Abstract
Let f: Rk→[r] = {1, 2,…,r} be a measurable function, and let {Ui}i∈N be a sequence of i.i.d. random variables. Consider the random process {Zi}i∈N defined by Zi = f(Ui,…,Ui+k-1). We show that for all q, there is a positive probability, uniform in f, that Z1 = Z2 = … = Zq. A continuous counterpart is that if f: Rk → R, and Ui and Zi are as before, then there is a positive probability, uniform in f, for Z1,…,Zq to be monotone. We prove these theorems, give upper and lower bounds for this probability, and generalize to variables indexed on other lattices. The proof is based on an application of combinatorial results from Ramsey theory to the realm of continuous probability.
Original language | English |
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Pages (from-to) | 1-7 |
Number of pages | 7 |
Journal | Electronic Communications in Probability |
Volume | 19 |
DOIs | |
State | Published - 22 Sep 2014 |
Keywords
- D-dependent
- De Bruijn
- K-factor
- Ramsey
All Science Journal Classification (ASJC) codes
- Statistics and Probability
- Statistics, Probability and Uncertainty