Add to ORKGIn general, constructing a locally-optimal structure is a little harder than constructing an arbitrary structure, but significantly easier than constructing a globally-optimal structure. A similar situation arises in listing. In counting, most problems are #P-complete, but in approximate counting we observe an interesting reversal of the pattern. Assuming that #BIS is not equivalent to #SAT under AP-reductions, we show that counting maximal independent sets in bipartite graphs is harder than counting maximum independent sets. Motivated by this, we show that various counting problems involving minimal separators are #SAT-hard to approximate. These problems have applications for constructing triangulations and phylogenetic trees
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
We study some counting and enumeration problems for chordal graphs, especially concerning independen...
AbstractWe study some counting and enumeration problems for chordal graphs, especially concerning in...
A locally-optimal structure is a combinatorial structure that cannot be improved by certain (greedy)...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
Counting the independent sets of a graph is a classical #P-complete problem, even in the bipartite c...
Constraint satisfactions is a framework to express combinatorial problems. #CSP is the problem of fi...
Finding maximum independent sets in graphs with bounded maximum degree is a well-studied NP-complete...
We investigate the computational complexity of the problem of counting the locally maximal satisfyin...
We investigate the computational complexity of the problem of counting the locally maximal satisfyin...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
We show that a number of graph-theoretic counting problems remain NP-hard, indeed #P-complete, in ve...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
We study some counting and enumeration problems for chordal graphs, especially concerning independen...
AbstractWe study some counting and enumeration problems for chordal graphs, especially concerning in...
A locally-optimal structure is a combinatorial structure that cannot be improved by certain (greedy)...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
Counting the independent sets of a graph is a classical #P-complete problem, even in the bipartite c...
Constraint satisfactions is a framework to express combinatorial problems. #CSP is the problem of fi...
Finding maximum independent sets in graphs with bounded maximum degree is a well-studied NP-complete...
We investigate the computational complexity of the problem of counting the locally maximal satisfyin...
We investigate the computational complexity of the problem of counting the locally maximal satisfyin...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
We show that a number of graph-theoretic counting problems remain NP-hard, indeed #P-complete, in ve...
The problem of (approximately) counting the independent sets of a bipartite graph (#BIS) is the cano...
We study some counting and enumeration problems for chordal graphs, especially concerning independen...
AbstractWe study some counting and enumeration problems for chordal graphs, especially concerning in...