Gaussians never extremize Strichartz inequalities for hyperbolic paraboloids
Abstract
For = (1, 2, …, d) ∈ Rd let Q() := Σj=1d σj j2 be a quadratic form with signs σj ∈ \1\ not all equal. Let S ⊂ Rd+1 be the hyperbolic paraboloid given by S = \(, τ) ∈ Rd× R \ : \ τ = Q()\. In this note we prove that Gaussians never extremize an Lp(Rd) Lq(Rd+1) Fourier extension inequality associated to this surface.
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