Harmonic and Anharmonic Oscillators on the Heisenberg Group

Abstract

Although there is no canonical version of the harmonic oscillator on the Heisenberg group Hn so far, we make a strong case for a particular choice of operator by using the representation theory of the Dynin-Folland group Hn, 2, a 3-step stratified Lie group, whose generic representations act on L2(Hn). Our approach is inspired by the connection between the harmonic oscillator on Rn and the sum of squares in the first stratum of Hn in the sense that we define the harmonic oscillator on Hn as the image of the sub-Laplacian LHn, 2 under the generic unitary irreducible representation π of the Dynin-Folland group which has formal dimension dπ = 1. This approach, more generally, permits us to define a large class of so-called anharmonic oscillators by employing positive Rockland operators on Hn, 2. By using the methods developed in ter Elst and Robinson [tERo], we obtain spectral estimates for the harmonic and anharmonic oscillators on Hn. Moreover, we show that our approach extends to graded SI/Z-groups of central dimension 1, i.e., graded groups which possess unitary irreducible representations which are square-integrable modulo the 1-dimensional center Z(G). The latter part of the article is concerned with spectral multipliers. By combining ter Elst and Robinson's techniques with recent results in [AkRu18], we obtain useful Lp-Lq-estimates for spectral multipliers of the sub-Laplacian LHn, 2 and, in fact more generally, of general Rockland operators on general graded groups. As a by-product, we recover the Sobolev embeddings on graded groups established in [FiRu17], and obtain explicit hypoelliptic heat semigroup estimates.