Properties of the Confluent Hypergeometric Function
نویسندگان
چکیده
منابع مشابه
Properties of the Bivariate Confluent Hypergeometric Function Kind 1 Distribution
The bivariate confluent hypergeometric function kind 1 distribution is defined by the probability density function proportional to x1 1 x2 2 1 F1(α; β; −x1 − x2). In this article, we study several properties of this distribution and derive density functions of X1/X2, X1/(X1 + X2), X1 + X2 and 2 √ X1X2. The density function of 2 √ X1X2 is represented in terms of modified Bessel function of the s...
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I A more general theory will result if in the place of R we employ an abstract normed ring. s We use the symbols =, ... ... in more than one sense. No confusion need arise as tie context makes clear the meaning of each such symbol. It is worth while to mention here that the relation of equality = for E1 as well as for E2 is not an independent primitive idea; for, an equivalent set of postulates...
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ژورنال
عنوان ژورنال: Journal of Mathematics and Physics
سال: 1949
ISSN: 0097-1421
DOI: 10.1002/sapm1949281183