Yazar "Omarova M.N." için listeleme
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Characterizations for the nonsingular integral operator and its commutators on generalized Orlicz-Morrey spaces
Eroglu A.; Guliyev V.S.; Omarova M.N. (Azerbaijan Mathematical Society, 2017)We show continuity in generalized Orlicz-Morrey spaces M??(Rn +) of nonsingular integral operators and its commutators with BMO functions. We shall give necessary and sufficient conditions for the boundedness of the ... -
Fractional integral associated with Schrö dinger operator on vanishing generalized Morrey spaces
Akbulut A.; Guliyev R.V.; Celik S.; Omarova M.N. (Element D.O.O., 2018)Let L = -?+V be a Schrödinger operator, where the non-negative potential V belongs to the reverse Hölder class RH n/2 , let b belong to a new BMO ? (?) space, and let I L ß be the fractional integral operator associated ... -
Global regularity in Orlicz-Morrey spaces of solutions to nondivergence elliptic equations with VMO coefficients
Guliyev V.S.; Ahmadli A.A.; Omarova M.N.; Softova L. (Texas State University - San Marcos, 2018)We show continuity in generalized Orlicz-Morrey spaces M?,?(Rn) of sublinear integral operators generated by Calder´on-Zygmund operator and their commutators with BMO functions. The obtained estimates are used to study ... -
Higher order commutators of vector-valued intrinsic square functions on vector-valued generalized weighted Morrey spaces
Guliyev V.S.; Omarova M.N. (Azerbaijan Mathematical Society, 2014)In this paper, we will obtain the strong type and weak type estimates for vector-valued analogues of intrinsic square functions in the generalized weighted Morrey spaces Mpw,? (Rn). We study the boundedness of intrinsic ... -
Multilinear singular and fractional integral operators on generalized weighted morrey spaces
Guliyev V.S.; Omarova M.N. (Azerbaijan Mathematical Society, 2015)In this paper, we study the boundedness of multilinear Calderòn-Zygmund operators, multilinear fractional integral operators and their commutators on products of generalized weighted Morrey spaces with multiple weights. © ...
