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  Volume 6, Issue 4, Article 123
 
On Global Approximation Properties of Abstract Integral Operators in Orlicz Spaces and Applications
    Authors: Carlo Bardaro, Ilaria Mantellini,  
    Keywords: Modular approximation, nonlinear integral operators, regular families, singularity.  
    Date Received: 25/08/05  
    Date Accepted: 01/09/05  
    Subject Codes:

41A25, 41A35, 47G10, 46E30.

  
    Editors: Sever S. Dragomir,  
 
    Abstract:

In this paper we study approximation properties for the class of general integral operators of the form

$displaystyle (T_wf)(s) = int_{H_w} K_w (s,t, f(t)) dmu_{H_w}(t)    sin G, w>0$    

where $ G$ is a locally compact Hausdorff topological space, $ (H_w)_{w>0}$ is a net of closed subsets of $ G$ with suitable properties and, for every $ w>0,$ $ mu_{H_w}$ is a regular measure on $ H_w.$ We give pointwise, uniform and modular convergence theorems in abstract modular spaces and we apply the results to some kinds of discrete operators including the sampling type series.

         
       
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