On certain generalized incomplete gamma functions

Gamma and incomplete Gamma functions, FEL (free electron laser), Hypergeometric and confluent hypergeometric functions, Fractional calculus, Unilateral and bilateral expansions, Chu-Vandermonde theorem.

The foundations of the incomplete statistics recently proposed by Wang is rediscussed in the context of the canonical statistical ensemble. It is found that the incomplete normalization condition, P p q i ¼ 1 (i ¼ 1; . . . ; w), where p i is the probability of a given microstate, is not compatible w

Several asymptotic expansions are given for the generalized incomplete gamma Ž . x infinity, where the real parameter ␣ is allowed to take negative values. In the case b s yi, ) 0, we obtain the expansions of the decomposition functions Ž . Ž . C ␣, x; and S ␣, x; . Closed form expressions are also

We represent the Generalized Incomplete Gamma Function as a sum of Modified Bessel Functions valid for non-integer α. For integer values of α we derive the corresponding limit case. Moreover, we discuss numerical techniques to evaluate this function.