The classical limit of quantum theory

Abstract

For a quantum observable A depending on a parameter we define the notion ``A converges in the classical limit''. The limit is a function on phase space. Convergence is in norm in the sense that A0 is equivalent with A0. The -wise product of convergent observables converges to the product of the limiting phase space functions. -1 times the commutator of suitable observables converges to the Poisson bracket of the limits. For a large class of convergent Hamiltonians the -wise action of the corresponding dynamics converges to the classical Hamiltonian dynamics. The connections with earlier approaches, based on the WKB method, or on Wigner distribution functions, or on the limits of coherent states are reviewed.

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