On the Calderon-Zygmund property of Riesz-transform type operators arising in nonlocal equations

Abstract

We show that the operator \[ TK,s1,s2f(z) := ∫Rn AK,s1,s2(z1,z2) f(z2)\, dz2 \] is a Calderon-Zygmund operator. Here for K ∈ L∞(Rn × Rn), and s,s1,s2 ∈ (0,1) with s1+s2 = 2s we have \[ AK,s1,s2(z1,z2) = ∫Rn ∫Rn K(x,y) (|x-z1|s1-n -|y-z1|s1-n )\, (|x-z2|s2-n -|y-z2|s2-n )|x-y|n+2s\, dx\, dy. \] This operator is motivated by the recent work by Mengesha-Schikorra-Yeepo where it appeared as analogue of the Riesz transforms for the equation \[ ∫Rn ∫Rn K(x,y) (u(x)-u(y))\, ((x)-(y))|x-y|n+2s\, dx\, dy = f[]. \]