AbstractApplying the principle of decomposition of a power series into an odd and an even part to a product of functions, many new products of two hypergeometric functions are obtained. From them new summation theorems are deduced and new relations for the Kelvin functions are obtained
AbstractA transformation formula is given for the generalized hypergeometric function in series of s...
Two theorems on the sums of generalized hypergeometric functions have been established. The theorems...
The object of the present paper is to show that Ramanujan’s two reduction formulas [Entries 24 and 2...
AbstractApplying the principle of decomposition of a power series into an odd and an even part to a ...
AbstractIn this paper we obtain a new formula for hypergeometric series of two variables. The result...
AbstractThe existing list of reducible cases of double hypergeometric functions is supplemented by t...
AbstractA consideration of odd and even terms of hypergeometric series of higher order leads to new ...
AbstractIt is shown that a generalized Kampé de Fériet function whose variables are all equal and wh...
AbstractWe derive summation formulas for generalized hypergeometric series of unit argument, one of ...
In an earlier paper the author has established two theorems on generalized hypergeometric functions....
We deduce an explicit representation for the coefficients in a finite expansion of a certain class o...
This thesis deals with a method of expressing, as infinite products, some special limiting cases of ...
AbstractSummations over the positive integers n of the generalized hypergeometric expressions (±1)np...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
In this paper, we construct four summation formulas for terminating Gauss’ hypergeometric series hav...
AbstractA transformation formula is given for the generalized hypergeometric function in series of s...
Two theorems on the sums of generalized hypergeometric functions have been established. The theorems...
The object of the present paper is to show that Ramanujan’s two reduction formulas [Entries 24 and 2...
AbstractApplying the principle of decomposition of a power series into an odd and an even part to a ...
AbstractIn this paper we obtain a new formula for hypergeometric series of two variables. The result...
AbstractThe existing list of reducible cases of double hypergeometric functions is supplemented by t...
AbstractA consideration of odd and even terms of hypergeometric series of higher order leads to new ...
AbstractIt is shown that a generalized Kampé de Fériet function whose variables are all equal and wh...
AbstractWe derive summation formulas for generalized hypergeometric series of unit argument, one of ...
In an earlier paper the author has established two theorems on generalized hypergeometric functions....
We deduce an explicit representation for the coefficients in a finite expansion of a certain class o...
This thesis deals with a method of expressing, as infinite products, some special limiting cases of ...
AbstractSummations over the positive integers n of the generalized hypergeometric expressions (±1)np...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
In this paper, we construct four summation formulas for terminating Gauss’ hypergeometric series hav...
AbstractA transformation formula is given for the generalized hypergeometric function in series of s...
Two theorems on the sums of generalized hypergeometric functions have been established. The theorems...
The object of the present paper is to show that Ramanujan’s two reduction formulas [Entries 24 and 2...
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