Half Riordan array sequences
DOI10.1016/j.laa.2020.06.019zbMath1453.05008OpenAlexW3037464685MaRDI QIDQ2197207
Publication date: 28 August 2020
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.laa.2020.06.019
Riordan arrayRiordan group\(A\)-sequence\(Z\)-sequence\(B\)-sequencehalf Riordan arrayshitting time Riordan array
Exact enumeration problems, generating functions (05A15) Combinatorial identities, bijective combinatorics (05A19) Permutations, words, matrices (05A05) Special sequences and polynomials (11B83) Matrices of integers (15B36) Linear equations (linear algebraic aspects) (15A06)
Related Items (9)
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Cites Work
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- Matrix characterizations of Riordan arrays
- Lagrange inversion: when and how
- Central Delannoy numbers and balanced Cohen-Macaulay complexes
- An identity of Andrews and a new method for the Riordan array proof of combinatorial identities
- Riordan group involutions and the \(\varDelta \)-sequence
- Sequence characterization of Riordan arrays
- The Riordan group
- A self-similarity structure generated by king's walk
- The Lucas property of a number array
- Half of a Riordan array and restricted lattice paths
- Bijections and the Riordan group
- Parametric Catalan numbers and Catalan triangles
- \(A\)-sequences, \(Z\)-sequence, and \(B\)-sequences of Riordan matrices
- Palindromes and pseudo-involution multiplication
- On the halves of a Riordan array and their antecedents
- Fuss-Catalan matrices, their weighted sums, and stabilizer subgroups of the Riordan group
- Schröder matrix as inverse of Delannoy matrix
- Why Delannoy numbers?
- A Course in Enumeration
- On Some Alternative Characterizations of Riordan Arrays
- $(m,r)$-central Riordan arrays and their applications
- Catalan Numbers
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