The space  $\Omega^p_m(R^d)$ and some properties

A. T. Gürkanli; A. Sandikçi

The space $\Omega^p_m(R^d)$ and some properties

Authors

A. T. Gürkanli
A. Sandikçi

Abstract

Let

$m$ be a

$v$ -moderate function defined on

$R^d$ and let

$g \in L^2(R^d)$ . In this work, we define

$\Omega ^p_m(R^d)$ to be the vector space of

$f \in L^2_n(R^d)$ such that the Gabor transform

$V_gf$ belongs to

$L^p(R^{2d})$ , where

$1 \leq p < \infty$ . We endowe it with a norm and show that it is a Banach space with this norm. We also study some preliminary properties of

$\Omega ^p_m(R^d)$ . Later we discuss inclusion properties and obtain the dual space of

$\Omega ^p_m(R^d)$ . At the end of this work, we study multipliers from

$L_w^1 (R^d)$ into

$\Omega ^p_w(R^d)$ and from

$\Omega ^p_w(R^d)$ into

$L^{\infty}_{w^{-1}}(R^d)$ , where

$w$ is Beurling's weight function.

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Published

25.01.2006

Issue

Vol. 58 No. 1 (2006)

Section

Short communications

How to Cite

Gürkanli, A. T., and A. Sandikçi. “The Space

$\Omega^p_m(R^d)$ and Some Properties”. Ukrains’kyi Matematychnyi Zhurnal, vol. 58, no. 1, Jan. 2006, pp. 139-45, https://umj.imath.kiev.ua/index.php/umj/article/view/3441.

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The space $\Omega^p_m(R^d)$ and some properties

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The space Ωpm(Rd)\Omega^p_m(R^d) and some properties

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The space $\Omega^p_m(R^d)$ and some properties