標題: Generalization of Gartner-Ellis theorem
作者: Chen, PN
電信工程研究所
Institute of Communications Engineering
關鍵字: arbitrary random sequence;exponent;Gartner-Ellis theorem;information spectrum;large deviations
公開日期: 1-十一月-2000
摘要: A generalization of the Gatner-Ellis Theorem for arbitrary random sequences is established. It is shown that the conventional formula of the large deviation rate function, based on the moment generating function techniques, fails to describe the general (possibly nonconvex) large deviation rate for an arbitrary random sequence. An (nonconvex) extension formula obtained by twisting the conventional large deviation rate function around a continuous functional is therefore proposed. As a result, a new Gartner-Ellis upper bound is proved. It is demonstrated by an example that a tight upper bound on the large deviation rate of an arbitrary random sequence can be obtained by choosing the right continuous functional, even if the true large deviation rate is not convex. Also proved is a parallel extension of the Gartner-Ellis lower bound with the introduction of a new notion of Gartner-Ellis set within which the upper bound coincides with the lower bound (for countably many points).
URI: http://dx.doi.org/10.1109/18.887893
http://hdl.handle.net/11536/30140
ISSN: 0018-9448
DOI: 10.1109/18.887893
期刊: IEEE TRANSACTIONS ON INFORMATION THEORY
Volume: 46
Issue: 7
起始頁: 2752
結束頁: 2760
顯示於類別:期刊論文


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