Noncommutative Heisenberg-Robertson-Schrodinger Uncertainty Principles

Abstract

Let E be a Hilbert C*-module over a unital C*-algebra A. Let A: D(A) ⊂eq E E and B: D(B)⊂eq E E be possibly unbounded self-adjoint morphisms. Then for all x ∈ D(AB) D(BA) with x, x =1, we show that align* (1) x(B)2dx(A)2+ x(A)2dx(B)2≥ ( \A,B\x, x -\ Ax, x , Bx, x \)2-( [A,B]x, x +[ Ax, x , Bx, x ])22 align* and align* (2) x(A) x(B)≥ \|( \A,B\x, x -\ Ax, x , Bx, x \)2-( [A,B]x, x +[ Ax, x , Bx, x ])2\|2, align* where x(A):= \|Ax- Ax, x x \|, dx(A):= Ax, Ax - Ax, x 2, [A,B] := AB-BA, \A,B\:= AB+BA, \ Ax, x , Bx, x \:= Ax, x Bx, x + Bx, x Ax, x , [ Ax, x , Bx, x ]:= Ax, x Bx, x - Bx, x Ax, x . We call Inequalities (1) and (2) as noncommutative Heisenberg-Robertson-Schrodinger uncertainty principles. They reduce to the Heisenberg-Robertson-Schrodinger uncertainty principle (derived by Schrodinger in 1930) whenever A=C.