Ordering information on distributions (1701.06924v1)

Abstract: This thesis details a class of partial orders on the space of probability distributions and the space of density operators which capture the idea of information content. Some links to domain theory and computational linguistics are also discussed. Chapter 1 details some useful theorems from order theory. In Chapter 2 we define a notion of an information ordering on the space of probability distributions and see that this gives rise to a large class of orderings. In Chapter 3 we extend the idea of an information ordering to the space of density operators and in particular look at the maximum eigenvalue order. We will discuss whether this order might be unique given certain restrictions. In Chapter 4 we discuss a possible application in distributional LLMs, namely in the study of entailment and disambiguation.