The lattice point counting problem on the Heisenberg groups

Abstract: We consider the radial and Heisenberg-homogeneous norms on the Heisenberg groups given by N α,A ((z, t), for α ≥ 2 and A > 0. This natural family includes the canonical Cygan-Korányi norm, corresponding to α = 4. We study the lattice points counting problem on the Heisenberg groups, namely establish an error estimate for the number of points that the lattice of integral points has in a ball of large radius R. The exponent we establish for the error in the case α = 2 is the best possible, in all dimensions.

“…Upper bound, mean-square and Ω-results for E ( ): A short survey. Garg, Nevo and Taylor [9] have obtained the lower bound ≥ 2 for any value of ≥ 1. In our previous work [10], this lower bound was proved to be sharp in the case of = 1, namely 1 = 2, and so the problem is resolved for H 1 .…”

On the Distribution of the Number of Lattice Points in Norm Balls on the Heisenberg Groups

“…Upper bound, mean-square and Ω-results for E ( ): A short survey. Garg, Nevo and Taylor [9] have obtained the lower bound ≥ 2 for any value of ≥ 1. In our previous work [10], this lower bound was proved to be sharp in the case of = 1, namely 1 = 2, and so the problem is resolved for H 1 .…”

On the Distribution of the Number of Lattice Points in Norm Balls on the Heisenberg Groups

“…In fact, we shall first state the lattice point counting problem on an arbitrary Heisenberg group with respect to a certain family of gauges. This family, consisting of the so called Heisenberg-norms, arises naturally through the action of the dilation and unitary groups, and was considered in [7] where the reader may find an in-depth and broad treatment of the lattice point counting problem on the Heisenberg groups.…”

On the best possible exponent for the error term in the lattice point counting problem on the first Heisenberg group

“…In the higher dimensional case ≥ 3, the best result available to date is |E ( )| ≪ 2 −2/3 which was proved by the author ( [10], Theorem 1), and we also have ( [10], Theorem 3) the Ω-result E ( ) = Ω 2 −1 log 1/4 log log 1/8 . It follows that 8 3 ≤ ≤ 3. In regards to what should be the conjectural value of in the case of ≥ 3, it is known ( [10], Theorem 2) that E ( ) has order of magnitude 2 −1 in mean-square, which leads to the conjecture that = 3.…”

“…. , 2 , 2 2 +1 ) with > 0 are the Heisenberg dilations, and B = u ∈ R 2 +1 : |u| ≤ 1 is the unit ball with respect to the Cygan-Korányi norm (see [8,10] for more details). It is clear that ( ) will grow for large like vol B 2 +2 , where vol(•) is the Euclidean volume, and we shall be interested in the error term resulting from this approximation.…”

“…We shall refer to the lattice point counting problem for (2 + 1)-dimensional Cygan-Korányi balls as the problem of determining the value of . This problem was first considered by Garg, Nevo and Taylor [8], who established the lower bound ≥ 2 for all integers ≥ 1. For = 1, which is the case we shall be concerned with in the present paper, this lower bound was proven by the author to be sharp, that is 1 = 2 (see [9], Theorem 1.1, and note that a different normalization is used for the exponent of the error term).…”

Distribution and Moments of the Error Term in the Lattice Point Counting Problem for 3-Dimensional Cygan-Korányi Balls