Add to ORKGA pair of simple bivariate inverse series relations are used by embedding machinery to produce several double summation formulae on shifted factorials (or binomial coefficients), including the evaluation due to Blodgett-Gessel [2]. Their $q$-analogues are established in the second section. Some generalized convolutions are presented through formal power series manipulation
AbstractTwo types of q-extensions of Abhyankar's inversion formula for formal power series in a sing...
As an extension of a useful inverse pair due to Gould–Hsu (1973), a gene-ral pair of reciprocal rela...
We establish a new pair of inverse series relations with the connection coefficients being involved ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
Abstract. Formal manipulations of double series are useful in getting some other identities from giv...
[[abstract]]The authors investigate several families of double-series identities as well as their (k...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractA large number of summation and transformation formulas for a certain class of double hyperg...
AbstractA characterization of the two functions f(x,y) and g(x,y) in the (f,g)-inversion is presente...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractThe authors investigate several families of double-series identities as well as their (known...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
AbstractThe q-analogue of Legendre inversions is established and generalized to bilateral sequences....
AbstractTwo types of q-extensions of Abhyankar's inversion formula for formal power series in a sing...
As an extension of a useful inverse pair due to Gould–Hsu (1973), a gene-ral pair of reciprocal rela...
We establish a new pair of inverse series relations with the connection coefficients being involved ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
We deepen here the insight on formal power series. We temporarily abandon formality and consider the...
Abstract. Formal manipulations of double series are useful in getting some other identities from giv...
[[abstract]]The authors investigate several families of double-series identities as well as their (k...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
AbstractA large number of summation and transformation formulas for a certain class of double hyperg...
AbstractA characterization of the two functions f(x,y) and g(x,y) in the (f,g)-inversion is presente...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractThe authors investigate several families of double-series identities as well as their (known...
Abstract. The multiplicate form of Gould–Hsu’s inverse series relations enables to investi-gate the ...
AbstractThis paper gives a brief exposition of several recent results obtained by the authors concer...
AbstractThe q-analogue of Legendre inversions is established and generalized to bilateral sequences....
AbstractTwo types of q-extensions of Abhyankar's inversion formula for formal power series in a sing...
As an extension of a useful inverse pair due to Gould–Hsu (1973), a gene-ral pair of reciprocal rela...
We establish a new pair of inverse series relations with the connection coefficients being involved ...