Shearer's inequality
In information theory, Shearer's inequality,[1] named after James Shearer, states that if X1, ..., Xd are random variables and S1, ..., Sn are subsets of {1, 2, ..., d} such that every integer between 1 and d lies in at least r of these subsets, then
where is the Cartesian product of random variables with indices j in (so the dimension of this vector is equal to the size of ).
References
- ↑ Chung, F.R.K.; Graham, R.L.; Frankl, P.; Shearer, J.B. (1986). "Some Intersection Theorems for Ordered Sets and Graphs". J. Comb. Theory Series A. 43: 23–37.
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