PAINLESS NONORTHOGONAL EXPANSIONS

In a Hilbert space H, discrete families of vectors {hj} with the property that f=∑j〈hj‖ f〉hj for every f in H are considered. This expansion formula is obviously true if the family is an orthonormal basis of H, but also can hold in situations where the hj are not mutually orthogonal and are ‘‘overcomplete.’’ The two classes of examples studied here are (i) appropriate sets of Weyl–Heisenberg coherent states, based on certain (non‐Gaussian) fiducial vectors, and (ii) analogous families of affine coherent states. It is believed, that such ‘‘quasiorthogonal expansions’’ will be a useful tool in many areas of theoretical physics and applied mathematics.

[1]  R. Duffin,et al.  A class of nonharmonic Fourier series , 1952 .

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

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

[4]  Irene A. Stegun,et al.  Handbook of Mathematical Functions. , 1966 .

[5]  J. Klauder,et al.  Continuous Representation Theory Using the Affine Group , 1969 .

[6]  V. Bargmann,et al.  On the Completeness of Coherent States , 1971 .

[7]  Steven A. Gaal,et al.  Linear analysis and representation theory , 1973 .

[8]  A. Grossmann,et al.  Proof of completeness of lattice states in the k q representation , 1975 .

[9]  Carl de Boor,et al.  A Practical Guide to Splines , 1978, Applied Mathematical Sciences.

[10]  Mario Bertero,et al.  The Stability of Inverse Problems , 1980 .

[11]  Mario Bertero,et al.  Inverse scattering problems in optics , 1980 .

[12]  Thierry Paul,et al.  Functions analytic on the half‐plane as quantum mechanical states , 1984 .

[13]  A. Grossmann,et al.  DECOMPOSITION OF HARDY FUNCTIONS INTO SQUARE INTEGRABLE WAVELETS OF CONSTANT SHAPE , 1984 .

[14]  J. Klauder,et al.  COHERENT STATES: APPLICATIONS IN PHYSICS AND MATHEMATICAL PHYSICS , 1985 .

[15]  A. Grossmann,et al.  DECOMPOSITION OF FUNCTIONS INTO WAVELETS OF CONSTANT SHAPE, AND RELATED TRANSFORMS , 1985 .

[16]  A. Grossmann,et al.  Transforms associated to square integrable group representations. I. General results , 1985 .

[17]  Y. Meyer,et al.  Ondelettes et bases hilbertiennes. , 1986 .