ALBERT — All Library Books, journals and Electronic Records Telegrafenberg

1

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Super-Greedy Linear Extensions of Ordered Sets (1989)

KIERSTEAD, H. A. ; TROTTER, W. T.

Oxford, UK : Blackwell Publishing Ltd

Annals of the New York Academy of Sciences 555 (1989), S. 0

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ISSN: 1749-6632

Source: Blackwell Publishing Journal Backfiles 1879-2005

Topics: Natural Sciences in General

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1111/j.1749-6632.1989.tb22460.x

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2

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The number of different distances determined by a set of points in the Euclidean plane (1992)

Chung, Fan R. K. ; Szemerédi, E. ; Trotter, W. T.

Springer

Discrete & computational geometry 7 (1992), S. 1-11

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ISSN: 1432-0444

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract In 1946 P. Erdös posed the problem of determining the minimum numberd(n) of different distances determined by a set ofn points in the Euclidean plane. Erdös provedd(n) ≥cn 1/2 and conjectured thatd(n)≥cn/ √logn. If true, this inequality is best possible as is shown by the lattice points in the plane. We showd(n)≥n 4/5/(logn) c .

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02187820

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3

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Large regular graphs with no induced 2K 2 (1992)

Paoli, Madeleine ; Peck, G. W. ; Trotter, W. T. ; [et al.]

Springer

Graphs and combinatorics 8 (1992), S. 165-197

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ISSN: 1435-5914

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract Letr be a positive integer. Considerr-regular graphs in which no induced subgraph on four vertices is an independent pair of edges. The numberv of vertices in such a graph does not exceed 5r/2; this proves a conjecture of Bermond. More generally, it is conjectured that ifv〉2r, then the ratiov/r must be a rational number of the form 2+1/(2k). This is proved forv/r≥21/10. The extremal graphs and many other classes of these graphs are described and characterized.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02350634

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4

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Angle orders (1985)

Fishburn, P. C. ; Trotter, W. T.

Springer

Order 1 (1985), S. 333-343

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ISSN: 1572-9273

Keywords: Primary 06A10 ; secondary 06B05 ; 05A05 ; Partial order ; angle order ; interval order ; poset dimension

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A finite poset is an angle order if its points can be mapped into angular regions in the plane so thatx precedesy in the poset precisely when the region forx is properly included in the region fory. We show that all posets of dimension four or less are angle orders, all interval orders are angle orders, and that some angle orders must have an angular region less than 180° (or more than 180°). The latter result is used to prove that there are posets that are not angle orders. The smallest verified poset that is not an angle order has 198 points. We suspect that the minimum is around 30 points. Other open problems are noted, including whether there are dimension-5 posets that are not angle orders.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00582739

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5

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The dimension of cycle-free orders (1992)

Kierstead, H. A. ; Trotter, W. T. ; Qin, Jun

Springer

Order 9 (1992), S. 103-110

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ISSN: 1572-9273

Keywords: 06Axx ; Dimension ; interval order ; cycle-free order ; ordered sets

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract The existence of a four-dimensional cycle-free order is proved. This answers a question of Ma and Spinrad. Two similar problems are also discussed.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00814403

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6

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Regressions and monotone chains II: The poset of integer intervals (1987)

Alon, Noga ; Trotter, W. T. ; West, Douglas B.

Springer

Order 4 (1987), S. 155-164

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ISSN: 1572-9273

Keywords: 05C55 ; 06A10 ; 62J ; Regressions ; Ramsey theory

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A regressive function (also called a regression or contractive mapping) on a partial order P is a function σ mapping P to itself such that σ(x)≤x. A monotone k-chain for σ is a k-chain on which σ is order-preserving; i.e., a chain x 1〈...〈xksuch that σ(x 1)≤...≤σ(xk). Let P nbe the poset of integer intervals {i, i+1, ..., m} contained in {1, 2, ..., n}, ordered by inclusion. Let f(k) be the least value of n such that every regression on P nhas a monotone k+1-chain, let t(x,j) be defined by t(x, 0)=1 and t(x,j)=x t(x,j−1). Then f(k) exists for all k (originally proved by D. White), and t(2,k) 〈 f(K) 〈t(е + εk, k) , where εk → 0 as k→∞. Alternatively, the largest k such that every regression on P nis guaranteed to have a monotone k-chain lies between lg*(n) and lg*(n)−2, inclusive, where lg*(n) is the number of appliations of logarithm base 2 required to reduce n to a negative number. Analogous results hold for choice functions, which are regressions in which every element is mapped to a minimal element.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00337694

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7

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Representing an ordered set as the intersection of super greedy linear extensions (1987)

Kierstead, H. A. ; Trotter, W. T. ; Zhou, B.

Springer

Order 4 (1987), S. 293-311

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ISSN: 1572-9273

Keywords: 06A05 ; Ordered sets ; linear extensions ; super greedy dimensions

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A linear extension [x 1〈x2〈...〈xt] of a finite ordered set P=(P, 〈) is super greedy if it can be obtained using the following procedure: Choose x 1 to be a minimal element of P; suppose x 1,...,x i have been chosen; define p(x) to be the largest j≤i such that x j〈x if such a j exists and 0 otherwise; choose x i+1 to be a minimal element of P-{ x 1,...,x i} which maximizes p. Every finite ordered set P can be represented as the intersection of a family of super greedy linear extensions, called a super greedy realizer of P. The super greedy dimension of P is the minimum cardinality of a super greedy realizer of P. Best possible upper bounds for the super greedy dimension of P are derived in terms of |P-A| and width (P-A), where A is a maximal antichain.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00337892

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8

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Explicit matchings in the middle levels of the Boolean lattice (1988)

Kierstead, H. A. ; Trotter, W. T.

Springer

Order 5 (1988), S. 163-171

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ISSN: 1572-9273

Keywords: 05C45 ; 05C70 ; 06A10 ; Boolean lattice ; Hamiltonian cycle ; matching

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract New classes of explicit matchings for the bipartite graph ℬ(k) consisting of the middle two levels of the Boolean lattice on 2k+1 elements are constructed and counted. This research is part of an ongoing effort to show that ℬ(k) is Hamiltonian.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00337621

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9

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Balancing pairs and the cross product conjecture (1995)

Brightwell, G. R. ; Felsner, S. ; Trotter, W. T.

Springer

Order 12 (1995), S. 327-349

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ISSN: 1572-9273

Keywords: 06A07 ; 06A10 ; Partially ordered set ; linear extension ; balancing pairs ; cross-product conjecture ; Ahlswede-Daykin inequality ; sorting

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract In a finite partially ordered set, Prob (x〉y) denotes the proportion of linear extensions in which elementx appears above elementy. In 1969, S. S. Kislitsyn conjectured that in every finite poset which is not a chain, there exists a pair (x,y) for which 1/3⩽Prob(x〉y)⩽2/3. In 1984, J. Kahn and M. Saks showed that there exists a pair (x,y) with 3/11〈Prob(x〉y)〈8/11, but the full 1/3–2/3 conjecture remains open and has been listed among ORDER's featured unsolved problems for more than 10 years. In this paper, we show that there exists a pair (x,y) for which (5−√5)/10⩽Prob(x〉y)⩽(5+√5)/10. The proof depends on an application of the Ahlswede-Daykin inequality to prove a special case of a conjecture which we call the Cross Product Conjecture. Our proof also requires the full force of the Kahn-Saks approach — in particular, it requires the Alexandrov-Fenchel inequalities for mixed volumes. We extend our result on balancing pairs to a class of countably infinite partially ordered sets where the 1/3–2/3 conjecture isfalse, and our bound is best possible. Finally, we obtain improved bounds for the time required to sort using comparisons in the presence of partial information.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01110378

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10

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Geometric Containment Orders: A Survey (1998)

Fishburn, P. C. ; Trotter, W. T.

Springer

Order 15 (1998), S. 167-182

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ISSN: 1572-9273

Keywords: degrees of freedom ; dimension ; inclusion order

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A partially ordered set (X, ≺) is a geometric containment order of a particular type if there is a mapping from X into similarly shaped objects in a finite-dimensional Euclidean space that preserves ≺ by proper inclusion. This survey describes most of what is presently known about geometric containment orders. Highlighted shapes include angular regions, convex polygons and circles in the plane, and spheres of all dimensions. Containment orders are also related to incidence orders for vertices, edges and faces of graphs, hypergraphs, planar graphs and convex polytopes. Three measures of poset complexity are featured: order dimension, crossing number, and degrees of freedom.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1006110326269

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