This paper introduces mincut ideals of two-terminal networks, which arise in the algebraic analysis of system reliability. We give the definitions and study their algebraic and combinatorial properties in some particular cases. It turns out that some features of the mincut ideals arising from networks such as the Cohen-Macaulay property and the computation of Betti numbers, which are important in tight reliability bounds, have a compact expression for series-parallel networks. This relies on a natural mapping of the structure of such networks into the union and intersection structure of the corresponding ideal
Every coherent system has a monomial ideal associated with it and the knowledge of its multigraded B...
We study various ideals arising in the theory of system reliability. We use ideas from the theory of...
[[abstract]]Evaluating the network reliability is an important topic in the planning, designing, and...
This paper introduces mincut ideals of two-terminal networks, which arise in the algebraic analysis ...
We present a few results on the determination of the two-terminal reliability for recursive families...
In the first part of this thesis we generalise the well-known K-terminal reliability R(G,K) to diffe...
Abstract: The problem that we regard in this paper is known as the multi-state two-terminal reliab...
In this paper we study all-terminal reliability polynomials of networks having the same number of no...
One of the hardest problems in two terminal networks reliability theory is to obtain minimal path o...
Abstract: This paper describes an extension of a classical network reliability problem to the multi-...
One measure of two-terminal network reliability, termed probabilistic connectedness, is the probabil...
The exact calculation of all-terminal reliability is\ud not feasible in large networks. Hence estima...
The exact calculation of all-terminal reliability is not feasible in large networks. Hence estimatio...
Our research aims to investigate the relation between Physical Quantities and Reliabilitythrough the...
The exact calculation of all-terminal reliability is not feasible in large networks. Hence estimatio...
Every coherent system has a monomial ideal associated with it and the knowledge of its multigraded B...
We study various ideals arising in the theory of system reliability. We use ideas from the theory of...
[[abstract]]Evaluating the network reliability is an important topic in the planning, designing, and...
This paper introduces mincut ideals of two-terminal networks, which arise in the algebraic analysis ...
We present a few results on the determination of the two-terminal reliability for recursive families...
In the first part of this thesis we generalise the well-known K-terminal reliability R(G,K) to diffe...
Abstract: The problem that we regard in this paper is known as the multi-state two-terminal reliab...
In this paper we study all-terminal reliability polynomials of networks having the same number of no...
One of the hardest problems in two terminal networks reliability theory is to obtain minimal path o...
Abstract: This paper describes an extension of a classical network reliability problem to the multi-...
One measure of two-terminal network reliability, termed probabilistic connectedness, is the probabil...
The exact calculation of all-terminal reliability is\ud not feasible in large networks. Hence estima...
The exact calculation of all-terminal reliability is not feasible in large networks. Hence estimatio...
Our research aims to investigate the relation between Physical Quantities and Reliabilitythrough the...
The exact calculation of all-terminal reliability is not feasible in large networks. Hence estimatio...
Every coherent system has a monomial ideal associated with it and the knowledge of its multigraded B...
We study various ideals arising in the theory of system reliability. We use ideas from the theory of...
[[abstract]]Evaluating the network reliability is an important topic in the planning, designing, and...