Normal ordering for deformed boson operators and operator-valued deformed Stirling numbers

The normal ordering formulae for powers of the boson number operator n̂ are extended to deformed bosons. It is found that for the “M-type” deformed bosons, which satisfy aa− qaa = 1, the extension involves a set of deformed Stirling numbers which replace the Stirling numbers occurring in the conventional case. On the other hand, the deformed Stirling numbers which have to be introduced in the case of the “P-type” deformed bosons, which satisfy aa−qaa = q−n̂, are found to depend on the operator n̂. This distinction between the two types of deformed bosons is in harmony with earlier observations made in the context of a study of the extended CampbellBaker-Hausdorff formula. Published in J. Phys. A : Math. Gen. 25 (1992) 2683-2691. Permanent address: Department of Chemistry, Technion Israel Institute of Technology, Haifa 32000, Israel. email: chr09kt@technion. email: [email protected]. 1