Callan, D. (2004), "A combinatorial proof of Sun's 'curious' identity" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 4: A05, arXiv:math.CO/0401216, Bibcode:2004math......1216C.
Chu, W.; Claudio, L.V.D. (2003), "Jensen proof of a curious binomial identity" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 3: A20.
Ekhad, S. B.; Mohammed, M. (2003), "A WZ proof of a 'curious' identity" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 3: A06.
Merlini, D.; Sprugnoli, R. (2002), "A Riordan array proof of a curious identity" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 2: A08.
Panholzer, A.; Prodinger, H. (2002), "A generating functions proof of a curious identity" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 2: A06.
Sun, Zhi-Wei (2002), "A curious identity involving binomial coefficients" (PDF), INTEGERS: The Electronic Journal of Combinatorial Number Theory, 2: A04.
Sun, Zhi-Wei (2008), "On sums of binomial coefficients and their applications", Discrete Mathematics, 308 (18): 4231–4245, arXiv:math.NT/0404385, doi:10.1016/j.disc.2007.08.046, S2CID 14089498.
April 11, 2024
curious, identity, combinatorics, following, identity, involving, binomial, coefficients, first, established, 2002, displaystyle, dbinom, dbinom, dbinom, dbinom, proofs, editafter, publication, this, identity, 2002, five, other, proofs, were, obtained, various. In combinatorics Sun s curious identity is the following identity involving binomial coefficients first established by Zhi Wei Sun in 2002 x m 1 i 0m 1 i x y im i y 2ii i 0m x im i 4 i x m xm displaystyle x m 1 sum i 0 m 1 i dbinom x y i m i dbinom y 2i i sum i 0 m dbinom x i m i 4 i x m dbinom x m Proofs editAfter Sun s publication of this identity in 2002 five other proofs were obtained by various mathematicians Panholzer and Prodinger s proof via generating functions Merlini and Sprugnoli s proof using Riordan arrays Ekhad and Mohammed s proof by the WZ method Chu and Claudio s proof with the help of Jensen s formula Callan s combinatorial proof involving dominos and colorings References editCallan D 2004 A combinatorial proof of Sun s curious identity PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 4 A05 arXiv math CO 0401216 Bibcode 2004math 1216C Chu W Claudio L V D 2003 Jensen proof of a curious binomial identity PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 3 A20 Ekhad S B Mohammed M 2003 A WZ proof of a curious identity PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 3 A06 Merlini D Sprugnoli R 2002 A Riordan array proof of a curious identity PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 2 A08 Panholzer A Prodinger H 2002 A generating functions proof of a curious identity PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 2 A06 Sun Zhi Wei 2002 A curious identity involving binomial coefficients PDF INTEGERS The Electronic Journal of Combinatorial Number Theory 2 A04 Sun Zhi Wei 2008 On sums of binomial coefficients and their applications Discrete Mathematics 308 18 4231 4245 arXiv math NT 0404385 doi 10 1016 j disc 2007 08 046 S2CID 14089498 Retrieved from https en wikipedia org w index php title Sun 27s curious identity amp oldid 1202328425, wikipedia, wiki, book, books, library,
