AbstractSummations over the positive integers n of the generalized hypergeometric expressions (±1)npFp+1[−n2x2] (x > 0) are derived in closed form. The specialization p = 0, for example, reduces to known results for Schlömilch series. In addition, we record the apparently not readily available sine and cosine transforms of pFp+1[−b2x2] (b > 0), the latter of which is used together with a form of the Poisson summation formula to deduce the aforementioned results
Let p be an odd prime. In 1984, Greene introduced the notion of hypergeometric functions over finite...
AbstractFor a generalized hypergeometric function pFq[z] with positive integral differences between ...
For the purposes of this paper supercongruences are congruences between terminating hypergeometric s...
AbstractSummations over the positive integers n of the generalized hypergeometric expressions (±1)np...
AbstractBy using a form of the Poisson summation formula together with a generalization due to Sriva...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractWe derive summation formulas for generalized hypergeometric series of unit argument, one of ...
AbstractThe possibility of extending to generalized hypergeometric functions a sum rule for confluen...
AbstractA consideration of odd and even terms of hypergeometric series of higher order leads to new ...
AbstractThe existing list of reducible cases of double hypergeometric functions is supplemented by t...
We deduce an explicit representation for the coefficients in a finite expansion of a certain class o...
Two theorems on the sums of generalized hypergeometric functions have been established. The theorems...
AbstractIt is shown that some well-known Padé approximations for a particular form of the Gaussian h...
In an earlier paper the author has established two theorems on generalized hypergeometric functions....
AbstractA general result involving the generalized hypergeometric function is deduced by the element...
Let p be an odd prime. In 1984, Greene introduced the notion of hypergeometric functions over finite...
AbstractFor a generalized hypergeometric function pFq[z] with positive integral differences between ...
For the purposes of this paper supercongruences are congruences between terminating hypergeometric s...
AbstractSummations over the positive integers n of the generalized hypergeometric expressions (±1)np...
AbstractBy using a form of the Poisson summation formula together with a generalization due to Sriva...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractWe derive summation formulas for generalized hypergeometric series of unit argument, one of ...
AbstractThe possibility of extending to generalized hypergeometric functions a sum rule for confluen...
AbstractA consideration of odd and even terms of hypergeometric series of higher order leads to new ...
AbstractThe existing list of reducible cases of double hypergeometric functions is supplemented by t...
We deduce an explicit representation for the coefficients in a finite expansion of a certain class o...
Two theorems on the sums of generalized hypergeometric functions have been established. The theorems...
AbstractIt is shown that some well-known Padé approximations for a particular form of the Gaussian h...
In an earlier paper the author has established two theorems on generalized hypergeometric functions....
AbstractA general result involving the generalized hypergeometric function is deduced by the element...
Let p be an odd prime. In 1984, Greene introduced the notion of hypergeometric functions over finite...
AbstractFor a generalized hypergeometric function pFq[z] with positive integral differences between ...
For the purposes of this paper supercongruences are congruences between terminating hypergeometric s...