Add to ORKGWe investigate the parameterized complexity of finding diverse sets of solutions to three fundamental combinatorial problems, two from the theory of matroids and the third from graph theory. The input to the Weighted Diverse Bases problem consists of a matroid M, a weight function ω:E(M)→N, and integers k ≥ 1, d ≥ 0. The task is to decide if there is a collection of k bases B_1, ..., B_k of M such that the weight of the symmetric difference of any pair of these bases is at least d. This is a diverse variant of the classical matroid base packing problem. The input to the Weighted Diverse Common Independent Sets problem consists of two matroids M₁,M₂ defined on the same ground set E, a weight function ω:E→N, and integers k ≥ 1, d ≥ 0. The tas...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
We present new algebraic approaches for several well-known combinatorial problems, including non-bip...
We investigate the parameterized complexity of finding diverse sets of solutions to three fundamenta...
We initiate the study of the Diverse Pair of (Maximum/ Perfect) Matchings problems which given a gra...
One of the most intriguing unsolved questions of matroid optimization is the characterization of the...
The world is rarely static - many problems need not only be solved once but repeatedly, under changi...
AbstractMatroid theory gives us powerful techniques for understanding combinatorial optimization pro...
Finding a \emph{single} best solution is the most common objective in combinatorial optimization pro...
AbstractIn this paper, we present an algorithm for finding all common bases in two matroids. Our alg...
In this paper, we present an algorithm for finding all common bases in two matroids. Our algorithm l...
Matroid theory gives us powerful techniques for understanding com-binatorial optimization problems a...
We consider different ways of describing a matroid to a Turing machine by listing the members of var...
We present new algebraic approaches for several wellknown combinatorial problems, including non-bipa...
Diversity maximization is a fundamental problem in web search and data mining. For a given dataset S...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
We present new algebraic approaches for several well-known combinatorial problems, including non-bip...
We investigate the parameterized complexity of finding diverse sets of solutions to three fundamenta...
We initiate the study of the Diverse Pair of (Maximum/ Perfect) Matchings problems which given a gra...
One of the most intriguing unsolved questions of matroid optimization is the characterization of the...
The world is rarely static - many problems need not only be solved once but repeatedly, under changi...
AbstractMatroid theory gives us powerful techniques for understanding combinatorial optimization pro...
Finding a \emph{single} best solution is the most common objective in combinatorial optimization pro...
AbstractIn this paper, we present an algorithm for finding all common bases in two matroids. Our alg...
In this paper, we present an algorithm for finding all common bases in two matroids. Our algorithm l...
Matroid theory gives us powerful techniques for understanding com-binatorial optimization problems a...
We consider different ways of describing a matroid to a Turing machine by listing the members of var...
We present new algebraic approaches for several wellknown combinatorial problems, including non-bipa...
Diversity maximization is a fundamental problem in web search and data mining. For a given dataset S...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
In this work, we study the d-Hitting Set and Feedback Vertex Set problems through the paradigm of fi...
We present new algebraic approaches for several well-known combinatorial problems, including non-bip...