Title :
Generalized coherent states for q-oscillator connected with q-Hermite polynomials
Author_Institution :
Dept. of Math., St. Petersburg Univ. of Telecommun., Russia
Abstract :
For the oscillator-like systems, connected with q-Hermite polynomials, coherent states of Barut-Girardello type are defined. The well-known Arik-Coon oscillator naturally arose in the framework of suggested approach as oscillator, connected with the Rogers q-Hermite polynomials, in the same way as usual oscillator with standard Hermite polynomials. The results about the coherent states for discrete q-Hermite polynomials of II type are quite new.
Keywords :
harmonic oscillators; polynomials; Arik-Coon oscillator; Barut-Girardello type; Rogers q-Hermite polynomial; discrete q-Hermite polynomial; generalized coherent state; oscillator-like system; q-oscillator connection; Convergence; Diffraction; Hilbert space; Mathematics; Oscillators; Polynomials; Stress;
Conference_Titel :
Day on Diffraction, 2003. Proceedings. International Seminar
Conference_Location :
Saint Petersburg, Russia
Print_ISBN :
5-94158-070-3
DOI :
10.1109/DD.2003.238130
