Title :
Hypothesis testing with the general source
Author_Institution :
Graduate Sch. of Inf. Syst., Univ. of Electro-Commun., Tokyo, Japan
fDate :
11/1/2000 12:00:00 AM
Abstract :
The asymptotically optimal hypothesis testing problem, with general sources as the null and alternative hypotheses, is studied under exponential-type error constraints on the first kind of error probability. Our fundamental philosophy is to convert all of the hypothesis testing problems to the pertinent computation problems in the large deviation-probability theory. This methodologically new approach enables us to establish compact general formulas of the optimal exponents of the second kind of error and correct testing probabilities for the general sources including all nonstationary and/or nonergodic sources with arbitrary abstract alphabet (countable or uncountable). These general formulas are presented from the information-spectrum point of view
Keywords :
error statistics; optimisation; source coding; achievable coding rates; alternative hypothesis; arbitrary abstract alphabet; asymptotically optimal hypothesis testing; compact general formulas; computation problems; countable alphabet; error probability; exponential-type error constraints; fixed-length source coding; general formulas; general source; information spectrum; large deviation-probability theory; nonstationary sources; null hypothesis; optimal exponents; testing probabilities; uncountable alphabet; Books; Error correction; Error probability; Helium; Information systems; Random variables; Sections; Sun; Tellurium; Testing;
Journal_Title :
Information Theory, IEEE Transactions on
