Strong time operators associated with generalized Hamiltonians
Abstract
Let the pair of operators, (H, T), satisfy the weak Weyl relation: Te-itH = e-itH(T + t), where H is self-adjoint and T is closed symmetric. Suppose that g is a realvalued Lebesgue measurable function on such that g ∈ C2(R K) for some closed subset K ⊂ with Lebesgue measure zero. Then we can construct a closed symmetric operator D such that (g(H), D) also obeys the weak Weyl relation.
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