PROOF OF TWO CONJECTURES ON SUPERCONGRUENCES INVOLVING CENTRAL BINOMIAL COEFFICIENTS
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Publication:5138950
DOI10.1017/S0004972720000118zbMath1472.11013OpenAlexW3006342986WikidataQ123151592 ScholiaQ123151592MaRDI QIDQ5138950
Victor J. W. Guo, Cheng-Yang Gu
Publication date: 4 December 2020
Published in: Bulletin of the Australian Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0004972720000118
Binomial coefficients; factorials; (q)-identities (11B65) Congruences; primitive roots; residue systems (11A07)
Related Items (2)
Congruences concerning generalized central trinomial coefficients ⋮ Proof of a generalization of the (B.2) supercongruence of Van Hamme through a \(q\)-microscope
Cites Work
- Unnamed Item
- On the supercongruence conjectures of van Hamme
- Ramanujan-type supercongruences
- A \(q\)-microscope for supercongruences
- Semi-automated proof of supercongruences on partial sums of hypergeometric series
- Polynomial reduction and supercongruences
- Some new \(q\)-congruences for truncated basic hypergeometric series: even powers
- Common \(q\)-analogues of some different supercongruences
- A refinement of a congruence result by van Hamme and Mortenson
- A $p$-adic supercongruence conjecture of van Hamme
- Some generalizations of a supercongruence of van Hamme
- Supercongruences for polynomial analogs of the Apéry numbers
- $q$-analogues of two supercongruences of Z.-W. Sun
- Some congruences related to a congruence of Van Hamme
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