Limiting weak-type behavior for rough bilinear operators

Abstract

Let 1,2 be functions of homogeneous of degree 0 and =(1,2)∈ L L(Sn-1)× L L(Sn-1). In this paper, we investigate the limiting weak-type behavior for bilinear maximal function M and bilinear singular integral T associated with rough kernel . For all f,g∈ L1(Rn), we show that λ 0+λ |\ x∈Rn:M(f1,f2)(x)>λ\|2 = \|12\|L1/2(Sn-1)ωn-12Πi=12\| fi\|L1 and λ 0+λ|\ x∈Rn:| T(f1,f2)(x)|>λ\|2 = \|12\|L1/2(Sn-1)n2Πi=12\| fi\|L1. As consequences, the lower bounds of weak-type norms of M and T are obtained. These results are new even in the linear case. The corresponding results for rough bilinear fractional maximal function and fractional integral operator are also discussed.