AbstractThe elementary manipulation of series together with summations of Gauss, Saalschutz and Dixon are employed to deduce a two-term relation for the hypergeometric function 3F2(1) and a summation formula for the same function, neither of which has previously appeared in the literature. The two-term relation has implications in the calculus of finite differences
AbstractContiguous relations for hypergeometric series contain an enormous amount of hidden informat...
AbstractThe 15 Gauss contiguous relations for 2F1 hypergeometric series imply that any three 2F1 ser...
In 1879, Thomae discussed the relations between two generic hypergeometric 3F2-series with argument ...
AbstractThe elementary manipulation of series together with summations of Gauss, Saalschutz and Dixo...
AbstractIt is pointed out that Exton's “new two-term relation for the F23 hypergeometric function of...
For the hypergeometric function of unit argument F-3(2)(1) we prove the existence and uniqueness of ...
AbstractBy elementary manipulation of series together with summations of Gauss and Saalschütz, Exton...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
We give a new proof of the classical Watson theorem for the summa-tion of a 3F2 hypergeometric serie...
AbstractThe hypergeometric function F12[a1,a2;a3;z] plays an important role in mathematical analysis...
The generalized hypergeometric functions in one and several variables and their natural generalizati...
Transformation formulas for terminating Saalschfitzian hypergeometric series of unit argument p + 1F...
Abstract. Contiguous relations for hypergeometric series contain an enormous amount of hidden inform...
AbstractIn this paper we obtain a new formula for hypergeometric series of two variables. The result...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractContiguous relations for hypergeometric series contain an enormous amount of hidden informat...
AbstractThe 15 Gauss contiguous relations for 2F1 hypergeometric series imply that any three 2F1 ser...
In 1879, Thomae discussed the relations between two generic hypergeometric 3F2-series with argument ...
AbstractThe elementary manipulation of series together with summations of Gauss, Saalschutz and Dixo...
AbstractIt is pointed out that Exton's “new two-term relation for the F23 hypergeometric function of...
For the hypergeometric function of unit argument F-3(2)(1) we prove the existence and uniqueness of ...
AbstractBy elementary manipulation of series together with summations of Gauss and Saalschütz, Exton...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
We give a new proof of the classical Watson theorem for the summa-tion of a 3F2 hypergeometric serie...
AbstractThe hypergeometric function F12[a1,a2;a3;z] plays an important role in mathematical analysis...
The generalized hypergeometric functions in one and several variables and their natural generalizati...
Transformation formulas for terminating Saalschfitzian hypergeometric series of unit argument p + 1F...
Abstract. Contiguous relations for hypergeometric series contain an enormous amount of hidden inform...
AbstractIn this paper we obtain a new formula for hypergeometric series of two variables. The result...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractContiguous relations for hypergeometric series contain an enormous amount of hidden informat...
AbstractThe 15 Gauss contiguous relations for 2F1 hypergeometric series imply that any three 2F1 ser...
In 1879, Thomae discussed the relations between two generic hypergeometric 3F2-series with argument ...
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