Generalized Fréchet Bounds for Cell Entries in Multidimensional Contingency Tables
Author(s)
Uhler, Caroline; Richards, Donald![Thumbnail](/bitstream/handle/1721.1/136315/10.1.pdf.jpg?sequence=4&isAllowed=y)
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<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
2019Department
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 SocietyJournal
Journal of Algebraic Statistics
Publisher
Paul V. Galvin Library/Illinois Institute of Technology