论文信息 - Mathematical Aspects of the Weyl Correspondence

Mathematical Aspects of the Weyl Correspondence

The Weyl correspondence between classical and quantum observables is rigorously formulated for a linear mechanical system with a finite number of degrees of freedom. A multiplication of functions and a *‐operation are introduced to make the Hilbert space of Lebesgue square‐integrable complex‐valued functions on phase space into a H*‐algebra. The Weyl correspondence is realized as a *‐isomorphism f → W(f) of this H*‐algebra onto the H*‐algebra of Hilbert‐Schmidt operators on the Hilbert space of Lebesgue square‐integrable complex‐valued functions on configuration space. Moreover, the kernel of W(f) is exhibited in terms of a Fourier‐Plancherel transform of f. Elementary properties of the Wigner quasiprobability density function and its characteristic function are deduced and used to obtain these results.

James C. T. Pool | J. Pool

[1] E. Hewitt,et al. Abstract Harmonic Analysis , 1963 .

[2] H. Weyl. The Theory Of Groups And Quantum Mechanics , 1931 .

[3] I. M. Glazman,et al. Theory of linear operators in Hilbert space , 1961 .

[4] I. Segal,et al. Transforms for Operators and Symplectic Automorphisms over a Locally Compact Abelian Group. , 1963 .

[5] Sterling K. Berberian,et al. Introduction to Hilbert Space , 1977 .

[6] J. Klauder,et al. Continuous‐Representation Theory. IV. Structure of a Class of Function Spaces Arising from Quantum Mechanics , 1964 .

[7] C. Mehta. Phase‐Space Formulation of the Dynamics of Canonical Variables , 1964 .

[8] G. Mackey,et al. Mathematical problems of relativistic physics , 1963 .

[9] Raymond J. Seeger,et al. Lectures in Theoretical Physics , 1962 .

[10] J. Neumann. Mathematical Foundations of Quantum Mechanics , 1955 .

[11] D. Kastler. The C*-algebras of a free Boson field , 1965 .

[12] G. Uhlenbeck,et al. Studies in statistical mechanics , 1962 .

[13] S. Berberian. Measure and integration , 1962 .