TOPICS
Search

Göllnitz-Gordon Identities


The first Göllnitz-Gordon identity states that the number of partitions of n in which the minimal difference between parts is at least 2, and at least 4 between even parts, equals the number of partitions of n into parts congruent to 1, 4, or 7 (mod 8). For example, taking n=7, the resulting two sets of partitions are {(7),(6,1),(5,2)} and {(7),(4,1,1,1),(1,1,1,1,1,1,1)}.

The second Göllnitz-Gordon identity states that the number of partitions of n in which the minimal difference between parts is at least 2, the minimal difference between even parts is at least 4, and all parts are greater than 2, equals the number of partitions of n into parts congruent to 3, 4, or 5 (mod 8). For example, taking n=11, the resulting two sets of partitions are {(11),(8,3),(7,4)} and {(11),(5,3,3),(4,4,3)}.

The Göllnitz-Gordon identities are due to H. Göllnitz and were included in his 1961 unpublished honors baccalaureate thesis. However, essentially no one knew about the results until Gordon (1965) independently rediscovered them.

The analytic counterparts of the Göllnitz-Gordon partition identities are the q-series identities

 sum_(n=0)^infty(q^(n^2)(-q;q^2)_n)/((q^2;q^2)_n)=1/((q;q^8)_infty(q^4;q^8)_infty(q^7;q^8)_infty) 
 =1+q+q^2+q^3+2q^4+2q^5+2q^6+3q^7+4q^8+5q^9+...  
sum_(n=0)^infty(q^(n(n+2))(-q;q^2)_n)/((q^2;q^2)_n)=1/((q^3;q^8)_infty(q^4;q^8)_infty(q^5;q^8)_infty) 
 =1+q^3+q^4+q^5+q^6+q^7+2q^8+2q^9+2q^(10)+...

(OEIS A036016 and A036015), where (a;q)_n denotes a q-series and the coefficients give the number of partitions satisfying the corresponding Göllnitz-Gordon identity.

These analytic identities were published by Slater (1952) and predate the partition theorem by a decade. Equation (◇) is number 36 and equation (◇) is number 34 in Slater's list. However, it has recently been discovered by A. Sills that two analytic identities equivalent to the analytic Göllnitz-Gordon identities were recorded by Ramanujan in his lost notebook, and thus that Ramanujan knew these identities more than 30 years before Slater rediscovered them (Andrews and Berndt 2008, p. 37)!


See also

Andrews-Gordon Identity, Göllnitz's Theorem, Rogers-Ramanujan Identities

Portions of this entry contributed by Andrew Sills

Explore with Wolfram|Alpha

References

Andrews, G. E. On the General Rogers-Ramanujan Theorem. Providence, RI: Amer. Math. Soc., 1974.Andrews, G. E. The Theory of Partitions. Cambridge, England: Cambridge University Press, p. 114, 1998.Andrews, G. E. and Berndt, B. C. Ramanujan's Lost Notebook, Part II. New York: Springer, 2008.Göllnitz, H. "Partitionen mit Differenzenbedingungen." J. reine angew. Math. 225, 154-190, 1967.Gordon, B. "Some Continued Fractions of the Rogers-Ramanujan Type." Duke Math. J. 32, 741-748, 1965.Gordon, B. and McIntosh, R. J. "Some Eighth Order Mock Theta Functions." J. London Math. Soc. 62, 321-335, 2000.Mc Laughlin, J.; Sills, A. V.; and Zimmer, P. "Dynamic Survey DS15: Rogers-Ramanujan-Slater Type Identities." Electronic J. Combinatorics, DS15, 1-59, May 31, 2008. http://www.combinatorics.org/Surveys/ds15.pdf.Selberg, A. "Über die Mock-Thetafunktionen siebenter Ordnung." Arch. Math. og Naturvidenskab 41, 3-15, 1938.Slater, L. J. "Further Identities of the Rogers-Ramanujan Type." Proc. London Math. Soc. Ser. 2 54, 147-167, 1952.Sloane, N. J. A. Sequences A036015 and A036016 in "The On-Line Encyclopedia of Integer Sequences."

Referenced on Wolfram|Alpha

Göllnitz-Gordon Identities

Cite this as:

Sills, Andrew and Weisstein, Eric W. "Göllnitz-Gordon Identities." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/Goellnitz-GordonIdentities.html

Subject classifications