1 |
LONG L. Hypergeometric evaluation identities and supercongruences. Pacific Journal of Mathematics, 2011, 249, 405- 418.
|
2 |
SWISHER H. On the supercongruence conjectures of van Hamme. Research in the Mathematical Sciences, 2015, (2): 18.
|
3 |
GU C Y, GUO V J W. A q-analogue of a hypergeometric congruence . Bulletin of the Australian Mathematical Society, 2020, 101, 294- 298.
|
4 |
GUO V J W. Proof of some q-supercongruences modulo the fourth power of a cyclotomic polynomial . Results in Mathematics, 2020, 75, 77.
|
5 |
GUO V J W, SCHLOSSER M J. Some q-supercongruences from transformation formulas for basic hypergeometric series . Constructive Approximation, 2021, 53, 155- 200.
|
6 |
GUO V J W, ZUDILIN W. A q-microscope for supercongruences . Advances in Mathematics, 2019, 346, 329- 358.
|
7 |
LIU J, PETROV F. Congruences on sums of q-binomial coefficients . Advances in Applied Mathematics, 2020, 116, 102003.
|
8 |
TAURASO R. q-Analogs of some congruences involving Catalan numbers . Advances in Applied Mathematics, 2009, 48, 603- 614.
|
9 |
WANG X X, YUE M B. A q-analogue of the (A.2) supercongruence of Van Hamme for any prime $p \equiv 3\, (\bmod \;4)$ . International Journal of Number Theory, 2020, 16 (6): 1325- 1335.
|
10 |
WANG X, YUE M. Some q-supercongruences from Watson’s ${}_8{\phi _7}$ transformation formula . Results in Mathematics, 2020, 75, 71.
|
11 |
ZUDILIN W. Congruences for q-binomial coefficients . Annals of Combinatorics, 2019, 23, 1123- 1135.
|
12 |
GASPER G, RAHMAN M. Basic Hypergeometric Series [M]. 2nd ed. Cambridge: Cambridge University Press, 2004.
|