Add to ORKGWe study computational complexity theory and define a class of optimization problems called OptP (Optimization Polynomial Time), and we show that TRAVELLING SALESPERSON, KNAPSACK and 0-1 INTEGER LINEAR PROGRAMMING are complete for OptP. OptP is a natural generalization of NP (Nondeterministic Polynomial Time), but while NP only considers problems at the level of their yes/no question, the value of an OptP function is the optimal value of the problem. This approach enables us to show a deeper level of structure in these problems than is possible in NP
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
Complexity theory refers to the asymptotic analysis of problems and algorithms. How efficient is a...
Many important problems in computer science, such as CLIQUE, COLORING, and TRAVELLING SALESPERSON, ...
AbstractWe consider NP-complete optimization problems at the level of computing their optimal value,...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Introduction Chapter 5: NP-completeness 5.1 Introduction In the previous chapter we met two compu...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
Complexity theory refers to the asymptotic analysis of problems and algorithms. How efficient is a...
Many important problems in computer science, such as CLIQUE, COLORING, and TRAVELLING SALESPERSON, ...
AbstractWe consider NP-complete optimization problems at the level of computing their optimal value,...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Recent developments in the theory of computational complexity as applied to combinatorial problems h...
Introduction Chapter 5: NP-completeness 5.1 Introduction In the previous chapter we met two compu...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
Complexity theory refers to the asymptotic analysis of problems and algorithms. How efficient is a...