AbstractThe quasi-greedy algorithm, as proposed by Glover and Klingman [8], efficiently solves minimum weight spanning tree problems with a fixed (or bounded) number of edges incident to a specified vertex. As observed in [8], the results carry through to general matroid problems (where a base contains a bounded number of elements from a specified set). We extend this work to provide an efficient 2-quasi-greedy algorithm where a minimum weight base is constrained to have a fixed number of elements from two disjoint sets.Our main results show that optimal bases for adjacent states may not themselves be adjacent. However, optimal solutions for adjacent states may be identified solely from information available in the current base, yielding a ...
AbstractThose independence systems on finite partially ordered sets are characterized for which the ...
AbstractThe Greedy Algorithm selects heaviest sets from a collection of subsets. Traditionally, it i...
We revisit fundamental problems in undirected and directed graphs, such as the problems of computing...
AbstractThe quasi-greedy algorithm, as proposed by Glover and Klingman [8], efficiently solves minim...
AbstractPerhaps the best known algorithm in combinatorial optimization is the greedy algorithm. A na...
Whereas there are simple algorithms that are proven to be optimal for the Classical and the Multiple...
AbstractWe establish a necessary and sufficient condition for a greedy algorithm to find an optimal ...
AbstractWe study the structure of the minimum weight base of a matroid M = (E, I) the order of whose...
Greedy algorithms are used in solving a diverse set of problems in small computation time. However, ...
You provide us with a matroid and an initial base. We say that a subset of the bases "belongs to us"...
You provide us with a matroid and an initial base. We say that a subset of the bases "belongs to us"...
AbstractLet S be a finite set and M= (S, B) be a matroid where B is the set of its bases. We say tha...
AbstractIt is well known that the problem of finding a maximum-weight base of matroid can be solved ...
Given two matroids ?? = (V, ??) and ?? = (V, ??) over an n-element integer-weighted ground set V, th...
One of the most intriguing unsolved questions of matroid optimization is the characterization of the...
AbstractThose independence systems on finite partially ordered sets are characterized for which the ...
AbstractThe Greedy Algorithm selects heaviest sets from a collection of subsets. Traditionally, it i...
We revisit fundamental problems in undirected and directed graphs, such as the problems of computing...
AbstractThe quasi-greedy algorithm, as proposed by Glover and Klingman [8], efficiently solves minim...
AbstractPerhaps the best known algorithm in combinatorial optimization is the greedy algorithm. A na...
Whereas there are simple algorithms that are proven to be optimal for the Classical and the Multiple...
AbstractWe establish a necessary and sufficient condition for a greedy algorithm to find an optimal ...
AbstractWe study the structure of the minimum weight base of a matroid M = (E, I) the order of whose...
Greedy algorithms are used in solving a diverse set of problems in small computation time. However, ...
You provide us with a matroid and an initial base. We say that a subset of the bases "belongs to us"...
You provide us with a matroid and an initial base. We say that a subset of the bases "belongs to us"...
AbstractLet S be a finite set and M= (S, B) be a matroid where B is the set of its bases. We say tha...
AbstractIt is well known that the problem of finding a maximum-weight base of matroid can be solved ...
Given two matroids ?? = (V, ??) and ?? = (V, ??) over an n-element integer-weighted ground set V, th...
One of the most intriguing unsolved questions of matroid optimization is the characterization of the...
AbstractThose independence systems on finite partially ordered sets are characterized for which the ...
AbstractThe Greedy Algorithm selects heaviest sets from a collection of subsets. Traditionally, it i...
We revisit fundamental problems in undirected and directed graphs, such as the problems of computing...