Existence of double Walsh series universal in weighted Lμ1[0,1]2 spaces
Abstract
In this paper we consider a question on existence of double Walsh series universal in weighted Lμ1[0,1]2 spaces. We construct a weighted function μ(x,y) and a series by double Walsh system of the form Σn,k=1∞ cn,kWn(x)Wk(y)\ \ with \ \ Σn,k=1∞ | cn,k |q <∞\ for all\ q>2, which is universal in Lμ1[0,1]2 concerning subseries with respect to convergence, in the sense of both spherical and rectangular partial sums.
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