On the Bounds of Weak (1,1) Norm of Hardy-Littlewood Maximal Operator with L L( Sn-1) Kernels

Abstract

Let ∈ L1( Sn-1), be a function of homogeneous of degree zero, and M be the Hardy-Littlewood maximal operator associated with defined by M(f)(x) = r>01rn∫|x-y|<r|(x-y)f(y)|dy. It was shown by Christ and Rubio de Francia that \|M(f)\|L1,∞( Rn) C(\|\|L L( Sn-1)+1)\|f\|L1( Rn) provided ∈ L L ( Sn-1). In this paper, we show that, if ∈ L L( Sn-1), then for all f∈ L1( Rn), M enjoys the limiting weak-type behaviors that λ 0+λ|\x∈ Rn:M(f)(x)>λ\| = n-1\|\|L1( Sn-1)\|f\|L1( Rn). This removes the smoothness restrictions on the kernel , such as Dini-type conditions, in previous results. To prove our result, we present a new upper bound of \|M\|L1 L1,∞, which essentially improves the upper bound C(\|\|L L( Sn-1)+1) given by Christ and Rubio de Francia. As a consequence, the upper and lower bounds of \|M\|L1 L1,∞ are obtained for ∈ L L ( Sn-1).