http://www.combinatorics.org/ojs/index.php/eljc/issue/feedThe Electronic Journal of Combinatorics2014-11-20T10:43:25+11:00André Kündgenakundgen@csusm.eduOpen Journal Systems<p>The copyright of published papers remains with the authors. We only require your agreement that we publish it, as described in the following publication release agreement:</p><ol><li>This is an agreement between the Electronic Journal of Combinatorics (the "Journal"), and the copyright owner (the "Owner") of a work (the "Work") to be published in the Journal.</li><li>The Owner warrants that s/he has the full power and authority to enter into this Agreement and to grant the rights granted in this Agreement.</li><li>The Owner hereby grants to the Journal a worldwide, irrevocable, royalty free license to publish or distribute the Work, to enter into arrangements with others to publish or distribute the Work, and to archive the Work.</li><li>The Owner agrees that further publication of the Work, with the same or substantially the same content as appears in the Journal, will include an acknowledgement of prior publication in the Journal.</li></ol><p>The Electronic Journal of Combinatorics (E-JC) is a fully-refereed electronic journal with <em>very high standards,</em> publishing papers of substantial content and interest in all branches of discrete mathematics, including combinatorics, graph theory, and algorithms for combinatorial problems. The journal is <em>completely free</em> for both authors and readers. Authors retain the copyright of their articles. Articles published in E-JC are reviewed on MathSciNet and ZBMath, and are indexed by Web of Science. The latest papers are always available by clicking on the tab marked "Current" near the top of the page. You can also locate papers using the search facility on the right hand side of this page.</p><p>E-JC was founded in 1994 by Herbert S. Wilf and Neil Calkin, making it one of the oldest electronic journals.</p>http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p1The Optimal Drawings of $K_{5,n}$2014-10-02T06:05:01+10:00César Hernández-Vélezisrael@ime.usp.brCarolina Medinacmedina@ifisica.uaslp.mxGelasio Salazargsalazar@ifisica.uaslp.mx<p>Zarankiewicz's Conjecture (ZC) states that the crossing number cr$(K_{m,n})$ equals $Z(m,n):=\lfloor{\frac{m}{2}}\rfloor \lfloor{\frac{m-1}{2}}\rfloor \lfloor{\frac{n}{2}}\rfloor \lfloor{\frac{n-1}{2}}\rfloor$. Since Kleitman's verification of ZC for $K_{5,n}$ (from which ZC for $K_{6,n}$ easily follows), very little progress has been made around ZC; the most notable exceptions involve computer-aided results. With the aim of gaining a more profound understanding of this notoriously difficult conjecture, we investigate the <em>optimal</em> (that is, crossing-minimal) drawings of $K_{5,n}$. The widely known natural drawings of $K_{m,n}$ (the so-called <em>Zarankiewicz drawings</em>) with $Z(m,n)$ crossings contain <em>antipodal</em> vertices, that is, pairs of degree-$m$ vertices such that their induced drawing of $K_{m,2}$ has no crossings. Antipodal vertices also play a major role in Kleitman's inductive proof that cr$(K_{5,n}) = Z(5,n)$. We explore in depth the role of antipodal vertices in optimal drawings of $K_{5,n}$, for $n$ even. We prove that if {$n \equiv 2$ (mod $4$)}, then every optimal drawing of $K_{5,n}$ has antipodal vertices. We also exhibit a two-parameter family of optimal drawings $D_{r,s}$ of $K_{5,4(r+s)}$ (for $r,s\ge 0$), with no antipodal vertices, and show that if $n\equiv 0$ (mod $4$), then every optimal drawing of $K_{5,n}$ without antipodal vertices is (vertex rotation) isomorphic to $D_{r,s}$ for some integers $r,s$. As a corollary, we show that if $n$ is even, then every optimal drawing of $K_{5,n}$ is the superimposition of Zarankiewicz drawings with a drawing isomorphic to $D_{r,s}$ for some nonnegative integers $r,s$.</p>2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p2Limits of Boolean Functions on $\mathbb{F}_p^n$2014-10-02T06:05:01+10:00Hamed Hatamihatami@gmail.comPooya Hatamipooyahat@gmail.comJames Hirstjames.hirst@mail.mcgill.ca<p>We study sequences of functions of the form $\mathbb{F}_p^n \to \{0,1\}$ for varying $n$, and define a notion of convergence based on the induced distributions from restricting the functions to a random affine subspace. Using a decomposition theorem and a recently proven equi-distribution theorem from higher order Fourier analysis, we prove that the limits of such convergent sequences can be represented by certain measurable functions. We also show that every such limit object arises as the limit of some sequence of functions. These results are in the spirit of similar results which have been developed for limits of graph sequences. A more general, albeit substantially more sophisticated, limit object was recently constructed by Balázs Szegedy [Gowers norms, regularization and limits of functions on abelian groups. 2010. arXiv:1010.6211].</p>2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p3Permutation Reconstruction from Differences2014-10-02T06:05:01+10:00Marzio De Biasimarziodebiasi@gmail.comWe prove that the problem of reconstructing a permutation $\pi_1,\dotsc,\pi_n$ of the integers $[1\dotso n]$ given the absolute differences $|\pi_{i+1}-\pi_i|$, $i = 1,\dotsc,n-1$ is $\sf{NP}$-complete. As an intermediate step we first prove the $\sf{NP}$-completeness of the decision version of a new puzzle game that we call Crazy Frog Puzzle. The permutation reconstruction from differences is one of the simplest combinatorial problems that have been proved to be computationally intractable.2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p4Isometric Embeddings of Half-Cube Graphs in Half-Spin Grassmannians2014-10-02T06:05:01+10:00Mark Pankovpankov@matman.uwm.edu.plLet $\Pi$ be a polar space of type $\textsf{D}_{n}$. Denote by ${\mathcal G}_{\delta}(\Pi)$, $\delta\in \{+,-\}$ the associated half-spin Grassmannians and write $\Gamma_{\delta}(\Pi)$ for the corresponding half-spin Grassmann graphs. In the case when $n\ge 4$ is even, the apartments of ${\mathcal G}_{\delta}(\Pi)$ will be characterized as the images of isometric embeddings of the half-cube graph $\frac{1}{2}H_n$ in $\Gamma_{\delta}(\Pi)$. As an application, we describe all isometric embeddings of $\Gamma_{\delta}(\Pi)$ in the half-spin Grassmann graphs associated to a polar space of type $\textsf{D}_{n'}$ under the assumption that $n\ge 6$ is even.2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p5An Extension of Turán's Theorem, Uniqueness and Stability2014-10-02T06:05:01+10:00Peter Allenp.d.allen@lse.ac.ukJulia Böttcherj.boettcher@lse.ac.ukJan Hladkýhonzahladky@gmail.comDiana Piguetdiana.piguet@gmail.comWe determine the maximum number of edges of an $n$-vertex graph $G$ with the property that none of its $r$-cliques intersects a fixed set $M\subset V(G)$. For $(r-1)|M|\ge n$, the $(r-1)$-partite Turán graph turns out to be the unique extremal graph. For $(r-1)|M|<n$, there is a whole family of extremal graphs, which we describe explicitly. In addition we provide corresponding stability results.2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p6Coxeter-Knuth Graphs and a Signed Little Map for Type B Reduced Words2014-10-02T06:05:01+10:00Sara Billeybilley@math.washington.eduZachary Hamakerzhamaker@umn.eduAustin Robertsaroberts@highline.eduBenjamin Youngbjy@uoregon.edu<div class="page" title="Page 1"><div class="layoutArea"><div class="column"><p><span>We define an analog of David Little’s algorithm for reduced words in type B, and investigate its main properties. In particular, we show that our algorithm preserves the recording tableau of Kra<span>ś</span>kiewicz insertion, and that it provides a bijective realization of the Type B transition equations in Schubert calculus. Many other aspects of type A theory carry over to this new setting. Our primary tool is a shifted version of the dual equivalence graphs defined by Assaf and further developed by Roberts. We provide an axiomatic characterization of shifted dual equivalence graphs, and use them to prove a structure theorem for the graph of Type B Coxeter-Knuth relations. </span></p></div></div></div>2014-10-02T00:00:00+10:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p7Enumerating Hamiltonian Cycles2014-10-09T12:00:33+11:00Ville H. Petterssonville.pettersson@aalto.fi<p style="-qt-block-indent: 0; text-indent: 0px; -qt-user-state: 0; margin: 0px;">A dynamic programming method for enumerating hamiltonian cycles in arbitrary graphs is presented. The method is applied to grid graphs, king's graphs, triangular grids, and three-dimensional grid graphs, and results are obtained for larger cases than previously published. The approach can easily be modified to enumerate hamiltonian paths and other similar structures.</p>2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p8New Infinite Families of Congruences Modulo 8 for Partitions with Even Parts Distinct2014-10-09T12:00:51+11:00Ernest X. W. XiaErnestxwxia@163.comLet $ped(n)$ denote the number of partitions of an integer $n$ wherein even parts are distinct. Recently, Andrews, Hirschhorn and Sellers, Chen, and Cui and Gu have derived a number of interesting congruences modulo 2, 3 and 4 for $ped(n)$. In this paper we prove several new infinite families of congruences modulo 8 for $ped(n)$. For example, we prove that for $ \alpha \geq 0$ and $n\geq 0$,<br />\[<br /> ped\left(3^{4\alpha+4}n+\frac{11\times 3^{4\alpha+3}-1}{8}\right)\equiv 0 \ ({\rm mod \ 8}).<br />\]2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p9Graph Homomorphisms between Trees2014-10-09T12:01:09+11:00Péter Csikváripeter.csikvari@gmail.comZhicong Linlin@math.univ-lyon1.fr<p>In this paper we study several problems concerning the number of homomorphisms of trees. We begin with an algorithm for the number of homomorphisms from a tree to any graph. By using this algorithm and some transformations on trees, we study various extremal problems about the number of homomorphisms of trees. These applications include a far reaching generalization and a dual of <span>Bollobás</span> and Tyomkyn's result concerning the number of walks in trees.</p><p>Some other main results of the paper are the following. Denote by $\hom(H,G)$ the number of homomorphisms from a graph $H$ to a graph $G$. For any tree $T_m$ on $m$ vertices we give a general lower bound for $\hom(T_m,G)$ by certain entropies of Markov chains defined on the graph $G$. As a particular case, we show that for any graph $G$, <br />$$\exp(H_{\lambda}(G))\lambda^{m-1}\leq\hom(T_m,G),$$ <br />where $\lambda$ is the largest eigenvalue of the adjacency matrix of $G$ and $H_{\lambda}(G)$ is a certain constant depending only on $G$ which we call the spectral entropy of $G$. We also show that if $T_m$ is any fixed tree and<br />$$\hom(T_m,P_n)>\hom(T_m,T_n),$$for some tree $T_n$ on $n$ vertices, then $T_n$ must be the tree obtained from a path $P_{n-1}$ by attaching a pendant vertex to the second vertex of $P_{n-1}$.</p><p>All the results together enable us to show that among all trees with fixed number of vertices, the path graph has the fewest number of endomorphisms while the star graph has the most.</p>2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p10The Range of a Simple Random Walk on $\mathbb{Z}$: An Elementary Combinatorial Approach2014-10-09T12:01:26+11:00Bernhard A. Moserbernhard.moser@scch.at<p>Two different elementary approaches for deriving an explicit formula for the distribution of the range of a simple random walk on $\mathbb{Z}$ of length $n$ are presented. Both of them rely on Hermann Weyl's discrepancy norm, which equals the maximal partial sum of the elements of a sequence. By this the original combinatorial problem on $\mathbb{Z}$ can be turned into a known path-enumeration problem on a bounded lattice. The solution is provided by means of the adjacency matrix $\mathbf Q_d$ of the walk on a bounded lattice $(0,1,\ldots,d)$. The second approach is algebraic in nature, and starts with the adjacency matrix $\mathbf{Q_d}$. The powers of the adjacency matrix are expanded in terms of products of non-commutative left and right shift matrices. The representation of such products by means of the discrepancy norm reveals the solution directly.</p>2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p11Operators of Equivalent Sorting Power and Related Wilf-equivalences2014-10-09T12:01:41+11:00Michael Albertmalbert@cs.otago.ac.nzMathilde Bouvelmathilde.bouvel@math.uzh.chWe study sorting operators $\mathbf{A}$ on permutations that are obtained composing Knuth's stack sorting operator $\mathbf{S}$ and the reversal operator $\mathbf{R}$, as many times as desired. For any such operator $\mathbf{A}$, we provide a size-preserving bijection between the set of permutations sorted by $\mathbf{S} \circ \mathbf{A}$ and the set of those sorted by $\mathbf{S} \circ \mathbf{R} \circ \mathbf{A}$, proving that these sets are enumerated by the same sequence, but also that many classical permutation statistics are equidistributed across these two sets. The description of this family of bijections is based on a bijection between the set of permutations avoiding the pattern $231$ and the set of those avoiding $132$ which preserves many permutation statistics. We also present other properties of this bijection, in particular for finding pairs of Wilf-equivalent permutation classes.<br /><br />2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p12$k$-Fold Sidon Sets2014-10-09T12:01:56+11:00Javier Cilleruelofranciscojavier.cilleruelo@uam.esCraig Timmonsctimmons@ucsd.eduLet $k \geq 1$ be an integer. A set $A \subset \mathbb{Z}$ is a $k$<em>-fold Sidon set </em>if $A$ has only trivial solutions to each equation of the form $c_1 x_1 + c_2 x_2 + c_3 x_3 + c_4 x_4 = 0$ where $0 \leq |c_i | \leq k$, and $c_1 + c_2 + c_3 + c_4 = 0$. We prove that for any integer $k \geq 1$, a $k$-fold Sidon set $A \subset [N]$ has at most $(N/k)^{1/2} + O((Nk)^{1/4})$ elements. Indeed we prove that given any $k$ positive integers $c_1<\cdots <c_k$, any set $A\subset [N]$ that contains only trivial solutions to $c_i(x_1-x_2)=c_j(x_3-x_4)$ for each $1 \le i \le j \le k$, has at most $(N/k)^{1/2}+O((c_k^2N/k)^{1/4})$ elements. On the other hand, for any $k \geq 2$ we can exhibit $k$ positive integers $c_1,\dots, c_k$ and a set $A\subset [N]$ with $|A|\ge (\frac 1k+o(1))N^{1/2}$, such that $A$ has only trivial solutions to $c_i(x_1 - x_2) = c_j (x_3 - x_4)$ for each $1 \le i \le j\le k$.2014-10-09T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p13On Sets with Few Intersection Numbers in Finite Projective and Affine Spaces2014-10-16T10:55:51+11:00Nicola Durantendurante@unina.it<p>In this paper we study sets $X$ of points of both affine and projective spaces over the Galois field $\mathop{\rm{GF}}(q)$ such that every line of the geometry that is neither contained in $X$ nor disjoint from $X$ meets the set $X$ in a constant number of points and we determine all such sets. This study has its main motivation in connection with a recent study of neighbour transitive codes in Johnson graphs by Liebler and Praeger [<em>Designs, Codes and Crypt.</em>, 2014]. We prove that, up to complements, in $\mathop{\rm{PG}}(n,q)$ such a set $X$ is either a subspace or $n=2,q$ is even and $X$ is a maximal arc of degree $m$. In $\mathop{\rm{AG}}(n,q)$ we show that $X$ is either the union of parallel hyperplanes or a cylinder with base a maximal arc of degree $m$ (or the complement of a maximal arc) or a cylinder with base the projection of a quadric. Finally we show that in the affine case there are examples (different from subspaces or their complements) in $\mathop{\rm{AG}}(n,4)$ and in $\mathop{\rm{AG}}(n,16)$ giving new neighbour transitive codes in Johnson graphs.</p>2014-10-16T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p14Mutations of Fake Weighted Projective Spaces2014-10-16T10:58:59+11:00Tom Coatest.coates@imperial.ac.ukSamuel Gonshawsamuel.gonshaw10@imperial.ac.ukAlexander Kasprzyka.m.kasprzyk@imperial.ac.ukNavid Nabijounavid.nabijou09@imperial.ac.ukWe characterise mutations between fake weighted projective spaces, and give explicit formulas for how the weights and multiplicity change under mutation. In particular, we prove that multiplicity-preserving mutations between fake weighted projective spaces are mutations over edges of the corresponding simplices. As an application, we analyse the canonical and terminal fake weighted projective spaces of maximal degree.2014-10-16T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p15The Combinatorial Nullstellensätze Revisited2014-10-16T10:56:28+11:00Pete L. Clarkplclark@gmail.comWe revisit and further explore the celebrated Combinatorial Nullstellensätze of N. Alon in several different directions.2014-10-16T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p16Decomposing Labeled Interval Orders as Pairs of Permutations2014-10-16T10:56:47+11:00Anders Claessonanders.claesson@strath.ac.ukStuart A. Hannahstuart.a.hannah@strath.ac.ukWe introduce ballot matrices, a signed combinatorial structure whose definition naturally follows from the generating function for labeled interval orders. A sign reversing involution on ballot matrices is defined. We show that matrices fixed under this involution are in bijection with labeled interval orders and that they decompose to a pair consisting of a permutation and an inversion table. To fully classify such pairs, results pertaining to the enumeration of permutations having a given set of ascent bottoms are given. This allows for a new formula for the number of labeled interval orders.2014-10-16T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p17Chromatic Bounds on Orbital Chromatic Roots2014-10-23T10:56:39+11:00Dae Hyun Kimdkim3@caltech.eduAlexander H. Munamun@caltech.eduMohamed Omaromar@g.hmc.edu<p><!--StartFragment-->Given a group $G$ of automorphisms of a graph $\Gamma$, the orbital chromatic polynomial $OP_{\Gamma,G}(x)$ is the polynomial whose value at a positive integer $k$ is the number of orbits of $G$ on proper $k$-colorings of $\Gamma.$ Cameron and Kayibi introduced this polynomial as a means of understanding roots of chromatic polynomials. In this light, they posed a problem asking whether the real roots of the orbital chromatic polynomial of any graph are bounded above by the largest real root of its chromatic polynomial. We resolve this problem in a resounding negative by not only constructing a counterexample, but by providing a process for generating families of counterexamples. We additionally begin the program of finding classes of graphs whose orbital chromatic polynomials have real roots bounded above by the largest real root of their chromatic polynomials; in particular establishing this for many outerplanar graphs.<!--EndFragment--></p>2014-10-23T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p18Enumerating Permutations by their Run Structure2014-10-23T10:57:07+11:00Christopher J. Fewsterchris.fewster@york.ac.ukDaniel Siemssensiemssen@dima.unige.it<p style="-qt-block-indent: 0; text-indent: 0px; margin: 0px;">Motivated by a problem in quantum field theory, we study the up and down structure of circular and linear permutations. In particular, we count the length of the (alternating) runs of permutations by representing them as monomials and find that they can always be decomposed into so-called 'atomic' permutations introduced in this work. This decomposition allows us to enumerate the (circular) permutations of a subset of $\mathbb{N}$ by the length of their runs. Furthermore, we rederive, in an elementary way and using the methods developed here, a result due to Kitaev on the enumeration of valleys.</p>2014-10-23T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p19Subset Glauber Dynamics on Graphs, Hypergraphs and Matroids of Bounded Tree-Width2014-10-23T11:00:23+11:00Magnus Bordewichm.j.r.bordewich@durham.ac.ukRoss J. Kangross.kang@gmail.com<p>Motivated by the 'subgraphs world' view of the ferromagnetic Ising model, we analyse the mixing times of Glauber dynamics based on subset expansion expressions for classes of graph, hypergraph and matroid polynomials. With a canonical paths argument, we demonstrate that the chains defined within this framework mix rapidly upon graphs, hypergraphs and matroids of bounded tree-width.</p><p>This extends known results on rapid mixing for the Tutte polynomial, adjacency-rank ($R_2$-)polynomial and interlace polynomial. In particular Glauber dynamics for the $R_2$-polynomial was known to mix rapidly on trees, which led to hope of rapid mixing on a wider class of graphs. We show that Glauber dynamics for a very wide class of polynomials mixes rapidly on graphs of bounded tree-width, including many cases in which the Glauber dynamics does not mix rapidly for all graphs. This demonstrates that rapid mixing on trees or bounded tree-width graphs does not offer strong evidence towards rapid mixing on all graphs.</p>2014-10-23T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p20Schreier Graphs of an Extended Version of the Binary Adding Machine2014-10-30T08:16:29+11:00Daniele D'Angelidangeli@math.tugraz.at<p>In this paper we give a complete classification of the infinite Schreier graphs of an automaton group generated by an extended version of the binary adding machine.</p>2014-10-30T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p21On the Subpartitions of the Ordinary Partitions, II2014-10-30T08:16:43+11:00Byungchan Kimbkim4@seoultech.ac.krEunmi Kimekim67@nims.re.kr<p>In this note, we provide a new proof for the number of partitions of $n$ having subpartitions of length $\ell$ with gap $d$. Moreover, by generalizing the definition of a subpartition, we show what is counted by $q$-expansion</p><p>\[\prod_{n=1}^{\infty} \frac{1}{1-q^n} \sum_{n=0}^{\infty} (-1)^n q^{(an^2 + bn)/2}\]</p><p>and how fast it grows. Moreover, we prove there is a special sign pattern for the coefficients of $q$-expansion</p><p>\[\prod_{n=1}^{\infty} \frac{1}{1-q^n} \left( 1 - 2 \sum_{n=0}^{\infty} (-1)^n q^{(an^2 + bn)/2} \right).\]</p>2014-10-30T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p22Turán Problems on Non-Uniform Hypergraphs2014-10-30T08:17:01+11:00J. Travis Johnstonj.travis.johnston@gmail.comLinyuan Lulu@math.sc.eduA non-uniform hypergraph $H=(V,E)$ consists of a vertex set $V$ and an edge set $E\subseteq 2^V$; the edges in $E$ are not required to all have the same cardinality. The set of all cardinalities of edges in $H$ is denoted by $R(H)$, the set of edge types. For a fixed hypergraph $H$, the Turán density $\pi(H)$ is defined to be $\lim_{n\to\infty}\max_{G_n}h_n(G_n)$, where the maximum is taken over all $H$-free hypergraphs $G_n$ on $n$ vertices satisfying $R(G_n)\subseteq R(H)$, and $h_n(G_n)$, the so called Lubell function, is the expected number of edges in $G_n$ hit by a random full chain. This concept, which generalizes the Turán density of $k$-uniform hypergraphs, is motivated by recent work on extremal poset problems. The details connecting these two areas will be revealed in the end of this paper.<br /><br />Several properties of Turán density, such as supersaturation, blow-up, and suspension, are generalized from uniform hypergraphs to non-uniform hypergraphs. Other questions such as "Which hypergraphs are degenerate?" are more complicated and don't appear to generalize well. In addition, we completely determine the Turán densities of $\{1,2\}$-hypergraphs.2014-10-30T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p23Counting Permutations by Alternating Descents2014-10-30T08:17:17+11:00Ira M. Gesselgessel@brandeis.eduYan Zhuangzhuangy@brandeis.edu<p>We find the exponential generating function for permutations with all valleys even and all peaks odd, and use it to determine the asymptotics for its coefficients, answering a question posed by Liviu Nicolaescu. The generating function can be expressed as the reciprocal of a sum involving Euler numbers: <br />\[<br />\left(1-E_1x+E_{3}\frac{x^{3}}{3!}-E_{4}\frac{x^{4}}{4!}+E_{6}\frac{x^{6}}{6!}-E_{7}\frac{x^{7}}{7!}+\cdots\right)^{-1},<br />\tag{$*$}<br />\]<br />where $\sum_{n=0}^\infty E_n x^n\!/n! = \sec x + \tan x$. We give two proofs of this formula. The first uses a system of differential equations whose solution gives the generating function<br />\begin{equation*}<br />\frac{3\sin\left(\frac{1}{2}x\right)+3\cosh\left(\frac{1}{2}\sqrt{3}x\right)}{3\cos\left(\frac{1}{2}x\right)-\sqrt{3}\sinh\left(\frac{1}{2}\sqrt{3}x\right)},<br />\end{equation*} <br />which we then show is equal to $(*)$. The second proof derives $(*)$ directly from general permutation enumeration techniques, using noncommutative symmetric functions. The generating function $(*)$ is an "alternating" analogue of David and Barton's generating function <br />\[<br />\left(1-x+\frac{x^{3}}{3!}-\frac{x^{4}}{4!}+\frac{x^{6}}{6!}-\frac{x^{7}}{7!}+\cdots\right)^{-1},<br />\]<br />for permutations with no increasing runs of length 3 or more. Our general results give further alternating analogues of permutation enumeration formulas, including results of Chebikin and Remmel.</p>2014-10-30T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p24Some Spectral Properties of Uniform Hypergraphs2014-10-30T08:17:36+11:00Jiang Zhouzhoujiang04113112@163.comLizhu Sunsunlizhu678876@126.comWenzhe Wang690564734@qq.comChangjiang Bubuchangjiang@hrbeu.edu.cnFor a $k$-uniform hypergraph $H$, we obtain some trace formulas for the Laplacian tensor of $H$, which imply that $\sum_{i=1}^nd_i^s$ ($s=1,\ldots,k$) is determined by the Laplacian spectrum of $H$, where $d_1,\ldots,d_n$ is the degree sequence of $H$. Using trace formulas for the Laplacian tensor, we obtain expressions for some coefficients of the Laplacian polynomial of a regular hypergraph. We give some spectral characterizations of odd-bipartite hypergraphs, and give a partial answer to a question posed by Shao et al (2014). We also give some spectral properties of power hypergraphs, and show that a conjecture posed by Hu et al (2013) holds under certain conditons.2014-10-30T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p25Avoiding 7-Circuits in 2-Factors of Cubic Graphs2014-11-06T12:21:25+11:00Robert Lukoťkarobert.lukotka@truni.skLet $G$ be a cyclically $4$-edge-connected cubic graph with girth at least $7$ on $n$ vertices. We show that $G$ has a $2$-factor $F$ such that at least a linear amount of vertices is not in $7$-circuits of $F$. More precisely, there are at least $n/657$ vertices of $G$ that are not in $7$-circuits of $F$. If $G$ is cyclically $6$-edge-connected then the bound can be improved to $n/189$. As a corollary we obtain bounds on the oddness and on the length of the shortest travelling salesman tour in a cyclically $4$-edge-connected ($6$-edge-connected) cubic graph of girth at least $7$.<p style="-qt-paragraph-type: empty; -qt-block-indent: 0; text-indent: 0px; margin: 0px;"> </p>2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p26On $m$-Closed Graphs2014-11-06T12:21:44+11:00Leila Sharifanleila-sharifan@aut.ac.irMasoumeh Javanbakhtmasumehjavanbakht@gmail.comA graph is closed when its vertices have a labeling by $[n]$ such that the binomial edge ideal $J_G$ has a quadratic <span>Gröbner </span>basis with respect to the lexicographic order induced by $x_1 > \ldots > x_n > y_1> \ldots > y_n$. In this paper, we generalize this notion and study the so called $m$-closed graphs. We find equivalent condition to $3$-closed property of an arbitrary tree $T$. Using it, we classify a class of $3$-closed trees. The primary decomposition of this class of graphs is also studied.2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p27Schubert Polynomials and $k$-Schur Functions2014-11-06T12:22:03+11:00Carolina Benedetticarolina@math.msu.eduNantel Bergeronbergeron@mathstat.yorku.caThe main purpose of this paper is to show that the multiplication of a Schubert polynomial of finite type $A$ by a Schur function, which we refer to as Schubert vs. Schur problem, can be understood combinatorially from the multiplication in the space of dual $k$-Schur functions. Using earlier work by the second author, we encode both problems by means of quasisymmetric functions. On the Schubert vs. Schur side, we study the poset given by the Bergeron-Sottile's $r$-Bruhat order, along with certain operators associated to this order. Then, we connect this poset with a graph on dual $k$-Schur functions given by studying the affine grassmannian order of Lam-Lapointe-Morse-Shimozono. Also, we define operators associated to the graph on dual $k$-Schur functions which are analogous to the ones given for the Schubert vs. Schur problem. This is the first step of our more general program of showing combinatorially the positivity of the multiplication of a dual $k$-Schur function by a Schur function.2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p28Integer Decomposition Property of Dilated Polytopes2014-11-06T12:22:22+11:00David A. Coxdacox@amherst.eduChristian Haasehaase@math.fu-berlin.deTakayuki Hibihibi@math.sci.osaka-u.ac.jpAkihiro Higashitaniahigashi@math.kyoto-u.ac.jp<p>An integral convex polytope $\mathcal{P} \subset \mathbb{R}^N$ possesses the integer decomposition property if, for any integer $k > 0$ and for any $\alpha \in k \mathcal{P} \cap \mathbb{Z}^{N}$, there exist $\alpha_{1}, \ldots, \alpha_k \in \mathcal{P} \cap \mathbb{Z}^{N}$ such that $\alpha = \alpha_{1} + \cdots + \alpha_k$. A fundamental question is to determine the integers $k > 0$ for which the dilated polytope $k\mathcal{P}$ possesses the integer decomposition property. In the present paper, combinatorial invariants related to the integer decomposition property of dilated polytopes will be proposed and studied.</p>2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p29A 64-Dimensional Counterexample to Borsuk's Conjecture2014-11-06T12:22:40+11:00Thomas Jenrichthomas.jenrich@gmx.deAndries E. Brouweraeb@cwi.nlBondarenko's 65-dimensional counterexample to Borsuk's conjecture contains a 64-dimensional counterexample. It is a two-distance set of 352 points.2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p30Shattering-Extremal Set Systems of VC Dimension at most 22014-11-06T12:23:03+11:00Tamás Mészárostmeszaros87@gmail.comLajos Rónyailajos@info.ilab.sztaki.hu<p>We say that a set system $\mathcal{F}\subseteq 2^{[n]}$ shatters a given set $S\subseteq [n]$ if $2^S=\{F~\cap~S ~:~F~\in~\mathcal{F}\}$. The Sauer inequality states that in general, a set system $\mathcal{F}$ shatters at least $|\mathcal{F}|$ sets. Here we concentrate on the case of equality. A set system is called shattering-extremal if it shatters exactly $|\mathcal{F}|$ sets. In this paper we characterize shattering-extremal set systems of Vapnik-Chervonenkis dimension $2$ in terms of their inclusion graphs, and as a corollary we answer an open question about leaving out elements from shattering-extremal set systems in the case of families of Vapnik-Chervonenkis dimension $2$.</p>2014-11-06T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p31Kauffman's Clock Lattice as a Graph of Perfect Matchings: a Formula for its Height2014-11-13T09:55:55+11:00Moshe Cohenmcohen@tx.technion.ac.ilMina Teicherteicher@macs.biu.ac.il<p>We give an algorithmic computation for the height of Kauffman's clock lattice obtained from a knot diagram with two adjacent regions starred and without crossing information specified. We show that this lattice is more familiarly the graph of perfect matchings of a bipartite graph obtained from the knot diagram by overlaying the two dual Tait graphs of the knot diagram. Furthermore we prove structural properties of the bipartite graph in general. This setting also makes evident applications to Chebyshev or harmonic knots, whose related bipartite graph is the popular grid graph, and to discrete Morse functions.</p>2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p32An Abstraction of Whitney's Broken Circuit Theorem2014-11-13T09:56:22+11:00Klaus Dohmendohmen@hs-mittweida.deMartin Trinksmartin.trinks@googlemail.comWe establish a broad generalization of Whitney's broken circuit theorem on the chromatic polynomial of a graph to sums of type $\sum_{A\subseteq S} f(A)$ where $S$ is a finite set and $f$ is a mapping from the power set of $S$ into an abelian group. We give applications to the domination polynomial and the subgraph component polynomial of a graph, the chromatic polynomial of a hypergraph, the characteristic polynomial and Crapo's beta invariant of a matroid, and the principle of inclusion-exclusion. Thus, we discover several known and new results in a concise and unified way. As further applications of our main result, we derive a new generalization of the maximums-minimums identity and of a theorem due to Blass and Sagan on the Möbius function of a finite lattice, which generalizes Rota's crosscut theorem. For the classical Möbius function, both Euler's totient function and its Dirichlet inverse, and the reciprocal of the Riemann zeta function we obtain new expansions involving the greatest common divisor resp. least common multiple. We finally establish an even broader generalization of Whitney's broken circuit theorem in the context of convex geometries (antimatroids).2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p33A Combinatorial Approach to Ebert's Hat Game with Many Colors2014-11-13T09:56:35+11:00Uthaipon Tantipongpipatuthaipon@gmail.com<p>This paper proves an optimal strategy for Ebert's hat game with three players and more than two hat colors. In general, for $n$ players and $k$ hat colours, we construct a strategy that is asymptotically optimal as $k\rightarrow \infty$. Computer calculation for particular values of $n$ and $k$ suggests that, as long as $n$ is linear with $k$, the strategy is asymptotically optimal. We conclude by comparing our strategy with the strategy of Lenstra and Seroussi and with the bound of Alon, and suggest our strategy is better when $2k \geq n \geq 7$.</p>2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p34Bruhat Order on Partial Fixed Point Free Involutions2014-11-13T09:57:04+11:00Mahir Bilen Canmcan@tulane.eduYonah Cherniavskyyonahch@ariel.ac.ilTim Twelbeckttwelbec@tulane.eduThe order complex of inclusion poset $PF_n$ of Borel orbit closures in skew-symmetric matrices is investigated. It is shown that $PF_n$ is an EL-shellable poset, and furthermore, its order complex triangulates a ball. The rank-generating function of $PF_n$ is computed and the resulting polynomial is contrasted with the Hasse-Weil zeta function of the variety of skew-symmetric matrices over finite fields.2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p35Structure Coefficients of the Hecke Algebra of $(\mathcal{S}_{2n},\mathcal{B}_n)$2014-11-13T09:57:19+11:00Omar Toutomar.tout@labri.fr<span style="color: #000000;"><span style="color: #000000;">The </span><span style="color: #000000;">Hecke</span><span style="color: #000000;"> algebra of the pair </span><span style="color: #008000;">$(\mathcal{S}_{2n},\mathcal{B}_n)$</span><span style="color: #000000;">, where </span><span style="color: #008000;">$\mathcal{B}_n$</span><span style="color: #000000;"> is the </span><span style="color: #000000;">hyperoctahedral</span><span style="color: #000000;"> subgroup of </span><span style="color: #008000;">$\mathcal{S}_{2n}$</span><span style="color: #000000;">, was introduced by James in 1961. It is a natural analogue of the center of the symmetric group algebra. In this paper, we give a </span><span style="color: #000000;">polynomiality</span><span style="color: #000000;"> property of its structure coefficients. Our main tool is a combinatorial algebra which projects onto the </span><span style="color: #000000;">Hecke</span><span style="color: #000000;"> algebra of </span><span style="color: #008000;">$(\mathcal{S}_{2n},\mathcal{B}_n)$</span><span style="color: #000000;"> for every </span><span style="color: #008000;">$n$</span><span style="color: #000000;">. To build it, by using partial bijections we introduce and study a new class of finite dimensional algebras.</span></span>2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p36On Floors and Ceilings of the $k$-Catalan Arrangement2014-11-13T09:57:35+11:00Marko Thielmarko.thiel@univie.ac.at<p>The set of dominant regions of the $k$-Catalan arrangement of a crystallographic root system $\Phi$ is a well-studied object enumerated by the Fuß-Catalan number $Cat^{(k)}(\Phi)$. It is natural to refine this enumeration by considering floors and ceilings of dominant regions. A conjecture of Armstrong states that counting dominant regions by their number of floors of a certain height gives the same distribution as counting dominant regions by their number of ceilings of the same height. We prove this conjecture using a bijection that provides even more refined enumerative information.</p>2014-11-13T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p37Face-Width of Pfaffian Braces and Polyhex Graphs on Surfaces2014-11-20T10:42:48+11:00Dong Yedye@mtsu.eduHeping Zhangzhanghp@lzu.edu.cn<p><!--StartFragment-->A graph $G$ with a perfect matching is Pfaffian if it admits an orientation $D$ such that every central cycle $C$ (i.e. $C$ is of even size and $G-V(C)$ has a perfect matching) has an odd number of edges oriented in either direction of the cycle. It is known that the number of perfect matchings of a Pfaffian graph can be computed in polynomial time. In this paper, we show that every embedding of a Pfaffian brace (i.e. 2-extendable bipartite graph) on a surface with a positive genus has face-width at most 3. Further, we study Pfaffian cubic braces and obtain a characterization of Pfaffian polyhex graphs: a polyhex graph is Pfaffian if and only if it is either non-bipartite or isomorphic to the cube, or the Heawood graph, or the Cartesian product $C_k\times K_2$ for even integers $k\ge 6$.<br /><br /><br /></p>2014-11-20T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p38The Number of Moves of the Largest Disc in Shortest Paths on Hanoi Graphs2014-11-20T10:43:05+11:00Simon Aumannaumann@math.lmu.deKatharina A.M. Götzkatharina.goetz@dlr.deAndreas M. Hinzhinz@math.lmu.deCiril Petrpetr@iskratel.si<p>In contrast to the widespread interest in the <em>Frame-Stewart conjecture</em> (FSC) about the optimal number of moves in the classical Tower of Hanoi task with more than three pegs, this is the first study of the question of investigating shortest paths in <em>Hanoi graphs</em> $H_p^n$ in a more general setting. Here $p$ stands for the number of pegs and $n$ for the number of discs in the Tower of Hanoi interpretation of these graphs. The analysis depends crucially on the number of <em>largest disc moves</em> (LDMs). The patterns of these LDMs will be coded as binary strings of length $p-1$ assigned to each pair of starting and goal states individually. This will be approached both analytically and numerically. The main theoretical achievement is the existence, at least for all $n\geqslant p(p-2)$, of optimal paths where $p-1$ LDMs are necessary. Numerical results, obtained by an algorithm based on a modified breadth-first search making use of symmetries of the graphs, lead to a couple of conjectures about some cases not covered by our ascertained results. These, in turn, may shed some light on the notoriously open FSC.</p>2014-11-20T00:00:00+11:00http://www.combinatorics.org/ojs/index.php/eljc/article/view/v21i4p39A Slight Improvement to the Colored Bárány's Theorem2014-11-20T10:43:25+11:00Zilin Jiangzilinj@andrew.cmu.eduSuppose $d+1$ absolute continuous probability measures $m_0, \ldots, m_d$ on $\mathbb{R}^d$ are given. In this paper, we prove that there exists a point of $\mathbb{R}^d$ that belongs to the convex hull of $d+1$ points $v_0, \ldots, v_d$ with probability at least $\frac{2d}{(d+1)!(d+1)}$, where each point $v_i$ is sampled independently according to probability measure $m_i$.2014-11-20T00:00:00+11:00