Restriction Theorem and Strichartz estimate for orthonormal functions associated with the Special Hermite Operator
Abstract
Let L be the special Hermite operator on Cn. As a continuation of the recent results in SG, we establish new Strichartz estimates for systems of orthonormal functions associated with general flows of the form e-itφ(L), where φ : R+ R is a smooth function. Our approach relies on restriction estimates for the Fourier-special Hermite transform on the class of surfaces \(λ, μ, )∈ R×N0n×N0n : λ=φ(2||+n)\. We also discuss the endpoint case of the orthonormal Strichartz estimate for the Schr\"odinger propagator e-itL. Furthermore, we generalize restriction estimates for the special Hermite spectral projections in the context of trace ideals (Schatten spaces).
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