Information and Decision Theoretic Approaches to Problems in Active Diagnosis.

Abstract

In applications such as active learning or disease/fault diagnosis, one often encounters the problem of identifying an unknown object while minimizing the number of ``yes" or ``no" questions (queries) posed about that object. This problem has been commonly referred to as object/entity identification or active diagnosis in the literature. In this thesis, we consider several extensions of this fundamental problem that are motivated by practical considerations in real-world, time-critical identification tasks such as emergency response. First, we consider the problem where the objects are partitioned into groups, and the goal is to identify only the group to which the object belongs. We then consider the case where the cost of identifying an object grows exponentially in the number of queries. To address these problems we show that a standard algorithm for object identification, known as the splitting algorithm or generalized binary search (GBS), may be viewed as a generalization of Shannon-Fano coding. We then extend this result to the group-based and the exponential cost settings, leading to new, improved algorithms. We then study the problem of active diagnosis under persistent query noise. Previous work in this area either assumed that the noise is independent or that the underlying query noise distribution is completely known. We make no such assumptions, and introduce an algorithm that returns a ranked list of objects, such that the expected rank of the true object is optimized. Finally, we study the problem of active diagnosis where multiple objects are present, such as in disease/fault diagnosis. Current algorithms in this area have an exponential time complexity making them slow and intractable. We address this issue by proposing an extension of our rank-based approach to the multiple object scenario, where we optimize the area under the ROC curve of the rank-based output. The AUC criterion allows us to make a simplifying assumption that significantly reduces the complexity of active diagnosis (from exponential to near quadratic), with little or no compromise on the performance quality. Further, we demonstrate the performance of the proposed algorithms through extensive experiments on both synthetic and real world datasets.Ph.D.Electrical Engineering: SystemsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.lib.umich.edu/bitstream/2027.42/91606/1/gowtham_1.pd