The s-Riesz transform of an s-dimensional measure in 2 is unbounded for 1<s<2
Abstract
In this paper, we prove that for s∈(1,2) there exists no totally lower irregular finite positive Borel measure μ in 2 with Hs(μ)<+∞ such that \|Rμ\|L∞(m2)<+∞, where Rμ=μx|x|s+1 and m2 is the Lebesgue measure in 2. Combined with known results of Prat and Vihtil\"a, this shows that for any non-integer s∈(0,2) and any finite positive Borel measure in 2 with Hs(μ)<+∞, we have \|Rμ\|L∞(m2)=∞.
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