Orthonormal Strichartz inequalities and their applications on abstract measure spaces

Abstract

The main objective of this paper is to extend certain fundamental inequalities from a single function to a family of orthonormal systems. In the first part of the paper, we consider a non-negative, self-adjoint operator L on L2(X,μ), where (X,μ) is a measure space. Under the assumption that the kernel Kit(x,y) of the Schr\"odinger propagator eitL satisfies a uniform L∞-decay estimate of the form equation* x,y∈ X|Kit(x,y)| |t|-n2,\,|t|<T0, for some n≥1, equation* where T0∈(0,+∞], we establish Strichartz estimates for the Schr\"odinger propagator eitL and using a duality principle argument by Frank-Sabin FS, we extend it for a system of infinitely many fermions on L2(X). We also obtain orthonormal Strichartz estimates for a class of dispersive semigroup U(t)=eitφ(L)(L), where φ: R+→ R is a smooth function and ∈ Cc∞([12,2]). As an application of these orthonormal versions of Strichartz estimates, we prove the well-posedness for the Hartree equation in the Schatten spaces. In the next part of the paper, we obtain some new orthonormal Strichartz estimates, which extend prior work of Kenig-Ponce-Vega Kenig-Ponce-Vega for single functions. Using those orthonormal versions of Kenig-Ponce-Vega result, we prove the orthonormal restriction theorem for the Fourier transform on some particular noncompact hypersurface of the form S=\(, φ(): ∈ R)\, where φ satisfies certain growth condition.