Generalized Fréchet Bounds for Cell Entries in Multidimensional Contingency Tables

Author(s)

Uhler, Caroline; Richards, Donald

Abstract

<jats:p>We consider the lattice, $\mathcal{L}$, of all subsets of a multidimensional contingency table and establish the properties of monotonicity and supermodularity for the marginalization function, $n(\cdot)$, on $\mathcal{L}$.  We derive from the supermodularity of $n(\cdot)$ some generalized Fr\'echet inequalities complementing and extending inequalities of Dobra and Fienberg.  Further, we construct new monotonic and supermodular functions from $n(\cdot)$, and we remark on the connection between supermodularity and some correlation inequalities for probability distributions on lattices.  We also apply an inequality of Ky Fan to derive a new approach to Fr\'echet inequalities for multidimensional contingency tables.</jats:p>

Date issued

2019

URI

https://hdl.handle.net/1721.1/136315

Department

Massachusetts Institute of Technology. Laboratory for Information and Decision Systems
Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
Massachusetts Institute of Technology. Institute for Data, Systems, and Society

Journal

Journal of Algebraic Statistics

Publisher

Paul V. Galvin Library/Illinois Institute of Technology