Abstract Lower previsions defined on a finite set of gambles can be looked at as points in a finite-dimensional real vector space. Within that vector space, the sets of sure loss avoiding and coherent lower previsions form convex polyhedra. We present procedures for obtaining characterizations of these polyhedra in terms of a minimal, finite number of linear constraints. As compared to the previously known procedure, these procedures are more efficient and much more straightforward. Next, we take a look at a procedure for correcting incoherent lower previsions based on pointwise dominance. This procedure can be formulated as a multi-objective linear program, and the availability of the finite characterizations provide an avenue for making t...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
AbstractWe generalise Walley’s Marginal Extension Theorem to the case of any finite number of condit...
We extend de Finetti's notion of exchangeability to finite and countable sequences of variables, whe...
The standard coherence criterion for lower previsions is expressed using an infinite number of linea...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
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...
Uncertainty models such as sets of desirable gambles and (conditional) lower previsions can be repre...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
AbstractThis paper presents a summary of Peter Walley’s theory of coherent lower previsions. We intr...
The desirable gambles framework offers the most comprehensive foundations for the theory of lower pr...
In this paper we consider some bounds for lower previsions that are either coherent or centered conv...
The thesis begins with a brief summary of linear programming, three methods for solving linear progr...
AbstractWe study the consistency of a number of probability distributions, which are allowed to be i...
We illustrate an approach to uncertain knowledge based on lower conditional probability bounds. We e...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
AbstractWe generalise Walley’s Marginal Extension Theorem to the case of any finite number of condit...
We extend de Finetti's notion of exchangeability to finite and countable sequences of variables, whe...
The standard coherence criterion for lower previsions is expressed using an infinite number of linea...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
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...
Uncertainty models such as sets of desirable gambles and (conditional) lower previsions can be repre...
In this paper we explore relaxations of (Williams) coherent and convex conditional previsions that f...
AbstractThis paper presents a summary of Peter Walley’s theory of coherent lower previsions. We intr...
The desirable gambles framework offers the most comprehensive foundations for the theory of lower pr...
In this paper we consider some bounds for lower previsions that are either coherent or centered conv...
The thesis begins with a brief summary of linear programming, three methods for solving linear progr...
AbstractWe study the consistency of a number of probability distributions, which are allowed to be i...
We illustrate an approach to uncertain knowledge based on lower conditional probability bounds. We e...
Sets of desirable gambles constitute a quite general type of uncertainty model with an interesting g...
AbstractWe generalise Walley’s Marginal Extension Theorem to the case of any finite number of condit...
We extend de Finetti's notion of exchangeability to finite and countable sequences of variables, whe...