Lp estimates and weighted estimates of fractional maximal rough singular integrals on homogeneous groups

Abstract

In this paper, we study the Lp boundedness and Lp(w) boundedness (1<p<∞ and w a Muckenhoupt Ap weight) of fractional maximal singular integral operators T,α\# with homogeneous convolution kernel (x) on an arbitrary homogeneous group H of dimension Q. We show that if 0<α<Q, ∈ L1() and satisfies the cancellation condition of order [α], then for any 1<p<∞, align* \|T,α\#f\|Lp(H)\|\|L1()\|f\|Lαp(H), align* where for the case α=0, the Lp boundedness of rough singular integral operator and its maximal operator were studied by Tao (Tao) and Sato (sato), respectively. We also obtain a quantitative weighted bound for these operators. To be specific, if 0≤α<Q and satisfies the same cancellation condition but a stronger condition that ∈ Lq() for some q>Q/α, then for any 1<p<∞ and w∈ Ap, align* \|T,α\#f\|Lp(w)\|\|Lq()\w\Ap(w)Ap\|f\|Lαp(w),\ \ 1<p<∞. align*