The standard coherence criterion for lower previsions is expressed using an infinite number of linear constraints. For lower previsions that are essentially defined on some finite set of gambles on a finite possibility space, we present a reformulation of this criterion that only uses a finite number of constraints. Any such lower prevision is coherent if it lies within the convex polytope defined by these constraints. The vertices of this polytope are the extreme coherent lower previsions for the given set of gambles. Our reformulation makes it possible to compute them. We show how this is done and illustrate the procedure and its results
We generalise Cozman’s concept of a credal network under epistemic irrelevance (2000) to the case wh...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
We investigate the problem of outer approximating a coherent lower probability with a more tractable...
The standard coherence criterion for lower previsions is expressed using an infinite number of linea...
Abstract Lower previsions defined on a finite set of gambles can be looked at as points in a finite-...
The criteria that characterize many interesting classes of lower previsions, such as coherent or k-m...
Several consistency notions are available for a lower prevision assessed on a set of gambles (bounde...
AbstractThis paper presents a summary of Peter Walley’s theory of coherent lower previsions. We intr...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
In this paper we consider some bounds for lower previsions that are either coherent or centered conv...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
We consider lower probabilities on finite possibility spaces as models for the uncertainty about the...
AbstractWe generalise Walley’s Marginal Extension Theorem to the case of any finite number of condit...
Uncertainty models such as sets of desirable gambles and (conditional) lower previsions can be repre...
The desirable gambles framework offers the most comprehensive foundations for the theory of lower pr...
We generalise Cozman’s concept of a credal network under epistemic irrelevance (2000) to the case wh...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
We investigate the problem of outer approximating a coherent lower probability with a more tractable...
The standard coherence criterion for lower previsions is expressed using an infinite number of linea...
Abstract Lower previsions defined on a finite set of gambles can be looked at as points in a finite-...
The criteria that characterize many interesting classes of lower previsions, such as coherent or k-m...
Several consistency notions are available for a lower prevision assessed on a set of gambles (bounde...
AbstractThis paper presents a summary of Peter Walley’s theory of coherent lower previsions. We intr...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
In this paper we consider some bounds for lower previsions that are either coherent or centered conv...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
We consider lower probabilities on finite possibility spaces as models for the uncertainty about the...
AbstractWe generalise Walley’s Marginal Extension Theorem to the case of any finite number of condit...
Uncertainty models such as sets of desirable gambles and (conditional) lower previsions can be repre...
The desirable gambles framework offers the most comprehensive foundations for the theory of lower pr...
We generalise Cozman’s concept of a credal network under epistemic irrelevance (2000) to the case wh...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
We investigate the problem of outer approximating a coherent lower probability with a more tractable...