Annulus Maximal Averages on Variable Hyperplanes

Abstract

By giving a thin width of 0<δ 1 to both a unit circle and a unit line, we set an annulus and a tube on the Euclidean plane R2. Consider the maximal means Mδ over dilations of the annulus, and Nδ over rotations of the tube. It is known that their operator norms on L2(R2) are O(| 1/δ|1/2). In this paper, we study the maximal averages MAδ and NAδ over those annuli and tubes now imbedded on the variable hyperplanes (x,x3)+\(y, A(x), y): y∈R2\⊂ R3 where A is a 2× 2 matrix. The model hyperplane is the horizontal plane of the Heisenberg group when A is the skew--symmetric matrix denoted by E. It turns out that a rank of matrix EA+(EA)T or A+AT determines \|MAδ\|op or \|NAδ\|op respectively. In the higher dimension, the corresponding spherical maximal means is bounded in Lp if A has only complex eigenvalues.