Güncel Gönderiler: Matematik Bölümü
Toplam kayıt 316, listelenen: 281-300
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A comparative study on generating function relations for generalized hypergeometric functions via generalized fractional operators
(SPRINGER INTERNATIONAL PUBLISHING AG, 2018)In this paper, we present further generalizations of the beta function; Riemann-Liouville, Caputo and Kober-Erdelyi fractional operators by using confluent hypergeometric function with six parameters. We also define new ... -
A STUDY ON MATRIX SUMMABILITY OF FOURIER SERIES
(MILI PUBL, 2018)In this paper, a main result dealing with absolute Riesz summability of Fourier series has been generalized to the vertical bar A, P-n vertical bar(k) summability method. Some new results concerning an application of ... -
Global Regularıty In Orlıcz-Morrey Spaces Of Solutıons To Nondıvergence Ellıptıc Equatıons Wıth Vmo Coeffıcıents
(TEXAS STATE UNIV, 2018)We show continuity in generalized Orlicz-Morrey spaces M-Phi,M-phi (R-n) of sublinear integral operators generated by Calderon-Zygmund operator and their commutators with BMO functions. The obtained estimates are used to ... -
Commutator of fractional integral with Lipschitz functions associated with Schrodinger operator on local generalized Morrey spaces
(SPRINGER INTERNATIONAL PUBLISHING AG, 2018)Let L = -Delta + V be a Schrodinger operator on R-n, where n >= 3 and the nonnegative potential V belongs to the reverse Holder class RHq1 for some q(1) > n/2. Let b belong to a new Campanato space Lambda(theta)(nu) (rho) ... -
Necessary and sufficient condition for the boundedness of the Gegenbauer-Riesz potential on Morrey spaces
(WALTER DE GRUYTER GMBH, 2018)In this paper, we study the Riesz potential (G-Riesz potential) generated by the Gegenbauer differential operator G(lambda) = (x(2) - 1()1/2-lambda) d/dx (x(2) - 1)(lambda+1/2) d/dx, x is an element of(1, infinity), lambda ... -
A matrix application on absolute weighted arithmetic mean summability factors of infinite series
(TBILISI CENTRE MATH SCI, 2018)In this present paper, we have generalized a main theorem dealing with vertical bar(N) over bar, p(n)vertical bar(k) summability of non- decreasing sequences to vertical bar A,p(n)vertical bar(k) summability method by using ... -
ON THE DIMENSION OF THE PRODUCT [L-2, L-2, L-1] IN FREE LIE ALGEBRAS
(UNIV ISFAHAN, VICE PRESIDENT RESEARCH & TECHNOLOGY, 2018)Let L be a free Lie algebra of rank r >= 2 over a field F and let L-n denote the degree n homogeneous component of L. By using the dimensions of the corresponding homogeneous and fine homogeneous components of the second ... -
KOROVKIN TYPE APPROXIMATION THEOREMS IN WEIGHTED SPACES VIA POWER SERIES METHOD
(ELEMENT, 2018)In this paper we consider power series method which is also member of the class of all continuous summability methods. We study a Korovkin type approximation theorem for a sequence of positive linear operators acting from ... -
Morrey-type estimates for commutator of fractional integral associated with Schrodinger operators on the Heisenberg group
(PUSHPA PUBLISHING HOUSE, 2018)Let L = - Delta(Hn) + V be a Schrodinger operator on the Heisenberg group H-n m where the nonnegative potential V belongs to the reverse Holder class RH q , for some q(1) >= Q/2, and Q is the homogeneous dimension of H-n ... -
Some Characterizations of Lipschitz Spaces via Commutators on Generalized Orlicz-Morrey Spaces
(SPRINGER BASEL AG, 2018)In this paper, we give some new characterizations of the Lipschitz spaces via the boundedness of commutators associated with the fractional maximal operator, Riesz potential and Caldern-Zygmund operator on generalized ... -
FRACTIONAL INTEGRAL ASSOCIATED WITH SCHRODINGER OPERATOR ON VANISHING GENERALIZED MORREY SPACES
(ELEMENT, 2018)Let L= -Delta + V be a Schrodinger operator, where the non-negative potential V belongs to the reverse Holder class RHn/2, let b belong to a new BMO theta(rho) space, and let I-beta(L) be the fractional integral operator ... -
The Arzela-Ascoli theorem by means of ideal convergence
(WALTER DE GRUYTER GMBH, 2018)In this paper, using the concept of ideal convergence, which extends the idea of ordinary convergence and statistical convergence, we are concerned with the I-uniform convergence and the I-pointwise convergence of sequences ... -
Hardy operators on Musielak-Orlicz spaces
(WALTER DE GRUYTER GMBH, 2018)In this paper, we study the boundedness of the Hardy operators on Musielak-Orlicz spaces. -
Commutators of Fractional Maximal Operator on Orlicz Spaces
(MAIK NAUKA/INTERPERIODICA/SPRINGER, 2018)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 ... -
Maximal Operator and its Commutators on Generalized Weighted Orlicz-Morrey Spaces
(TOKYO JOURNAL MATHEMATICS EDITORIAL OFFICE ACAD CENTER, 2018)In the present paper, we shall give necessary and sufficient conditions for the boundedness of the Hardy-Littlewood maximal operator and its commutators on generalized weighted Orlicz-Morrey spaces M-w(Phi,psi)(R-n). The ... -
LOCAL COMPARABILITY OF EXCHANGE IDEALS
(IEJA-INT ELECTRONIC JOURNAL ALGEBRA, 2019)An exchange ideal I of a ring R is locally comparable if for every regular x is an element of I there exists a right or left invertible u is an element of 1 + I such that x = xux. We prove that every matrix extension of ... -
Optimal Control Problem for Bianchi Equation in Variable Exponent Sobolev Spaces
(SPRINGER/PLENUM PUBLISHERS, 2019)In this paper, a necessary and sufficient condition, such as the Pontryagin's maximum principle for an optimal control problem with distributed parameters, is given by the third-order Bianchi equation with coefficients ... -
HIGHER ORDER RIESZ TRANSFORMS RELATED TO SCHRODINGER TYPE OPERATOR ON LOCAL GENERALIZED MORREY SPACES
(INST APPLIED MATHEMATICS, 2019)In this paper, we study the boundedness of the higher order Riesz transforms R, R* and their commutators [b, R], [b, R*] on local generalized Morrey spaces LMp,phi alpha,V,{x0} and vanishing generalized Morrey spaces VMp,phi ... -
A NEW RESULT ON MATRIX SUMMABILITY FACTORS OF FOURIER SERIES
(L N GUMILYOV EURASIAN NATL UNIV, 2019)Sulaiman [10] has investigated absolute weighted mean summability theorems for numerical and Fourier series. In the present paper, we have extended the result of Sulaiman to the vertical bar A, p(n)vertical bar(k) summability ... -
A NEW FACTOR THEOREM ON ABSOLUTE MATRIX SUMMABILITY METHODS
(TURKIC WORLD MATHEMATICAL SOC, 2019)The aim of this paper is to obtain a new theorem dealing with absolute matrix summability factors.