In this thesis we introduce the minimum flow cost Hamiltonian tour problem(FCHT). Given a graph and positive flow between pairs of vertices, the FCHT consists of �finding a Hamiltonian cycle that minimizes the total cost for sending flows between pairs of vertices thorough the shortest path on the cycle. We prove that the FCHT belongs to the class of NP-hard problems and study the polyhedral structure of its set of feasible solutions. In particular, we present �five di�different MIP formulations which are theoretically and computationally compared. We also develop some approximate and exact solution procedures to solve the FCHT. We present a combinatorial bound and two heuristic procedures: a greedy deterministic method and a greedy randomi...
Abstract: "In this paper we present a graph-theoretic polynomial algorithm which has positive probab...
Copyright © 2002 Elsevier Science B.V. All rights reserved.This paper presents an efficient linear-t...
Dirac\u27s famous theorems states that If G is a graph of order () 3 such that the minimum degree ()...
This article discusses a solution method for Hamilton Problem, which either finds the task's solutio...
The Hamiltonian cycle problem consists of finding a cycle in a given graph that passes through every...
The Hamiltonian cycle problem (HCP) consists of finding a cycle of length N in an N-vertices graph. ...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
AbstractIn this paper a polynomial algorithm called the Minram algorithm is presented which finds a ...
In this paper, we discuss hamiltonian problems for reducible flowgraphs. The main result is finding,...
Given an instance, "Search Problems" require finding a solution or proving that no solutions exist. ...
In the travelling salesman problem we are given a graph. The task of the salesman is to find the sho...
The Minimum Score Separation Problem (MSSP) is a combinatorial problem that has been introduced in J...
This paper studies the asymmetric Hamiltonian p-median problem, which consists of finding p mutually...
Mnohé praktické problémy v doprave môžu byť transformované na problém hľadania hamiltonovskej cesty ...
The study of cycles, flows and paths in graphs is closely related to the development of combinatoria...
Abstract: "In this paper we present a graph-theoretic polynomial algorithm which has positive probab...
Copyright © 2002 Elsevier Science B.V. All rights reserved.This paper presents an efficient linear-t...
Dirac\u27s famous theorems states that If G is a graph of order () 3 such that the minimum degree ()...
This article discusses a solution method for Hamilton Problem, which either finds the task's solutio...
The Hamiltonian cycle problem consists of finding a cycle in a given graph that passes through every...
The Hamiltonian cycle problem (HCP) consists of finding a cycle of length N in an N-vertices graph. ...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
AbstractIn this paper a polynomial algorithm called the Minram algorithm is presented which finds a ...
In this paper, we discuss hamiltonian problems for reducible flowgraphs. The main result is finding,...
Given an instance, "Search Problems" require finding a solution or proving that no solutions exist. ...
In the travelling salesman problem we are given a graph. The task of the salesman is to find the sho...
The Minimum Score Separation Problem (MSSP) is a combinatorial problem that has been introduced in J...
This paper studies the asymmetric Hamiltonian p-median problem, which consists of finding p mutually...
Mnohé praktické problémy v doprave môžu byť transformované na problém hľadania hamiltonovskej cesty ...
The study of cycles, flows and paths in graphs is closely related to the development of combinatoria...
Abstract: "In this paper we present a graph-theoretic polynomial algorithm which has positive probab...
Copyright © 2002 Elsevier Science B.V. All rights reserved.This paper presents an efficient linear-t...
Dirac\u27s famous theorems states that If G is a graph of order () 3 such that the minimum degree ()...