On The Boundedness of Bi-parameter Littlewood-Paley gλ*-function
Abstract
Let m,n 1 and gλ1,λ2* be the bi-parameter Littlewood-Paley gλ*-function defined by gλ1,λ2*(f)(x)= (m+1+ (t2t2 + |x2 - y2|)m λ2 n+1+ (t1t1 + |x1 - y1|)n λ1|θt1,t2 f(y1,y2)|2 dy1 dt1t1n+1 dy2 dt2t2m+1 )1/2, λ1>1, λ2>1 where θt1,t2 f is a non-convolution kernel defined on Rm+n. In this paper, we showed that the bi-parameter Littlewood-Paley function gλ1,λ2* was bounded from L2(n+m) to L2(n+m). This was done by means of probabilistic methods and by using a new averaging identity over good double Whitney regions.
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