Add to ORKGProceedings of Graph Theory@Georgia Tech, a conference honoring the 50th Birthday of Robin Thomas, May 7-11, 2012 in the Clough Undergraduate Learning Commons.Finite extremal set theory is concerned with the following general problem: Suppose we have a collection F of subsets of an n-element set and we have some restriction on the possible intersection sizes of pairs of sets in F. What is the maximum number of subsets that F can contain? Surprisingly, solutions to various special cases of this problem have deep implications in many other areas, including coding theory, geometry, and computer science. A particular famous example is due to Frankl and Rodl, who solved a 250-dollar problem of Erdos by proving that if n is a multiple of 4 and n/...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractFor every positive integer N, we determine the maximum sizes of collections C and C' of divi...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractFix integers n,r⩾4 and let F denote a family of r-sets of an n-element set. Suppose that for...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractIf m(n, l) denotes the maximum number of subsets of an n-element set such that the intersect...
AbstractLet X be a finite set of n-melements and suppose t ⩾ 0 is an integer. In 1975, P. Erdös aske...
AbstractLet X = [1, n] be a finite set of cardinality n and let F be a family of k-subsets of X. Sup...
Let {A1,...,AN} be a family of subsets of {1, 2,...,n}. For a fixed integer k we assume that keyable...
AbstractLet X be a finite set of n-melements and suppose t ⩾ 0 is an integer. In 1975, P. Erdös aske...
AbstractLet 1⩽r<n be integers and H a family of subsets of an n-element set such that 1⩽ |H∩H1|⩽r ho...
AbstractLet p be a positive integer and let Q be a subset of {0,1,…,p}. Call p sets A1,A2,…,Ap of a ...
AbstractFollowing a conjecture of P. Erdös, we show that if F is a family of k-subsets of and n-set ...
Let b=((24!)!)!, and let P_{n^2+1} denote the set of all primes of the form n^2+1. Let M denote the ...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractFor every positive integer N, we determine the maximum sizes of collections C and C' of divi...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractFix integers n,r⩾4 and let F denote a family of r-sets of an n-element set. Suppose that for...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractIf m(n, l) denotes the maximum number of subsets of an n-element set such that the intersect...
AbstractLet X be a finite set of n-melements and suppose t ⩾ 0 is an integer. In 1975, P. Erdös aske...
AbstractLet X = [1, n] be a finite set of cardinality n and let F be a family of k-subsets of X. Sup...
Let {A1,...,AN} be a family of subsets of {1, 2,...,n}. For a fixed integer k we assume that keyable...
AbstractLet X be a finite set of n-melements and suppose t ⩾ 0 is an integer. In 1975, P. Erdös aske...
AbstractLet 1⩽r<n be integers and H a family of subsets of an n-element set such that 1⩽ |H∩H1|⩽r ho...
AbstractLet p be a positive integer and let Q be a subset of {0,1,…,p}. Call p sets A1,A2,…,Ap of a ...
AbstractFollowing a conjecture of P. Erdös, we show that if F is a family of k-subsets of and n-set ...
Let b=((24!)!)!, and let P_{n^2+1} denote the set of all primes of the form n^2+1. Let M denote the ...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...
AbstractFor every positive integer N, we determine the maximum sizes of collections C and C' of divi...
AbstractThis paper is a survey of open problems and results involving extremal size of collections o...