ZZ Polynomials for Isomers of (5,6)-Fullerenes Cn with n = 20–50

2020

Symmetry

Self Cite

We present a complete set of closed-form formulas for the ZZ polynomials of five classes of composite Kekuléan benzenoids that can be obtained by overlapping two parallelograms: generalized ribbons Rb, parallelograms M, vertically overlapping parallelograms MvM, horizontally overlapping parallelograms MhM, and intersecting parallelograms MxM. All formulas have the form of multiple sums over binomial coefficients. Three of the formulas are given with a proof based on the interface theory of benzenoids, while the remaining two formulas are presented as conjectures verified via extensive numerical tests. Both of the conjectured formulas have the form of a 2×2 determinant bearing close structural resemblance to analogous formulas for the number of Kekulé structures derived from the John-Sachs theory of Kekulé structures.

Section: Counting Clar Coversmentioning

confidence: 99%

Clar Covers of Overlapping Benzenoids: Case of Two Identically-Oriented Parallelograms

Witek

2020

Symmetry

Self Cite

“…For hexagons, the closed-form ZZ polynomial formulas are readily available when one of the indices is equal to 1, because in this case the hexagonal flake O (1, m, n) reduces to a parallelogram M(m, n). 16,27,40 Closed-form formulas are also available for a few selected fixed values of k and m and arbitrary values of n. (It should be remembered that owing to the high symmetry of O(k, m, n), the discussion below applies to any permutation of the indices k, m, and n.) For (k = 2, m = 2) and (k = 3, m = 3), the closed-form ZZ polynomial formulas were given originally by eqs 35 13) for (k = 3, m = 3)). All the known formulas can be summarized concisely as follows:…”

Section: Introductionmentioning

confidence: 99%

“…No computer program is available to date based on these concepts, but we hope that such a code—enabling one to surpass the limit of 500 carbon atoms in ZZ polynomial calculations for pericondensed benzenoids—will be made available soon. In addition to the obvious brute‐force calculations, ZZDecomposer has been used in numerous applications 15–17,26–37 to find closed‐form formulas of ZZ polynomials for various families of basic catacondensed and pericondensed benzenoids, substantially extending the total body of previously available results 4,9–13,38–43 . The rapid development of the Clar theory stimulated by these discoveries in recent years leads to many new interesting applications and connections to other branches of chemistry, graph theory, and combinatorics 7,8,18,31,41–63 …”

Section: Introductionmentioning

confidence: 99%

Hexagonal flakes as fused parallelograms: A determinantal formula for Zhang‐Zhang polynomials of the O(2, m, n) benzenoids

Witek

2021

J Chinese Chemical Soc

Self Cite

We report a determinantal formula for the Zhang-Zhang polynomial of the hexagonal flake O(2, m, n) applicable to arbitrary values of the structural parameters m and n. The reported equation has been discovered by extensive numerical experimentation and is given here without a proof. Our combinatorial analysis performed on a large collection of isostructural O(2, m, n) benzenoids yielded a ZZ polynomial formula corresponding to the determinant of a certain 2 × 2 matrix referred to by us as the generalized John-Sachs path matrix, because of the striking structural similarity with the original path matrices introduced by the John-Sachs theory of Kekulé structures. The presented conjecture hints at the existence of a generalization of the John-Sachs theory applicable to characterization and enumeration of Clar covers.

“…(See, for example, Properties 1-7 in [3].) Consequently, the ZZ polynomial of an arbitrary benzenoid B or fullerene [36] can be efficiently computed using recursive decomposition algorithms [3,14,37] or determined using interface theory of benzenoids [38][39][40][41]. A useful practical tool for determination of ZZ polynomials is ZZDecomposer [10,37].…”

mentioning

confidence: 99%

Zhang–Zhang Polynomials of Ribbons

Chou

et al. 2020

Symmetry

Self Cite

We report a closed-form formula for the Zhang–Zhang polynomial (also known as ZZ polynomial or Clar covering polynomial) of an important class of elementary peri-condensed benzenoids Rbn1,n2,m1,m2, usually referred to as ribbons. A straightforward derivation is based on the recently developed interface theory of benzenoids [Langner and Witek, MATCH Commun. Math. Comput. Chem.2020, 84, 143–176]. The discovered formula provides compact expressions for various topological invariants of Rbn1,n2,m1,m2: the number of Kekulé structures, the number of Clar covers, its Clar number, and the number of Clar structures. The last two classes of elementary benzenoids, for which closed-form ZZ polynomial formulas remain to be found, are hexagonal flakes Ok,m,n and oblate rectangles Orm,n.