论文信息 - Large convex cones in hypercubes

Large convex cones in hypercubes

A family of subsets of [n] is positive linear combination free if the characteristic vector of neither member is the positive linear combination of the characteristic vectors of some other ones. We construct a positive linear combination free family which contains (1-o(1))2^n subsets of [n] and we give tight bounds on the o(1)2^n term. The problem was posed by Ahlswede and Khachatrian [Cone dependence-a basic combinatorial concept, Preprint 00-117, Diskrete Strukturen in der Mathematik SFB 343, Universitat Bielefeld, 2000] and the result has geometric consequences.

Zoltán Füredi | Miklós Ruszinkó

[1] Rudolf Ahlswede,et al. Cone Dependence—A Basic Combinatorial Concept , 2003, Des. Codes Cryptogr..

[2] Zoltán Füredi,et al. On induced subgraphs of the cube , 1988, J. Comb. Theory A.

[3] Zoltán Füredi,et al. On the Maximum Size of (p, Q) - free Families , 2001, Electron. Notes Discret. Math..

[4] Zoltán Füredi,et al. A minimal cutset of the boolean lattice with almost all members , 1989, Graphs Comb..

[5] Zoltán Füredi,et al. Sphere coverings of the hypercube with incomparable centers , 1990, Discret. Math..

[6] Alfréd Rényi,et al. Probability Theory , 1970 .