TY - JOUR
T1 - Uniform chernoff and dvoretzky-kiefer-wolfowitz-type inequalities for Markov chains and related processes
AU - Kontorovich, Aryeh
AU - Weiss, Roi
N1 - Publisher Copyright:
© Applied Probability Trust 2014.
PY - 2014/12/1
Y1 - 2014/12/1
N2 - We observe that the technique of Markov contraction can be used to establish measure concentration for a broad class of noncontracting chains. In particular, geometric ergodicity provides a simple and versatile framework. This leads to a short, elementary proof of a general concentration inequality for Markov and hidden Markov chains, which supersedes some of the knownresults and easily extends to other processes such as Markov trees. As applications, we provide a Dvoretzky-Kiefer-Wolfowitz-type inequality and a uniform Chernoff bound. All of our bounds are dimension-free and hold for countably infinite state spaces.
AB - We observe that the technique of Markov contraction can be used to establish measure concentration for a broad class of noncontracting chains. In particular, geometric ergodicity provides a simple and versatile framework. This leads to a short, elementary proof of a general concentration inequality for Markov and hidden Markov chains, which supersedes some of the knownresults and easily extends to other processes such as Markov trees. As applications, we provide a Dvoretzky-Kiefer-Wolfowitz-type inequality and a uniform Chernoff bound. All of our bounds are dimension-free and hold for countably infinite state spaces.
KW - Chernoff
KW - Concentration of measure
KW - Dvoretzky-Kiefer-Wolfowitz
KW - Hidden Markov chain
KW - Markov chain
UR - http://www.scopus.com/inward/record.url?scp=84922351509&partnerID=8YFLogxK
U2 - 10.1239/jap/1421763330
DO - 10.1239/jap/1421763330
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AN - SCOPUS:84922351509
SN - 0021-9002
VL - 51
SP - 1100
EP - 1113
JO - Journal of Applied Probability
JF - Journal of Applied Probability
IS - 4
ER -