Wrapped Cauchy distribution: Difference between revisions

Revision as of 00:27, 1 February 2014

In probability theory, the Mills ratio (or Mills's ratio^[1]) of a continuous random variable $X$ is the function

m (x) : = \frac{\bar{F} (x)}{f (x)},

where $f (x)$ is the probability density function, and

\bar{F} (x) : = \Pr [X > x] = \int_{x}^{+ \infty} f (u) d u

is the complementary cumulative distribution function (also called survival function). The concept is named after John P. Mills. The Mills ratio is related^[2] to the hazard rate h(x) which is defined as

h (x) : = \lim_{δ \to 0} \frac{1}{δ} \Pr [x < X \leq x + δ | X > x]

by

m (x) = \frac{1}{h (x)} .

Example

If $X$ has standard normal distribution thenTemplate:Cn

m (x) \sim 1 / x,

where the sign $\sim$ means that the quotient of the two functions converges to 1 as $x \to + \infty$ . More precise asymptotics can be given.^[3]

References

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-The name of the author is Elfreda. For a while she's been in Ak. Procuring is what he does with regard to. Doing 3d graphics is what I every monday. Go to my website to learn more: http://dsgopen.com/whole.php<br><br>Here is my web-site; [http://dsgopen.com/whole.php snapback caps]
+In [[probability theory]], the '''Mills ratio''' (or '''Mills's ratio'''<ref name="GS" />) of a [[Continuous_random_variable#Continuous_probability_distribution|continuous random variable]] <math>X</math> is the function
+: <math>m(x) := \frac{\bar{F}(x)}{f(x)} ,</math>
+where <math>f(x)</math> is the [[probability density function]], and
+:<math>\bar{F}(x) := \Pr[X>x] = \int_x^{+\infty} f(u)\, du</math>
+is the [[cumulative_distribution_function#Derived_functions|complementary cumulative distribution function]] (also called [[survival function]]).  The concept is named after [[John P. Mills]].  The Mills ratio is related<ref name="KM" /> to the [[hazard rate]] ''h''(''x'') which is defined as
+:<math>h(x):=\lim_{\delta\to 0} \frac{1}{\delta}\Pr[x < X \leq x + \delta | X > x]</math>
+by
+:<math>m(x) = \frac{1}{h(x)}.</math>
+==Example==
+If <math>X</math> has [[standard normal distribution]] then{{cn|date=June 2012}}
+:<math>m(x) \sim 1/x , \, </math>
+where the sign <math>\sim</math> means that the quotient of the two functions converges to 1 as <math>x\to+\infty</math>. More precise asymptotics can be given.<ref name="MW" />
+==See also==
+*[[Inverse Mills ratio]]
+==References==
+{{reflist |refs=
+<ref name="GS">G. Grimmett, S. Stirzaker. ''Probability Theory and Random Processes''. 3rd ed. Cambridge. Page 98.</ref>
+<ref name="MW">Weisstein, Eric W. "Mills Ratio." From MathWorld—A Wolfram Web Resource. http://mathworld.wolfram.com/MillsRatio.html</ref>
+<ref name="KM"> Klein, J.P., Moeschberger, M.L.: ''Survival Analysis: Techniques for Censored and Truncated Data'', Springer, 2003, p.27 </ref>
+}}
+[[Category:Theory of probability distributions]]

Wrapped Cauchy distribution: Difference between revisions

Revision as of 00:27, 1 February 2014

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