Difference between revisions of "Uniformly most-powerful test"
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| − | A [[Statistical test|statistical test]] of given [[Significance level|significance level]] for testing a compound hypothesis | + | {{TEX|done}} |
| + | A [[Statistical test|statistical test]] of given [[Significance level|significance level]] for testing a compound hypothesis $H_0$ against a compound alternative $H_1$, whose power is not less than the power of any other statistical test for testing $H_0$ against $H_1$ of the same significance level (cf. [[Power of a statistical test|Power of a statistical test]]). | ||
| − | Suppose that a compound hypothesis | + | Suppose that a compound hypothesis $H_0$: $\theta\in\Theta_0\subset\Theta$ has to be tested against the compound alternative $H_1$: $\theta\in\Theta_1=\Theta\setminus\Theta_0$, and there is given an upper bound $\alpha$, $0<\alpha<1$, for the probability of an error of the first kind, made by rejecting $H_0$ when it is in fact true (the number $\alpha$ is called the significance level of the test, and it is said that the test has level $\alpha$). In this way, the restriction on the probability of an error of the first kind reduces the set of tests for testing $H_0$ against $H_1$ to the class of tests of level $\alpha$. In terms of the power function (cf. [[Power function of a test|Power function of a test]]) $\beta(\theta)$, $\theta\in\Theta=\Theta_0\cup\Theta_1$, a statistical test of fixed significance level $\alpha$ means that |
| − | + | $$\sup_{\theta\in\Theta_0}\beta(\theta)=\alpha.$$ | |
| − | If, in the class of all tests of level | + | If, in the class of all tests of level $\alpha$ for testing $H_0$ against $H_1$, there is one whose power function $\beta^*(\theta)$ satisfies |
| − | + | $$\sup_{\theta\in\Theta_0}\beta^*(\theta)=\alpha,\quad\beta^*(\theta)\geq\beta(\theta),\quad\theta\in\Theta_1,$$ | |
| − | where | + | where $\beta(\theta)$ is the power function of any other test from this class, then this test is called a uniformly most-powerful test of level $\alpha$ for testing $H_0$ against $H_1$. A uniformly most-powerful test is optimal if the comparison is made in terms of the power of tests. |
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> E.L. Lehmann, "Testing statistical hypotheses" , Wiley (1959)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> E.L. Lehmann, "Testing statistical hypotheses" , Wiley (1959)</TD></TR></table> | ||
Latest revision as of 11:19, 13 August 2014
A statistical test of given significance level for testing a compound hypothesis $H_0$ against a compound alternative $H_1$, whose power is not less than the power of any other statistical test for testing $H_0$ against $H_1$ of the same significance level (cf. Power of a statistical test).
Suppose that a compound hypothesis $H_0$: $\theta\in\Theta_0\subset\Theta$ has to be tested against the compound alternative $H_1$: $\theta\in\Theta_1=\Theta\setminus\Theta_0$, and there is given an upper bound $\alpha$, $0<\alpha<1$, for the probability of an error of the first kind, made by rejecting $H_0$ when it is in fact true (the number $\alpha$ is called the significance level of the test, and it is said that the test has level $\alpha$). In this way, the restriction on the probability of an error of the first kind reduces the set of tests for testing $H_0$ against $H_1$ to the class of tests of level $\alpha$. In terms of the power function (cf. Power function of a test) $\beta(\theta)$, $\theta\in\Theta=\Theta_0\cup\Theta_1$, a statistical test of fixed significance level $\alpha$ means that
$$\sup_{\theta\in\Theta_0}\beta(\theta)=\alpha.$$
If, in the class of all tests of level $\alpha$ for testing $H_0$ against $H_1$, there is one whose power function $\beta^*(\theta)$ satisfies
$$\sup_{\theta\in\Theta_0}\beta^*(\theta)=\alpha,\quad\beta^*(\theta)\geq\beta(\theta),\quad\theta\in\Theta_1,$$
where $\beta(\theta)$ is the power function of any other test from this class, then this test is called a uniformly most-powerful test of level $\alpha$ for testing $H_0$ against $H_1$. A uniformly most-powerful test is optimal if the comparison is made in terms of the power of tests.
References
| [1] | E.L. Lehmann, "Testing statistical hypotheses" , Wiley (1959) |
How to Cite This Entry:
Uniformly most-powerful test. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Uniformly_most-powerful_test&oldid=13669
Uniformly most-powerful test. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Uniformly_most-powerful_test&oldid=13669
This article was adapted from an original article by M.S. Nikulin (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article