Uncertainty principle and geometry of the infinite Grassmann manifold

Abstract

We study the pairs of projections PIf=If ,\ \ QJf= (J f)\ , \ \ f∈ L2(Rn), where I, J⊂ Rn are sets of finite Lebesgue measure, I, J denote the corresponding characteristic functions and \ , \ denote the Fourier-Plancherel transformation L2(Rn) L2(Rn) and its inverse. These pairs of projections have been widely studied by several authors in connection with the mathematical formulation of Heisenberg's uncertainty principle. Our study is done from a differential geometric point of view. We apply known results on the Finsler geometry of the Grassmann manifold P( H) of a Hilbert space H to establish that there exists a unique minimal geodesic of P( H), which is a curve of the form δ(t)=eitXI,JPIe-itXI,J which joins PI and QJ and has length π/2. As a consequence we obtain that if H is the logarithm of the Fourier-Plancherel map, then \|[H,PI]\| π/2. The spectrum of XI,J is denumerable and symmetric with respect to the origin, it has a smallest positive eigenvalue γ(XI,J) which satisfies (γ(XI,J))=\|PIQJ\|.