2 research outputs found
Inferential Moments of Uncertain Multivariable Systems
This article expands the framework of Bayesian inference and provides direct
probabilistic methods for approaching inference tasks that are typically
handled with information theory. We treat Bayesian probability updating as a
random process and uncover intrinsic quantitative features of joint probability
distributions called inferential moments. Inferential moments quantify shape
information about how a prior distribution is expected to update in response to
yet to be obtained information. Further, we quantify the unique probability
distribution whose statistical moments are the inferential moments in question.
We find a power series expansion of the mutual information in terms of
inferential moments, which implies a connection between inferential theoretic
logic and elements of information theory. Of particular interest is the
inferential deviation, which is the expected variation of the probability of
one variable in response to an inferential update of another. We explore two
applications that analyze the inferential deviations of a Bayesian network to
improve decision-making. We implement simple greedy algorithms for exploring
sensor tasking using inferential deviations that generally outperform similar
greedy mutual information algorithms in terms of root mean squared error
between epistemic probability estimates and the ground truth probabilities they
are estimating