Enumerative combinatorics
Discrete Applied Mathematics - Special volume: combinatorics and theoretical computer science
Riordan arrays and the Abel-Gould identity
Discrete Mathematics
A characterization of inverse relations
Discrete Mathematics - selected papers in honor of Adriano Garsia
A new multidimensional matrix inverse with applications to multiple q-series
Discrete Mathematics - Special issue on selected papers in honor of Henry W. Gould
Recursively defined combinatorial functions: extending Galton's board
Discrete Mathematics
Ultrametrics, Banach's fixed point theorem and the Riordan group
Discrete Applied Mathematics
Two matrix inversions associated with the Hagen-Rothe formula, their q-analogues and applications
Journal of Combinatorial Theory Series A
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The concept of inter-changes of Schauder bases is used to interpret inverse relations for sequences. For a given power series, the interplay between different representations by Schauder bases can result in combinatorial identities, new or known. Local cohomology residues and local duality are used for computations. The viewpoint of Riordan arrays is examined using Schauder bases.