini’s type on generalized weighted variable exponent Morrey spaces

Author

Vagif S. Guliyev and Guliyev, Vagif S.

Subjects
Mathematics::Functional Analysis, Weight function, Multilinear map, Variable exponent, General Mathematics, Mathematics::Classical Analysis and ODEs, Operator theory, Type (model theory), Omega, Potential theory, Theoretical Computer Science, Combinatorics, Operator (computer programming), Commutator, Calderón-Zygmund Operator, Generalized Weighted Variable Exponent Morrey Spaces, Analysis, BMO, Mathematics
Abstract

Let T be a Calderon-Zygmund operator of type $$\omega $$ with $$\omega (t)$$ being nondecreasing and satisfying a kind of Dini’s type condition and let $$T_{\vec {b}}$$ be the multilinear commutators of T with $$BMO^m$$ functions. In this paper, we study the boundedness of the operators T and $$T_{\vec {b}}$$ on generalized weighted variable exponent Morrey spaces $$M^{p(\cdot ),\varphi }(w)$$ with the weight function w belonging to variable Muckenhoupt’s class $$A_{p(\cdot )}({{\mathbb {R}}^n})$$ . We find the sufficient conditions on the pair $$(\varphi _1,\varphi _2)$$ with $$\vec {b} \in BMO^m({{\mathbb {R}}^n})$$ which ensures the boundedness of the operators T and $$T_{\vec {b}}$$ from $$M^{p(\cdot ),\varphi _1}(w)$$ to $$M^{p(\cdot ),\varphi _2}(w)$$ .

Published
2021
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19. Characterization of fractional maximal operator and its commutators on Orlicz spaces in the Dunkl setting

Author

Yagub Y. Mammadov, Fatma Muslumova, and Vagif S. Guliyev

Subjects
Mathematics::Functional Analysis, Functional analysis, Applied Mathematics, Mathematics::Classical Analysis and ODEs, Commutator (electric), Characterization (mathematics), Operator theory, law.invention, Combinatorics, law, Bounded function, Maximal operator, Algebra over a field, Reflection group, Analysis, Mathematics
Abstract

On the $${\mathbb {R}}^{d}$$ the Dunkl operators $$\big \{D_{k,j}\big \}_{j=1}^{d}$$ are the differential-difference operators associated with the reflection group $${\mathbb {Z}}_2^d$$ on $${\mathbb {R}}^{d}$$ . In this paper, in the setting $${\mathbb {R}}^{d}$$ we find necessary and sufficient conditions for the boundedness of the fractional maximal operator $$M_{\alpha ,k}$$ on Orlicz spaces $$L_{\varPhi ,k}({\mathbb {R}}^{d})$$ . As an application of this result we show that $$b \in {\textit{BMO}}_{k}({\mathbb {R}}^{d})$$ if and only if the maximal commutator $$M_{b,k}$$ is bounded on Orlicz spaces $$L_{\varPhi ,k}({\mathbb {R}}^{d})$$ .

Published
2020
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20. Bn -maximal operator and Bn -singular integral operators on variable exponent Lebesgue spaces

Author

Esra Kaya, Vagif S. Guliyev, and Ismail Ekincioglu

Subjects
03 medical and health sciences, Pure mathematics, 0302 clinical medicine, Variable exponent, General Mathematics, 010102 general mathematics, Maximal operator, 030212 general & internal medicine, 0101 mathematics, Lp space, Singular integral operators, 01 natural sciences, Mathematics
Abstract

In this paper, we prove the boundedness of the Bn maximal operator and Bn singular integral operators associated with the Laplace-Bessel differential operator Δ Bn on variable exponent Lebesgue spaces.

Published
2020
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21. Maximal and Calderon-Zygmund operators on the local variable Morrey-Lorentz spaces and some applications

Author

Ayhan Serbetci, A. Kucukaslan, Vagif S. Guliyev, Canay Aykol, and Guliyev, Vagif S.

Subjects
Pure mathematics, Mathematics::Functional Analysis, Local Variable Morrey–Lorentz Space, Calderón–Zygmund Operators, Mathematics::Complex Variables, Applied Mathematics, Lorentz transformation, Mathematics::Classical Analysis and ODEs, Local variable, Hardy–Littlewood Maximal Function, Functional Analysis (math.FA), Mathematics - Functional Analysis, symbols.namesake, Primary 42B25, FOS: Mathematics, symbols, 42B25, 42B35, 47G10, Hardy–Littlewood maximal function, Secondary 47G10, Analysis, 42B35, Mathematics
Abstract

In this paper, we give the definition of local variable Morrey–Lorentz spaces (Formula presented.) which are a new class of functions. Also, we prove the boundedness of the Hardy–Littlewood maximal operator M and Calderón–Zygmund operators T on these spaces. Finally, we apply these results to the Bochner–Riesz operator (Formula presented.), identity approximation (Formula presented.) and the Marcinkiewicz operator (Formula presented.) on the spaces (Formula presented.). © 2021 Informa UK Limited, trading as Taylor & Francis Group.

Published
2021

22. Global regularity in Orlicz–Morrey spaces of solutions to parabolic equations with VMO coefficients

Author

Mehriban N. Omarova, Vagif S. Guliyev, Ismail Ekincioglu, and Aysel Ahmadli

Subjects
Mathematics::Functional Analysis, Partial differential equation, Sublinear function, Functional analysis, Oscillation, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Mathematics::Classical Analysis and ODEs, Mathematics::Analysis of PDEs, Operator theory, 01 natural sciences, Parabolic partial differential equation, 010101 applied mathematics, Operator (computer programming), 0101 mathematics, Algebra over a field, Analysis, Mathematics
Abstract

We show continuity in generalized parabolic Orlicz–Morrey spaces $$M^{\varPhi ,\varphi }$$ of sublinear integral operators generated by parabolic Calderon–Zygmund operator and their commutators with BMO functions. As a consequence, we obtain a global $$M^{\varPhi ,\varphi }$$ -regularity result for the Cauchy–Dirichlet problem for linear uniformly parabolic equations with vanishing mean oscillation coefficients.

Published
2020
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24. Embedding Theorems between Variable-Exponent Morrey Spaces

Author

Vagif S. Guliyev, R. A. Bandaliyev, and Guliyev, Vagif Sabir

Subjects
Mathematics::Functional Analysis, Pure mathematics, Embedding Theorems, Variable exponent, Mathematics::Complex Variables, Equivalent Norms, General Mathematics, 010102 general mathematics, Mathematics::Analysis of PDEs, Mathematics::Classical Analysis and ODEs, 02 engineering and technology, 01 natural sciences, Variable-Exponent Morrey Spaces, 020303 mechanical engineering & transports, 0203 mechanical engineering, Variable-Exponent Lebesgue Spaces, Embedding, 0101 mathematics, Mathematics
Abstract

In this paper, we study various embedding theorems on variable-exponent Morrey spaces. In particular, we found a criterion characterizing embedding between variable-exponent Morrey spaces. © 2019, Pleiades Publishing, Ltd., Ministry of Education and Science of the Russian Federation: 02, This work was supported in part by the First Azerbaijan-Russia Joint Grant Competition (agreement no. EIF-BGM-4-RFTF-1/2017-21 /01/1) and by the Ministry of Education and Science of the Russian Federation (agreement no. 02.a03.21.0008).

Published
2019
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25. Characterizations of Hardy spaces associated with Laplace–Bessel operators

Author

Cansu Keskin, Ismail Ekincioglu, Vagif S. Guliyev, Keskin, Cansu, Ekincioğlu, İsmail, and Guliyev, Vagif S.

Subjects
Mathematics::Classical Analysis and ODEs, Characterization (mathematics), 01 natural sciences, Combinatorics, symbols.namesake, Operator (computer programming), Hardy Space, Fourier–Bessel Transform, 0103 physical sciences, Atomic Decomposition, 0101 mathematics, High order, Mathematical Physics, Physics, Algebra and Number Theory, Laplace transform, 010102 general mathematics, Hardy space, Atomic decomposition, symbols, Generalized Shift Operator, Maximal function, Riesz–Bessel Transform, 010307 mathematical physics, Analysis, Bessel function
Abstract

In this paper, we obtain a characterization of H p Δν (Rn +) Hardy spaces by using atoms associated with the radial maximal function, the nontangential maximal function and the grand maximal function related to Δν Laplace–Bessel operator for ν > 0 and 1 < p < ∞. As an application, we further establish an atomic characterization of Hardy spaces H p Δν (Rn +) in terms of the high order Riesz–Bessel transform for 0 < p ≤ 1., Ministry of Education and Science of the Russian Federation: 02., The research of V.S. Guliyev was partially supported by the Grant of the 1 st \documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} \begin{document}$$1\hbox {st}$$\end{document} Azerbaijan–Russia Joint Grant Competition (Agreement Number No. EIF-BGM-4-RFTF-1/201721/01/1) and by the Ministry of Education and Science of the Russian Federation (Agreement Number No. 02.a03.21.0008).

Published
2019
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26. Commutators of the fractional maximal function in generalized Morrey spaces on Carnot groups

Author

Vagif S. Guliyev and Guliyev, Vagif Sabir

Subjects
Pure mathematics, Characterization (mathematics), Type (model theory), 01 natural sciences, law.invention, symbols.namesake, 43A80, law, Primary 42B25, Commutator, 0101 mathematics, Fractional Maximal Function, Generalized Morrey Space, Mathematics, 42B35, BMO, Numerical Analysis, Carnot Group, Applied Mathematics, Operator (physics), 010102 general mathematics, Carnot group, Commutator (electric), 010101 applied mathematics, Computational Mathematics, symbols, Maximal function, Carnot cycle, Analysis, 43A15
Abstract

In this paper, we obtain new results of the Spanne and Adams type boundedness characterization of the fractional maximal commutator operator (Formula presented.), (Formula presented.) on the Carnot group (Formula presented.) (i.e. nilpotent stratified Lie group) in generalized Morrey spaces (Formula presented.) respectively, where Q is the homogeneous dimension of (Formula presented.). © 2020 Informa UK Limited, trading as Taylor & Francis Group.

Published
2021

27. Characterization Of The Boundedness Of Fractional Maximal Operator And Its Commutators In Orlicz And Generalized Orlicz-Morrey Spaces On Spaces Of Homogeneous Type

Author

Kendal Dorak, Fatih Deringoz, Vagif S. Guliyev, and Guliyev, Vagif S.

Subjects
Physics, Mathematics::Functional Analysis, Pure mathematics, Algebra and Number Theory, Mathematics::Classical Analysis and ODEs, Commutator (electric), Characterization (mathematics), Type (model theory), law.invention, Orlicz Space, Homogeneous, law, Fractional Maximal Operator, Commutator, Generalized Orlicz–Morrey Space, Maximal operator, Spaces Of Homogeneous Type, Mathematical Physics, Analysis
Abstract

In this paper, we establish the necessary and sufficient conditions for the boundedness of fractional maximal operator $$M_{\alpha }$$ and the fractional maximal commutators $$M_{b,\alpha }$$ in Orlicz $$L^{\Phi }(X)$$ and generalized Orlicz–Morrey spaces $$\mathcal {M}^{\Phi ,\varphi }(X)$$ on spaces of homogeneous type $$X=(X,d,\mu )$$ in the sense of Coifman-Weiss.

Published
2021

28. Characterizations for the Fractional Integral Operator and its Commutators in Generalized Weighted Morrey Spaces on Carnot Groups

Author

Vagif S. Guliyev, Ismail Ekincioglu, Guliyev, Vagif S., and Ekincioğlu, İsmail

Subjects
symbols.namesake, Pure mathematics, Carnot Group, Operator (physics), Commutator, Fractional Integral Operator, symbols, Generalized Weighted Morrey Space, Carnot cycle, Analysis, Mathematics, BMO
Abstract

In this paper, we shall give a characterization for the strong and weak type Spanne type boundedness of the fractional integral operator Iα, 0 < α < Q on Carnot group (Formula presented) on generalized weighted Morrey spaces Mp,φ((Formula presented),w), respectively, where Q is the homogeneous dimension of (Formula presented). Also we give a characterization for the Spanne type boundedness of the commutator operator [b, Iα] on generalized weighted Morrey spaces. As applications of the properties of the fundamental solution of sub-Laplacian (Formula presented) on (Formula presented), we prove two Sobolev-Stein embedding theorems on generalized weighted Morrey spaces in the Carnot group setting. © 2021. All Rights Reserved.

Published
2021

29. Generalized Sobolev–Morrey estimates for hypoelliptic operators on homogeneous groups

Author

Vagif S. Guliyev and Guliyev, Vagif S.

Subjects
Sublinear function, Dimension (graph theory), Mathematics::Classical Analysis and ODEs, Singular Integral Operators, 01 natural sciences, Combinatorics, Matrix (mathematics), Operator (computer programming), Homogeneous Group, 0101 mathematics, Invariant (mathematics), Generalized Morrey Space, Mathematics, Mathematics::Functional Analysis, Generalized Sobolev–Morrey Estimates, Algebra and Number Theory, Degree (graph theory), Applied Mathematics, 010102 general mathematics, 010101 applied mathematics, Sobolev space, Computational Mathematics, Hypoelliptic operator, Fractional Integral Operator, Geometry and Topology, Hypoelliptic Operators With Drift, Analysis
Abstract

Let $${\mathbb {G}}=\big ({\mathbb {R}}^N,\circ ,\delta _{\lambda }\big )$$ be a homogeneous group, Q is the homogeneous dimension of $${{\mathbb {G}}}$$ , $$X_0, X_1, \ldots , X_m$$ be left invariant real vector fields on $${\mathbb {G}}$$ and satisfy Hormander’s rank condition on $${\mathbb {R}}^N$$ . Assume that $$X_1, \ldots , X_m$$ $$(m\le N-1)$$ are homogeneous of degree one and $$X_0$$ is homogeneous of degree two with respect to the family of dilations $$\big (\delta _{\lambda }\big )_{\lambda >0}$$ . Consider the following hypoelliptic operator with drift on $${\mathbb {G}}$$ $$\begin{aligned} {\mathcal {L}}=\sum \limits _{i,j=1}^m a_{ij} X_i X_j+a_0 X_0, \end{aligned}$$ where $$(a_{ij})$$ is a $$m \times m$$ constant matrix satisfying the elliptic condition in $${\mathbb {R}}^m$$ and $$a_0\ne 0$$ . In this paper, for this class of operators, we obtain the generalized Sobolev–Morrey estimates by establishing boundedness of a large class of sublinear operators $$T_{\alpha }$$ , $$\alpha \in [0,Q)$$ generated by Calderon–Zygmund operators ( $$\alpha =0$$ ) and generated by fractional integral operator ( $$\alpha >0$$ ) on generalized Morrey spaces and proving interpolation results on generalized Sobolev–Morrey spaces on $${\mathbb {G}}$$ . The sublinear operators under consideration contain integral operators of harmonic analysis such as Hardy–Littlewood and fractional maximal operators, Calderon–Zygmund operators, fractional integral operators on homogeneous groups, etc.

Published
2021

30. Nonlinear Elliptic Equations with Small BMO Coefficients in Nonsmooth Domains in Generalized Morrey Spaces

Author

Vagif S. Guliyev, Tahir Gadjiev, and Guliyev, Vagif S.

Subjects
Nonlinear system, Nonlinear Elliptic Equations, Reifenberg Flat Domain, Maximal Function, Mathematical analysis, Generalized Sobolev-Morrey Spaces, Analysis, Small BMO, Mathematics
Abstract

We obtain the generalized Sobolev-Morrey spaces W1p,ϕ(Ω) estimate for weak solutions of a boundary value problem for nonlinear elliptic equations with BMO coefficients in nonsmooth domains. We investigate regularity of the weak solutions in generalized Morrey spaces Mp,ϕ(Ω). The nonlinearity has sufficiently small BMO seminorm and the boundary of the domain is sufficiently flat. © Zagreb

Published
2021

31. Relatively Compact Sets in Variable Exponent Morrey Spaces on Metric Spaces

Author

Rovshan A. Bandaliyev, Przemysław Górka, Yoshihiro Sawano, Vagif S. Guliyev, and Guliyev, Vagif S.

Subjects
Pure mathematics, Compactness, General Mathematics, Morrey Spaces, Totally bounded space, Variable Exponent Lebesgue Spaces, Characterization (mathematics), Measure (mathematics), Metric space, Relatively compact subspace, Bounded function, Metric Measure Spaces, Metric (mathematics), Constant (mathematics), Mathematics
Abstract

We study a characterization of the precompactness of sets in variable exponent Morrey spaces on bounded metric measure spaces. Totally bounded sets are characterized from several points of view for the case of variable exponent Morrey spaces over metric measure spaces. This characterization is new in the case of constant exponents.

Published
2021

32. Regularity of solutions of elliptic equations in divergence form in modified local generalized Morrey spaces

Author

Maria Alessandra Ragusa, Andrea Scapellato, Vagif S. Guliyev, Mehriban N. Omarova, and Guliyev, Vagif S.

Subjects
Physics, Pure mathematics, Algebra and Number Theory, Operator (physics), 010102 general mathematics, Second order equation, VMO, 01 natural sciences, Omega, Divergence, 010101 applied mathematics, Elliptic curve, Integral Operators, Elliptic Equations, Morrey-Type Spaces, Nabla symbol, 0101 mathematics, Singular integral operators, Mathematical Physics, Analysis
Abstract

Aim of this paper is to prove regularity results, in some Modified Local Generalized Morrey Spaces, for the first derivatives of the solutions of a divergence elliptic second order equation of the form$$\begin{aligned} \mathscr {L}u{:}{=}\sum _{i,j=1}^{n}\left( a_{ij}(x)u_{x_{i}}\right) _{x_{j}}=\nabla \cdot f,\qquad \hbox {for almost all }x\in \Omega \end{aligned}$$Lu:=∑i,j=1naij(x)uxixj=∇·f,for almost allx∈Ωwhere the coefficients$$a_{ij}$$aijbelong to the Central (that is, Local) Sarason class CVMO andfis assumed to be in some Modified Local Generalized Morrey Spaces$$\widetilde{LM}_{\{x_{0}\}}^{p,\varphi }$$LM~{x0}p,φ. Heart of the paper is to use an explicit representation formula for the first derivatives of the solutions of the elliptic equation in divergence form, in terms of singular integral operators and commutators with Calderón–Zygmund kernels. Combining the representation formula with some Morrey-type estimates for each operator that appears in it, we derive several regularity results.

Published
2020
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33. Generalized fractional maximal and integral operators on Orlicz and generalized Orlicz–Morrey spaces of the third kind

Author

Minglei Shi, Yoshihiro Sawano, Vagif S. Guliyev, Eiichi Nakai, Fatih Deringoz, Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü, and Guliyev, Vagif S.

Subjects
Pure mathematics, General Mathematics, 0211 other engineering and technologies, 02 engineering and technology, Orlicz spaces, Characterization (mathematics), 01 natural sciences, Potential theory, Theoretical Computer Science, symbols.namesake, Generalized Fractional İntegral, 46E30, FOS: Mathematics, Generalized fractional integral, 0101 mathematics, Generalized fractional maximal function, 42B35, Mathematics, 021103 operations research, 010102 general mathematics, Operator theory, Functional Analysis (math.FA), Mathematics - Functional Analysis, Fourier analysis, Generalized Orlicz-Morrey spaces, symbols, 42B20, 42B25, 42B20, 42B25, 42B35, 46E30, Analysis
Abstract

In the present paper, we will characterize the boundedness of the generalized fractional integral operators I? and the generalized fractional maximal operators M? on Orlicz spaces, respectively. Moreover, we will give a characterization for the Spanne-type boundedness and the Adams-type boundedness of the operators M? and I? on generalized Orlicz–Morrey spaces, respectively. Also we give criteria for the weak versions of the Spanne-type boundedness and the Adams-type boundedness of the operators M? and I? on generalized Orlicz–Morrey spaces. © 2018, Springer Nature Switzerland AG., Ministry of Education and Science of the Russian Federation: 15H03621, 02. FEF.A4.18.019, EIF-BGM-4-RFTF-1/2017-21/01/1 Japan Society for the Promotion of Science: 16K05209, The research of F. Deringoz was partially supported by the Grant of Ahi Evran University Scientific Research Project (FEF.A4.18.019). The research of V. Guliyev was partially supported by the Grant of 1st Azerbaijan–Russia Joint Grant Competition (Agreement Number No. EIF-BGM-4-RFTF-1/2017-21/01/1) and by the Ministry of Education and Science of the Russian Federation (the Agreement No. 02.a03.21.0008). Eiichi Nakai was supported by Grant-in-Aid for Scientific Research (B), No. 15H03621, Japan Society for the Promotion of Science. Yoshihiro Sawano was supported by Grant-in-Aid for Scientific Research (C) (16K05209), the Japan Society for the Promotion of Science and by Peoples Friendship University of Russia. Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.

Published
2018
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34. Commutators of Fractional Maximal Operator on Orlicz Spaces

Author

Vagif S. Guliyev, Fatih Deringoz, Sabir G. Hasanov, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Mathematics::Functional Analysis, Pure mathematics, General Mathematics, 010102 general mathematics, commutator, Mathematics::Classical Analysis and ODEs, fractional maximal operator, 01 natural sciences, 010101 applied mathematics, Maximal operator, 0101 mathematics, Orlicz space, BMO, Mathematics
Abstract

WOS: 000451315200017 In the present paper, we give necessary and sufficient conditions for the boundedness of commutators of fractional maximal operator on Orlicz spaces. The main advance in comparison with the existing results is that we manage to obtain conditions for the boundedness not in integral terms but in less restrictive terms of supremal operators. Azerbaijan National Academy of ScienceAzerbaijan National Academy of Sciences (ANAS); Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.a03.21.0008]; Ahi Evran University Scientific ResearchAhi Evran University [FEF.A4.17.009] The research of V. S. Guliyev was supported in part by the Presidium of the Azerbaijan National Academy of Science 2015 and by the Ministry of Education and Science of the Russian Federation (project mo. 02.a03.21.0008).; The research of F. Deringoz was supported in part by the Ahi Evran University Scientific Research (grant no. FEF.A4.17.009).

Published
2018
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35. Approximation by trigonometric polynomials in variable exponent Morrey spaces

Author

Arash Ghorbanalizadeh, Yoshihiro Sawano, and Vagif S. Guliyev

Subjects
Pure mathematics, Algebra and Number Theory, Modulus of smoothness, Variable exponent, 010102 general mathematics, Mathematics::Classical Analysis and ODEs, Inverse, Type inequality, Space (mathematics), Lambda, 01 natural sciences, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, Trigonometry, Mathematical Physics, Analysis, Mathematics, Variable (mathematics)
Abstract

We investigate the direct and inverse theorems for trigonometric polynomials in the Morrey space $${{\mathcal {M}}}^{p(\cdot ),\lambda (\cdot )}$$ with variable exponents. For this space, we obtain estimates of the K-functional in terms of the modulus of smoothness and the Bernstein type inequality for trigonometric polynomials.

Published
2018
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38. Commutators and generalized local Morrey spaces

Author

Andrea Scapellato, Maria Alessandra Ragusa, Mehriban N. Omarova, Vagif S. Guliyev, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Pure mathematics, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Vanishing mean oscillation, Commutators, 01 natural sciences, Action (physics), 010101 applied mathematics, Generalized Morrey spaces, Maximal operator, Generalized local Morrey spaces, Analysis, 0101 mathematics, Mathematics
Abstract

WOS: 000412618800020 In this paper we study the behavior of Hardy-Littlewood maximal operator and the action of commutators in generalized local Morrey spaces LM{x0}p,phi (R-n) and generalized Morrey spaces M-p,M-phi(R-n). (C) 2016 Elsevier Inc. All rights reserved. grant of Presidium of Azerbaijan National Academy of SciencesAzerbaijan National Academy of Sciences (ANAS) The research of V. Guliyev and M. Omarova, was partially supported by the grant of Presidium of Azerbaijan National Academy of Sciences 2015.

Published
2018
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39. Maximal and singular integral operators and their commutators on generalized weighted Morrey spaces with variable exponent

Author

Vagif S. Guliyev, Xayyam A. Badalov, Javanshir J. Hasanov, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Mathematics::Functional Analysis, BMO space, Variable exponent, Applied Mathematics, General Mathematics, singular integral operators, 010102 general mathematics, Mathematical analysis, Mathematics::Classical Analysis and ODEs, generalized weighted Morrey space with variable exponent, 01 natural sciences, Computer Science::Computers and Society, 010101 applied mathematics, Maximal operator, 0101 mathematics, Singular integral operators, Mathematics
Abstract

WOS: 000413811900004 We consider the generalized weighted Morrey spaces M-omega(p(.),phi) (Omega) with variable exponent p(x) and a general function phi(x, r) defining the Morrey-type norm. In case of unbounded sets Omega subset of R-n we prove the boundedness of the Hardy-Littlewood maximal operator and Calderon-Zygmund singular operators with standard kernel, in such spaces. We also prove the boundedness of the commutators of maximal operator and Calderon-Zygmund singular operators in the generalized weighted Morrey spaces with variable exponent Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.a03.21.0008] The research of V. S. Guliyev is partially supported by the Ministry of Education and Science of the Russian Federation (the Agreement number: 02.a03.21.0008).

Published
2018
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40. Boundedness of operators arising from Schwarz BVP in modified local Morrey-type spaces

Author

Tuğçe Ünver, Vagif S. Guliyev, Kerim Koca, R. Ch. Mustafayev, Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü, and Kırıkkale Üniversitesi

Subjects
Mathematics::Functional Analysis, Numerical Analysis, Pure mathematics, Class (set theory), Mathematics::Complex Variables, Applied Mathematics, Hardy inequalities, 010102 general mathematics, Mathematical analysis, Mathematics::Classical Analysis and ODEs, 010103 numerical & computational mathematics, Type (model theory), Operator theory, Sublinear operators, 01 natural sciences, Computational Mathematics, local Morrey-type spaces, 0101 mathematics, Complex plane, Unit (ring theory), Analysis, Mathematics
Abstract

Unver Yildiz, Tugce/0000-0003-0414-8400; Yildiz, Tugce Unver/0000-0003-0414-8400; Mustafayev, Rza/0000-0002-2806-9646 WOS: 000406237200009 In this paper, we prove the boundedness of a class of operators arising from Schwarz BVP in modified local Morrey-type spaces in the unit disc of the complex plane. Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02. a03.21.0008] We thank the anonymous referee for his remarks, which have improved the final version of this paper. The research of V.S. Guliyev was partially supported by the Ministry of Education and Science of the Russian Federation (the Agreement number No: 02. a03.21.0008).

Published
2017
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41. Commutators of fractional maximal operator on generalized Orlicz–Morrey spaces

Author

Fatih Deringoz, Sabir G. Hasanov, Vagif S. Guliyev, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Discrete mathematics, Pure mathematics, General Mathematics, 010102 general mathematics, Fractional maximal operator, Type (model theory), Operator theory, 01 natural sciences, Potential theory, Theoretical Computer Science, Fractional calculus, 010101 applied mathematics, symbols.namesake, Generalized Orlicz-Morrey space, Fourier analysis, Commutator, symbols, Maximal operator, 0101 mathematics, Analysis, BMO, Mathematics
Abstract

WOS: 000425301900011 In the present paper, we shall give necessary and sufficient conditions for the Spanne and Adams type boundedness of the commutators of fractional maximal operator on generalized Orlicz-Morrey spaces, respectively. The main advance in comparison with the existing results is that we manage to obtain conditions for the boundedness not in integral terms but in less restrictive terms of supremal operators. Ahi Evran UniversityAhi Evran University [FEF.A3.16.024]; Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.a03.21.0008] The research of V.S. Guliyev and F. Deringoz is partially supported by the grant of Ahi Evran University Scientific Research Project (FEF.A3.16.024). The research of V.S. Guliyev is partially supported by the Ministry of Education and Science of the Russian Federation (the Agreement No. 02.a03.21.0008).

Published
2017
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42. Intrinsic Square Functions on Vanishing Generalized Orlicz-Morrey Spaces

Author

Vagif S. Guliyev, Fatih Deringoz, Maria Alessandra Ragusa, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Statistics and Probability, Intrinsic square functions, Mathematics::Functional Analysis, Numerical Analysis, Pure mathematics, Property (philosophy), Vanishing generalized Orlicz-Morrey spaces, Applied Mathematics, 010102 general mathematics, Mathematics::Classical Analysis and ODEs, Monotonic function, 01 natural sciences, Square (algebra), 010101 applied mathematics, Commutator, Geometry and Topology, 0101 mathematics, Algorithm, Analysis, BMO, Mathematics
Abstract

WOS: 000418588300010 We study the boundedness of intrinsic square functions and their commutators on vanishing generalized Orlicz-Morrey spaces. In all the cases the conditions for the boundedness are given in terms of Zygmund-type integral inequalities without assuming any monotonicity property. Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.a03.21.0008]; Ahi Evran University Scientific Research ProjectAhi Evran University [FEF.A3.16.011]; Research Project FIR The research of V.S. Guliyev was partially supported by the Ministry of Education and Science of the Russian Federation (the Agreement number: 02.a03.21.0008).r The research of F. Deringoz was partially supported by the grant of Ahi Evran University Scientific Research Project (FEF.A3.16.011).r The research of M.A. Ragusa was partially supported by the grant of the Research Project FIR 2014.

Published
2017
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43. Characterizations for the fractional maximal operator and its commutators in generalized weighted Morrey spaces on Carnot groups

Author

Vagif S. Guliyev

Subjects
Physics, Mathematics::Functional Analysis, Algebra and Number Theory, Operator (physics), 010102 general mathematics, Dimension (graph theory), Mathematics::Classical Analysis and ODEs, Commutator (electric), Carnot group, Characterization (mathematics), Type (model theory), 01 natural sciences, law.invention, Combinatorics, symbols.namesake, law, 0103 physical sciences, symbols, Maximal operator, 010307 mathematical physics, 0101 mathematics, Carnot cycle, Mathematical Physics, Analysis
Abstract

In this paper, we shall give a characterization for the strong and weak type Spanne type boundedness of the fractional maximal operator $$M_{\alpha }$$ , $$0\le \alpha

Published
2020
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44. The Dirichlet problem for the uniformly elliptic equation in generalized weighted Morrey spaces

Author

Tahir Gadjiev, Konul G. Suleymanova, Vagif S. Guliyev, and Guliyev, Vagif Sabir

Subjects
Dirichlet problem, Pure mathematics, Mathematics::Functional Analysis, A Priori Estimates, Uniformly Higher-Order Elliptic Equations, Computer Science::Information Retrieval, General Mathematics, Mathematics::Analysis of PDEs, Mathematics::Classical Analysis and ODEs, Generalized Weighted Morrey Spaces, VMO, Commutators, Elliptic curve, Mathematics
Abstract

In this paper, we obtain generalized weighted Sobolev-Morrey estimates with weights from the Muckenhoupt class Ap by establishing boundedness of several important operators in harmonic analysis such as Hardy-Littlewood operators and Calderon-Zygmund singular integral operators in generalized weighted Morrey spaces. As a consequence, a priori estimates for the weak solutions Dirichlet boundary problem uniformly elliptic equations of higher order in generalized weighted Sobolev-Morrey spaces in a smooth bounded domain Ω ⊂ ℝn are obtained.

Published
2020

45. Generalized fractional maximal operator on generalized local morrey spaces

Author

Vagif S. Guliyev, Ayhan Serbetci, and Abdulhamit Kucukaslan

Subjects
Mathematics::Functional Analysis, Pure mathematics, media_common.quotation_subject, Mathematics::Classical Analysis and ODEs, Monotonic function, General Medicine, Generalized fractional maximal operator, generalized local Morrey, Type (model theory), Infinity, Generalized fractional maximal operator,generalized local Morrey spaces,generalized Morrey spaces, Generalized Local Morrey Spaces, Maximal operator, Generalized Fractional Maximal Operator, Generalized Morrey Spaces, Mathematics, media_common, spaces, generalized Morrey spaces
Abstract

WOS: 000499091900005, In this paper, we study the boundedness of generalized fractional maximal operator M-rho on generalized local Morrey spaces LMP,phi{x0} and generalized Morrey spaces M-p,M-phi, including weak estimates. Firstly, we prove the Spanne type boundedness of M-rho from the space LMp,phi 1{x0} to another LMq,phi 2{x0} 1 < p < q < infinity and from LM1,phi 1{x0} to the weak space WLMq,phi 2{x0} for p = 1 and 1 < q < infinity. Secondly, we prove the Adams type boundedness of M-rho from the space M-p,M-phi 1/p to another M-q,M-phi 1/q for 1 < p < q < infinity and from to the weak M-1,M-phi, space M-q,M-phi 1/q for p = 1 and 1 < q < infinity. In all cases the conditions for the boundedness of M-rho are given in terms of supremal-type integral inequalities on (phi(1), phi(2), rho) and (phi, rho), which do not assume any assumption on monotonicity of phi(1) (x, r), phi(2)(x, r) and phi(x, r) in r., Scientific and Technological Research Council of Turkey (TUBITAK)Turkiye Bilimsel ve Teknolojik Arastirma Kurumu (TUBITAK) [1059B191600675]; Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.a03.21.0008], The research of A. Kucukaslan was totally supported by the grant of The Scientific and Technological Research Council of Turkey (TUBITAK), [Grant-1059B191600675].; The research of V.S. Guliyev was partially supported by the Ministry of Education and Science of the Russian Federation (the Agreement number No. 02.a03.21.0008).

Published
2020

46. Characterizations for the potential operators on Carleson curves in local generalized Morrey spaces

Author

Hatice Armutcu, Vagif S. Guliyev, Tahir Aliyev Azeroglu, and Guliyev, Vagif

Subjects
Pure mathematics, Mathematics::Functional Analysis, Adams-Type İnequalities, lcsh:Mathematics, General Mathematics, Astrophysics::High Energy Astrophysical Phenomena, 010102 general mathematics, Mathematics::Classical Analysis and ODEs, lcsh:QA1-939, 01 natural sciences, Potential Operator, 010101 applied mathematics, adams-type inequalities, 0101 mathematics, 26a33, Local Generalized Morrey Space, 42b25, 42b35, 47b38, Geometry and topology, Carleson Curve, Mathematics
Abstract

In this paper, we give a boundedness criterion for the potential operator ℐ α { {\mathcal I} }^{\alpha } in the local generalized Morrey space L M p , φ { t 0 } ( Γ ) L{M}_{p,\varphi }^{\{{t}_{0}\}}(\text{Γ}) and the generalized Morrey space M p , φ ( Γ ) {M}_{p,\varphi }(\text{Γ}) defined on Carleson curves Γ \text{Γ} , respectively. For the operator ℐ α { {\mathcal I} }^{\alpha } , we establish necessary and sufficient conditions for the strong and weak Spanne-type boundedness on L M p , φ { t 0 } ( Γ ) L{M}_{p,\varphi }^{\{{t}_{0}\}}(\text{Γ}) and the strong and weak Adams-type boundedness on M p , φ ( Γ ) {M}_{p,\varphi }(\text{Γ}) .

Published
2020

47. Schrodinger type operators on local generalized Morrey spaces related to certain nonnegative potentials

Author

Maria Alessandra Ragusa, Vagif S. Guliyev, Ramin V. Guliyev, and Mehriban N. Omarova

Subjects
Mathematics::Functional Analysis, Pure mathematics, Class (set theory), Applied Mathematics, 010102 general mathematics, Mathematics::Classical Analysis and ODEs, Schrodinger Differential Operatör, Type (model theory), fractional calculus, Fractional İntegral Operatör, 01 natural sciences, Fractional calculus, 010101 applied mathematics, symbols.namesake, symbols, Discrete Mathematics and Combinatorics, 0101 mathematics, Schrödinger's cat, Mathematics
Abstract

WOS: 000497688200012, We establish the boundedness of some Schrodinger type operators on local generalized Morrey spaces related to certain nonnegative potentials belonging to the reverse Holder class., grant of 1st Azerbaijan Russia Joint Grant Competition [EIF-BGM-4-RFTF-1/2017-21/01/1]; Ministry of Education and Science of the Russian FederationMinistry of Education and Science, Russian Federation [02.03.21.0008], The research of V.S. Guliyev and M. Omarova was partially supported by the grant of 1st Azerbaijan Russia Joint Grant Competition (Grant No. EIF-BGM-4-RFTF-1/2017-21/01/1).; The research of V.S. Guliyev and M.A. Ragusa are partially supported by the Ministry of Education and Science of the Russian Federation (Agreement number N. 02.03.21.0008).

Published
2019

48. Characterizations for the fractional maximal commutator operator in generalized Morrey spaces on Carnot group

Author

Vagif S. Guliyev, Esra Kaya, Ismail Ekincioglu, and Z. V. Safarov

Subjects
Pure mathematics, Carnot Group, Applied Mathematics, Operator (physics), 010102 general mathematics, Commutator (electric), Carnot group, 010103 numerical & computational mathematics, Type (model theory), Characterization (mathematics), 01 natural sciences, law.invention, law, Fractional Maximal Operator, Commutator, Maximal operator, 0101 mathematics, Analysis, Generalized Morrey Space, Mathematics, BMO
Abstract

In this paper, we will obtain the new results of the strong and weak Spanne-Guliyev, Adams-Guliyev and Adams-Gunawan type boundedness characterization of the fractional maximal operator Mα in generalized Morrey spaces, respectively. Moreover, we will give a characterization for the boundedness of the fractional maximal commutator operator Mb,α in generalized Morrey spaces.

Published
2019

49. Generalized Morrey Spaces – Revisited

Author

Ali Akbulut, Yoshihiro Sawano, Vagif S. Guliyev, Takahiro Noi, and Kırşehir Ahi Evran Üniversitesi, Fen-Edebiyat Fakültesi, Matematik Bölümü

Subjects
Pure mathematics, decomposition, Applied Mathematics, 010102 general mathematics, Decomposition (computer science), generalized Morrey spaces, 010103 numerical & computational mathematics, 0101 mathematics, 01 natural sciences, maximal operators, Analysis, Mathematics
Abstract

WOS: 000396573400002 The generalized Morrey space M-p,M-phi(R-n) was defined by Mizuhara 1991 and Nakai in 1994. It is equipped with a parameter 0 < p < infinity and a function phi : R-n x (0, infinity) -> (0, infinity). Our experience shows that M-p,M-phi(R-n) is easy to handle when 1 < p < infinity. However, when 0 < p

Published
2017
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50. Dirichlet boundary value problems for uniformly elliptic equations in modified local generalized Sobolev–Morrey spaces

Author

Vagif S. Guliyev, Tahir Gadjiev, and Shahla Galandarova

Subjects
Sublinear function, a priori estimates, Mathematics::Classical Analysis and ODEs, Mathematics::Analysis of PDEs, 01 natural sciences, Elliptic boundary value problem, Dirichlet distribution, symbols.namesake, Dirichlet's principle, QA1-939, Boundary value problem, 0101 mathematics, uniformly elliptic equations, Mathematics, Mathematics::Functional Analysis, Applied Mathematics, 010102 general mathematics, Mathematical analysis, solvability of dirichlet problem, modified local generalized sobolev–morrey spaces, 010101 applied mathematics, Sobolev space, Bounded function, Dirichlet boundary condition, symbols
Abstract

In this paper, we study the boundedness of the sublinear operators, generated by Calderon–Zygmund operators in local generalized Morrey spaces. By using these results we prove the solvability of the Dirichlet boundary value problem for a polyharmonic equation in modified local generalized Sobolev–Morrey spaces. We obtain a priori estimates for the solutions of the Dirichlet boundary value problems for the uniformly elliptic equations in modified local generalized Sobolev–Morrey spaces defined on bounded smooth domains.

Published
2017
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