Editorial

EDITORIAL

Resumen


IN THIS PAPER WE OBTAIN THE SYMMETRY RELATIONS FOR THE TRANSFORMATION BRACKETS FOR HARMONIC OSCILLATOR FUNCTIONS DEFINED IN PREVIOUS PUBLICATIONS.THESE SYMETRY RELATIONS WERE OBTAINED FROM THE INTERPRETATION OF THE TRANSFORMATION BRACKETS AS MATRICES OF A REPRESENTATION OF THE UNITARY UNIMODULAR GROUP IN TWO DIMENSIONS (SU-). THE DIMENSION OF THESE REPRESENTATIONS IS OBTAINED. WE DISCUSS ALSO CERTAIN SIMPLE SPIN-ORBIT COUPLING AND TENSOR POTENTIALS AND OBTAIN SUM RULES FOR THE COEFFICIENTS APPEARING IN CALCULATIONS WITH THESE TYPES OF FORCES. FINALLY, WE DERIVE CERTAIN RECURSION FORMULAS AND SUM RULES FOR THE COEFFICIENTS B(N-, N-, P) DEFINED PREVIOUSLY.A TABLE OF SUM RULES FOR THE TRANSFORMATION BRACKETS FOR ALL OF FORCES WILL BE AVAILABLE UPON REQUEST.