Difference between revisions of "Ahlswede-Daykin inequality"
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four-functions inequality
An inequality in which an inequality for four functions on a finite distributive lattice applies also to additive extensions of the functions on lattice subsets. Let 
be a finite distributive lattice (see also FKG inequality), such as the power set of a finite set ordered by proper inclusion. For subsets 
, 
of 
, define 
and 
. If 
or 
is empty, 
. Given 
, let 
.
The Ahlswede–Daykin inequality says that if 
, 
, 
, and 
map 
into 
such that
 |
then
 |
See [a1] or [a2], [a4], [a7] for a proof.
The inequality is very basic and is used in proofs of other inequalities (cf. [a2], [a3], [a4], [a5], [a7]), including the FKG inequality [a6] and the Fishburn–Shepp inequality [a3], [a8].
See also Correlation inequalities; Holley inequality.
References
| [a1] | R. Ahlswede, D.E. Daykin, "An inequality for the weights of two families, their unions and intersections" Z. Wahrscheinlichkeitsth. verw. Gebiete , 43 (1978) pp. 183–185 |
| [a2] | B. Bollobás, "Combinatorics" , Cambridge Univ. Press (1986) |
| [a3] | P.C. Fishburn, "A correlational inequality for linear extensions of a poset" Order , 1 (1984) pp. 127–137 |
| [a4] | P.C. Fishburn, "Correlation in partially ordered sets" Discrete Appl. Math. , 39 (1992) pp. 173–191 |
| [a5] | P.C. Fishburn, P.G. Doyle, L.A. Shepp, "The match set of a random permutation has the FKG property" Ann. of Probab. , 16 (1988) pp. 1194–1214 |
| [a6] | C.M. Fortuin, P.N. Kasteleyn, J. Ginibre, "Correlation inequalities for some partially ordered sets" Comm. Math. Phys. , 22 (1971) pp. 89–103 |
| [a7] | R.L. Graham, "Applications of the FKG inequality and its relatives" , Proc. 12th Internat. Symp. Math. Programming , Springer (1983) pp. 115–131 |
| [a8] | L.A. Shepp, "The XYZ conjecture and the FKG inequality" Ann. of Probab. , 10 (1982) pp. 824–827 |
Ahlswede-Daykin inequality. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Ahlswede-Daykin_inequality&oldid=15447