Yazar "Gurkanli, A. Turan" için listeleme
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Bilinear multipliers of weighted Lebesgue spaces and variable exponent Lebesgue spaces
Kulak, Oznur; Gurkanli, A. Turan (Springeropen, 2013)Let 1 <= p(1), p(2) < infinity, 0 < p(3) <= infinity and omega(1), omega(2), omega(3) be weight functions on R-n. Assume that omega(1), omega(2) are slowly increasing functions. We say that a bounded function m(xi, eta) ... -
GABOR ANALYSIS OF THE SPACES M (p, q, w) (R-d) AND S (p, q, r, w, omega) (R-d)
Sandikci, Ayse; Gurkanli, A. Turan (Springer, 2011)Let g be a non-zero rapidly decreasing function and w be a weight function. In this article in analog to modulation space, we define the space M(p, q, w)(R-d) to be the subspace of tempered distributions f E S'(R-d) such ... -
Multipliers and tensor products of L(p, q) Lorentz spaces
Avci, Hakan; Gurkanli, A. Turan (Elsevier Science Inc, 2007)Let G be a locally compact abelian group. The main purpose of this article is to find the space of multipliers from the Lorentz space L(p(1), q(1)) (G) to L(p(2)', q(2)') (G). For p, q1 (G), discuss its properties and prove ... -
ON FUNCTION SPACES WITH WAVELET TRANSFORM IN L-omega(p) (R-d x R+)
Kulak, Oznur; Gurkanli, A. Turan (Hacettepe Univ, Fac Sci, 2011)Let omega(1) and omega(2) be weight functions on R-d, R-d x R+, respectively. Throughout this paper, we define D-omega 1,omega 2(p,q) (R-d) to be the vector space of f is an element of L-omega 1(p) (R-d) such that the ... -
Time frequency analysis and multipliers of the spaces M(p, q) (R-d) and S(p, q) (R-d)
Gurkanli, A. Turan (Kinokuniya Co Ltd, 2006)In the second section of this paper, in analogy to modulation spaces, we define the space M(p, q) (R-d) to be the subspace of tempered distributions f is an element of S' (R-d) such that the Gabor transform V-g (f) of f ... -
WEIGHTED VARIABLE EXPONENT AMALGAM SPACES W(Lp(x), Lwq)
Aydin, Ismail; Gurkanli, A. Turan (Croatian Mathematical Soc, 2012)In the present paper a new family of Wiener amalgam spaces W(L-p(x), L-w(q)) is defined, with local component which is a variable exponent Lebesgue space L-p(x)(R-n) and the global component is a weighted Lebesgue space ...
