Regularity of fractional Schr\"odinger equations and sub-Laplacian multipliers on the Heisenberg group
Abstract
We define functions of the sub-Laplacian on the Heisenberg group Hd as Fourier multipliers. In this setting, we show that the solution u of the free fractional Schr\"odinger equation i∂tu + (-) u = 0, u|t=0 = u0, for any > 0, satisfies the Hardy space estimate that \|u(t,·)\|Hp( Hd) ≤ Cp (1 + t)Q|1/p-1/2|\|(1-) Q|1/p-1/2|u0\|Hp( Hd), with Q = 2d + 2, for all p ∈ (0,∞), and the corresponding estimate with p = ∞ in BMO( Hd). This is done via a general regularity result for parameter dependent sub-Laplacian Fourier multipliers. We prove also that Bessel potential spaces on the Heisenberg group correspond to Sobolev spaces in the same way as in Euclidean space, also for Hardy spaces.
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