Ugo Boscain, Jean-Paul Gauthier, Francesco Rossi
Published 2010-02-03Version 1
In this paper we provide explicitly the connection between the hypoelliptic heat kernel for some 3-step sub-Riemannian manifolds and the quartic oscillator. We study the left-invariant sub-Riemannian structure on two nilpotent Lie groups, namely the (2,3,4) group (called the Engel group) and the (2,3,5) group (called the Cartan group or the generalized Dido problem). Our main technique is noncommutative Fourier analysis that permits to transform the hypoelliptic heat equation in a one dimensional heat equation with a quartic potential.
Modulation spaces of symbols for representations of nilpotent Lie groups
Uniqueness of solutions to Schrödinger equations on 2-step nilpotent Lie groups
An Alternative Explicit Expression of the Kernel of the One Dimensional Heat Equation with Dirichlet Conditions
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