Many practical problems in almost all scientific and technological disciplines have been classified as computationally hard (NP-hard or even NP-complete). In life sciences, combinatorial optimization problems frequently arise in molecular biology, e.g., genome sequencing; global alignment of multiple genomes; identifying siblings or discovery of dysregulated pathways. In almost all of these problems, there is the need for proving a hypothesis about certain property of an object that can be present if and only if it adopts some particular admissible structure (an NP-certificate) or be absent (no admissible structure), however, none of the standard approaches can discard the hypothesis when no solution can be found, since none can provide a p...
AbstractThe following three problems concerning random graphs can be solved in (logn)O(1)expected ti...
Determining the complexity of the colouring problem on AT-free graphs is one of long-standing open p...
Proof complexity can be a tool for studying the efficiency of algorithms. By proving a single lower ...
Many practical problems in almost all scientific and technological disciplines have been classified ...
It is one of the open problems, whether or not the algorithm for a 3-coloring graph is in polynomial...
In this paper, an algorithm for determining 3-colorability, i.e. the decision problem (YES/NO), in p...
Feige and Kilian showed that finding reasonable approximative solutions to the coloring problem on g...
This paper presents algorithms for five NP-hard problems: the vertex set cover of an undirected grap...
Let G be a 3-colorable graph on n vertices. In this section we design algorithms for approximate col...
conference website http://www.informatik.uni-trier.de/~ley/db/conf/focs/focs97.html ©1997 IEEE.We in...
In the previous week we have seen some algorithms for basic graph problems such as connected compone...
AbstractA goal of research on DNA computing is to solve problems that are beyond the capabilities of...
AbstractWe prove that the Satisfiability (resp. planar Satisfiability) problem is parsimoniously P-t...
AbstractGraph colorability (COL), is a typical constraint satisfaction problem to which phase transi...
We prove that coloring a 3-uniform 2-colorable hypergraph with c colors is NP-hard for any constant ...
AbstractThe following three problems concerning random graphs can be solved in (logn)O(1)expected ti...
Determining the complexity of the colouring problem on AT-free graphs is one of long-standing open p...
Proof complexity can be a tool for studying the efficiency of algorithms. By proving a single lower ...
Many practical problems in almost all scientific and technological disciplines have been classified ...
It is one of the open problems, whether or not the algorithm for a 3-coloring graph is in polynomial...
In this paper, an algorithm for determining 3-colorability, i.e. the decision problem (YES/NO), in p...
Feige and Kilian showed that finding reasonable approximative solutions to the coloring problem on g...
This paper presents algorithms for five NP-hard problems: the vertex set cover of an undirected grap...
Let G be a 3-colorable graph on n vertices. In this section we design algorithms for approximate col...
conference website http://www.informatik.uni-trier.de/~ley/db/conf/focs/focs97.html ©1997 IEEE.We in...
In the previous week we have seen some algorithms for basic graph problems such as connected compone...
AbstractA goal of research on DNA computing is to solve problems that are beyond the capabilities of...
AbstractWe prove that the Satisfiability (resp. planar Satisfiability) problem is parsimoniously P-t...
AbstractGraph colorability (COL), is a typical constraint satisfaction problem to which phase transi...
We prove that coloring a 3-uniform 2-colorable hypergraph with c colors is NP-hard for any constant ...
AbstractThe following three problems concerning random graphs can be solved in (logn)O(1)expected ti...
Determining the complexity of the colouring problem on AT-free graphs is one of long-standing open p...
Proof complexity can be a tool for studying the efficiency of algorithms. By proving a single lower ...