Lp-Heisenberg-Pauli-Weyl Uncertainty Inequalities on Laguerre Hypergroup

Abstract

In this article, we establish the Lp-Heisenberg-Pauli-Weyl uncertainty inequalities on the Laguerre hypergroup K, the natural setting for radial analysis on the Heisenberg group. For 1 ≤ p < 2, under the condition b > Q(1/p - 1/2), and for 2 ≤ p < ∞, with 0 < a < Q/p and 0 < b < 4, we derive Lp-HPW uncertainty inequalities and as a consequence, we obtain a refined L2-HPW inequality on K, valid for all a, b > 0, improving upon the earlier result of Atef (2013) which required a, b ≥ 1. Our proofs rely on the Fourier-Laguerre transform, dilation and rescaling invariance, and Hausdorff-Young and Plancherel inequalities, thus avoiding heat kernel methods. These results extend Xiao's Euclidean Lp-HPW uncertainty inequalities (2022) and parallel recent developments on nilpotent Lie groups, thereby providing a complete Lp-framework for uncertainty inequalities on the Laguerre hypergroup.