The cluster complex $\Delta (\Phi)$ is an abstract simplicial complex,
introduced by Fomin and Zelevinsky for a finite root system $\Phi$. The
positive part of $\Delta (\Phi)$ naturally defines a simplicial subdivision of
the simplex on the vertex set of simple roots of $\Phi$. The local $h$-vector
of this subdivision, in the sense of Stanley, is computed and the corresponding
$\gamma$-vector is shown to be nonnegative. Combinatorial interpretations to
the entries of the local $h$-vector and the corresponding $\gamma$-vector are
provided for the classical root systems, in terms of noncrossing partitions of
types $A$ and $B$. An analogous result is given for the barycentric subdivision
of a simplex.Comment: 21 pages, 4 figure

Athanasiadis, Christos A.

Savvidou, Christina

English

arXiv

Digital Repository of Hellenic Managing Authority of the Operational Programme &quot;Education and Lifelong Learning&quot; (EDULLL)

The local h-vector of the clustersubdivision of a simplexChristos A. Athanasiadis - Christina SavvidouUniversity of AthensMarch 26, 2012Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 1 / 30Basic DefinitionsAn abstract simplicial complex is a geometric subdivisionΓ of the simplex 2V if it has a geometric realizationwhich subdivides the simplex.Example:Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 2 / 30Basic DefinitionsA simplicial complex is called flag if every minimalnon-face of Γ has at most two elements.Example of a non-flag subdivision:{a, b, c} is a minimal non-faceHeracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 3 / 30Basic DefinitionsLet fi be the number of the i -dimensional faces of asimplicial complex Γ.f -vector: f (Γ) = (f0, . . . , fd−1)f -polynomial: f (Γ, x) = f0 + f1x + · · ·+ fd−1xd−1Example:f (Γ, x) = 6 + 10x + 5x2Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 4 / 30Basic DefinitionsThe h-vector h(Γ) = (h0, h1, . . . , hd) and the h-polynomialh(Γ, x) = h0 + h1x + · · ·+ hdxd are defined byh(Γ, x) =d∑i=0fi−1x i(1− x)d−i , where f−1 = 0.Example:h(Γ, x) = 1 + 3x + x2Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 5 / 30Basic DefinitionsFor a geometric subdivision Γ of the simplex 2V the localh-polynomial `V (Γ, x) of Γ with respect to V is defined as follows:`V (Γ, x) =d∑i=0`i xi =∑F⊆V(−1)d−|F |h(ΓF , x).Example:`V (Γ, x) = 1 + 3x + x2 − (1 + x)− (1 + x)− 1 + 1 + 1 + 1− 1`V (Γ, x) = x + x2Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 6 / 30Basic DefinitionsTheorem (Stanley)The local h-polynomial `V (Γ, x) has nonnegative and symmetriccoefficients, equivalently `i ≥ 0 and `i = `d−i for every 0 ≤ i ≤ d.Thus the local γ-polynomial ξV (Γ, x) of Γ with respect to V can beuniquely defined by`V (Γ, x) = (1 + x)d ξV(Γ,x(1 + x)2)=bd/2c∑i=0ξixi(1 + x)d−2i .Example:`V (Γ, x) = x + x2 = x(1 + x)⇒ ξV (Γ, x) = xHeracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 7 / 30MotivationConjecture (Athanasiadis)For every flag geometric subdivision Γ of the simplex 2Vwe have ξV (Γ) ≥ 0.Its validity implies the validity of Gal’s Conjectureand the monotonicity property for the γ-vector.It is proven in dimension 3 and for iterated edgesubdivisions.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 8 / 30Main ResultsFor every root system Φ the local γ-vector ofthe cluster subdivision Γ(Φ) is nonnegative.Combinatorial interpretations to the entriesof the local γ-vector of the barycentricsubdivision.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 9 / 30Cluster SubdivisionGiven a root system Φ, the cluster complex ∆(Φ) is a simplicialcomplex on the vertex set Φ≥−1 of almost positive roots, havingfaces defined by a compatibility relation.Example for type A2:Φ = {a1, a2, a1 + a2,−a1,−a2,−a1 − a2} Π = {a1, a2}Φ+ = {a1, a2, a1 + a2} Φ≥−1 = {a1, a2, a1 + a2,−a1,−a2}Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 10 / 30Cluster SubdivisionThe cluster complex of type A2 The cluster complex of type A3The positive cluster complex ∆+(Φ) is the restriction of∆(Φ) on the positive roots Φ+. It naturally defines ageometric subdivision of the simplex, the clustersubdivision Γ(Φ).Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 11 / 30Cluster SubdivisionTheorem (Athanasiadis, Tzanaki)h(∆+(Φ), x) =n∑i=01i + 1(ni)(n − 1i)x i , if Φ = Ann∑i=0(ni)(n − 1i)x i , if Φ = Bn or Cnn∑i=0((ni)(n − 2i)+(n − 2i − 2)(n − 1i))x i , if Φ = DnHeracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 12 / 30Cluster SubdivisionFor the type An the h-polynomial is equal to theNarayana polynomial Cn(x).Cn(x) =1, if n = 11 + x , if n = 21 + 3x + x2, if n = 31 + 6x + 6x2 + x3, if n = 41 + 10x + 20x2 + 10x3 + x4, if n = 51 + 15x + 50x2 + 50x3 + 15x4 + x5, if n = 6The coefficient of x i , 0 ≤ i ≤ n, is the number ofpi ∈ NCA(n) which have n − i blocks.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 13 / 30Cluster SubdivisionLet I be an n-element index set and Π = {ai : i ∈ I}. The localh-polynomial `I (Γ(Φ), x) is given by`I (Γ(Φ), x) =∑J⊆I(−1)|IrJ| h(∆+(ΦJ), x),where ΦJ is the standard parabolic root subsystem of Φcorresponding to J .Example for Φ = A3:3∑i=0`i(A3)xi = C3(x)− C2(x)− C1(x) · C1(x)− C2(x)+C1(x) + C1(x) + C1(x)− C0(x)Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 14 / 30Cluster Subdivision - Type An∑i=0`i (Φ)xi =0, if n = 1x , if n = 2x + x2, if n = 3x + 4x2 + x3, if n = 4x + 8x2 + 8x3 + x4, if n = 5x + 13x2 + 29x3 + 13x4 + x5, if n = 6x + 19x2 + 73x3 + 73x4 + 19x5 + x6, if n = 7x + 26x2 + 151x3 + 266x4 + 151x5 + 26x6 + x7, if n = 8bn/2c∑i=0ξi (Φ)xi =0, if n = 1x , if n = 2, 3x + 2x2, if n = 4x + 5x2, if n = 5x + 9x2 + 5x3, if n = 6x + 14x2 + 21x3, if n = 7x + 20x2 + 56x3 + 14x4, if n = 8Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 15 / 30Cluster Subdivision - Type ANested and nonnested singletons in NCA(n):The singleton block {3} is nested, while {7} is nonnested.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 16 / 30Cluster Subdivision - Type APropositionFor the root system Φ of type An the following hold:• `i (Φ) is equal to the number of partitions pi ∈ NCA(n) with i blocks, such that everysingleton block of pi is nested,• ξi (Φ) is equal to the number of partitions pi ∈ NCA(n) which have no singleton blockand a total of i blocks.Moreover, we have the explicit formulasξi (Φ) =0, if i = 01n − i + 1(ni)(n − i − 1i − 1), if 1 ≤ i ≤ bn/2cand`i (Φ) =i∑j=11n − j + 1(nj)(n − j − 1j − 1)(n − 2ji − j)(n − 2ji − j).Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 17 / 30Cluster Subdivision - Type AFor the combinatorial interpretation of the localγ-polynomial given by`V (Γ, x) =bd/2c∑i=0ξixi(1 + x)d−2ian equivalence relation in NCA(n) is defined.Example:{1, 3}, {2}, {4, 5, 6} {1, 3}, {2}, {4, 6}, {5} {1, 2, 3}, {4, 6}, {5} {1, 2, 3}, {4, 5, 6}Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 18 / 30Cluster Subdivision - Type Bn∑i=0`i (Φ)xi =2x , if n = 23x + 3x2, if n = 34x + 14x2 + 4x3, if n = 45x + 35x2 + 35x3 + 5x4, if n = 56x + 69x2 + 146x3 + 69x4 + 6x5, if n = 67x + 119x2 + 427x3 + 427x4 + 119x5 + 7x6, if n = 7bn/2c∑i=0ξi (Φ)xi =2x , if n = 23x , if n = 34x + 6x2, if n = 45x + 20x2, if n = 56x + 45x2 + 20x3, if n = 67x + 84x2 + 105x3, if n = 78x + 140x2 + 336x3 + 70x4, if n = 8The Dynkin diagram for type B is of the formHeracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 19 / 30Cluster Subdivision - Type BPropositionFor the root system Φ of type Bn the following hold:• `i (Φ) is equal to the number of partitions pi ∈ NCB(n) with no zeroblock and i pairs {B,−B} of nonzero blocks, such that every positivesingleton block of pi is nested,• ξi (Φ) is equal to the number of partitions pi ∈ NCB(n) which have nozero block, no singleton block and a total of i pairs {B,−B} of nonzeroblocks.Moreover, we have the explicit formulaξi (Φ) =0, if i = 0(ni)(n − i − 1i − 1), if 1 ≤ i ≤ bn/2c.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 20 / 30Cluster Subdivision - Type Dn∑i=0`i (Φ)xi =2x + 6x2 + 2x3, if n = 43x + 18x2 + 18x3 + 3x4, if n = 54x + 40x2 + 80x3 + 40x4 + 4x5, if n = 65x + 75x2 + 250x3 + 250x4 + 75x5 + 5x6, if n = 7bn/2c∑i=0ξi (Φ)xi =2x + 2x2, if n = 43x + 9x2, if n = 54x + 24x2 + 8x3, if n = 65x + 50x2 + 50x3, if n = 76x + 90x2 + 180x3 + 30x4, if n = 8The Dynkin diagram for type D is of the formHeracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 21 / 30Cluster Subdivision - Type DPropositionFor the root system Φ of type Dn we have`I (Γ(Φ), x) = (n − 2) · xCn−1(x).Moreover, we have the explicit formulas`i (Φ) =0, if i = 0n − 2i(n − 1i − 1)(n − 2i − 1), if 1 ≤ i ≤ nandξi (Φ) =n − 2i(2i − 2i − 1)(n − 22i − 2), for 1 ≤ i ≤ bn/2c.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 22 / 30Cluster SubdivisionFor the exceptional types we havebn/2c∑i=0ξi (Φ)xi =(m − 2)x , if Φ = I2(m)8x , if Φ = H342x + 40x2, if Φ = H410x + 9x2, if Φ = F47x + 35x2 + 13x3, if Φ = E616x + 124x2 + 112x3, if Φ = E744x + 484x2 + 784x3 + 120x4, if Φ = E8.CorollaryFor every root system Φ the local γ-vector ofΓ(Φ) is nonnegative.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 23 / 30Barycentric SubdivisionVertices of sd(2V ): F ⊆ VFaces of sd(2V ): Chains F1 ⊂ F2 ⊂ . . . ⊂ Fn of subsetsof VExample:Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 24 / 30Barycentric SubdivisionTheorem (Stanley)`V (sd(2V ), x) =∑w∈Dnxex(w),where Dn is the set of derangements (permutations withno fixed points) in Sn and ex(w) = |{i : w(i) > i}|.This polynomial, known as the derangement polynomial dn(x) oforder n, has been studied byBrenti (1990)Stembridge (1992)Zhang (1995)Chen, Tang, Zhao (2009).Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 25 / 30Barycentric SubdivisionFor the first few values of n we havedn(x) =x , if n = 2x + x2, if n = 3x + 7x2 + x3, if n = 4x + 21x2 + 21x3 + x4, if n = 5x + 51x2 + 161x3 + 51x4 + x5, if n = 6.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 26 / 30Barycentric SubdivisionTheoremLet (ξ0, ξ1, . . . , ξbn/2c) be the local γ-vector of the barycentricsubdivision sd(2V ) of the (n− 1)-dimensional simplex 2V . Then ξi isequal to each of the following:(i) the number of permutations w ∈ Sn with i runs and no run oflength one,(ii) the number of derangements w ∈ Dn with i excedances andno double excedance,(iii) the number of permutations w ∈ Sn with i descents and nodouble descent, such that every left to right maximum of w isa descent.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 27 / 30Barycentric Subdivisionbn/2c∑i=0ξixi =x , if n = 2, 3x + 5x2, if n = 4x + 18x2, if n = 5x + 47x2 + 61x3, if n = 6For example we have the following permutations in S4with no run of length one1234 13.24 14.2323.14 24.13 34.12.Such permutations have been studied by Gessel.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 28 / 30Open ProblemsA more conceptual proof for the cluster subdivisionof type D in the spirit of those of type A and B .Uniform interpretations for `i(Φ) and ξi(Φ) for alltypes Φ.Real-rootness for the local h-polynomial and thelocal γ-polynomial of the cluster subdivision.The local h-polynomial and the local γ-polynomialof the barycentric subdivision of an arbitrarysubdivision of the simplex.Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 29 / 30Thank you all for your attention!Heracleitus II (68th SLC) The local h-vector of the cluster subdivision March 26, 2012 30 / 30

The local h-vector of the cluster subdivision of a simplex

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The local $h$ -vector of the cluster subdivision of a simplex

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The local hhh-vector of the cluster subdivision of a simplex