Quasisymmetric function: Difference between revisions

Revision as of 20:44, 21 May 2013

In statistical classification the Bayes classifier minimises the probability of misclassification.^[1]

Definition

Suppose a pair $(X,Y)$ takes values in $\mathbb {R} ^{d}\times \{1,2,\dots ,K\}$ , where $Y$ is the class label of $X$ . This means that the conditional distribution of X, given that the label Y takes the value r is given by

X\mid Y=r\sim P_{r}

for

r=1,2,\dots ,K

where " $\sim$ " means "is distributed as", and where $P_{r}$ denotes a probability distribution.

A classifier is a rule that assigns to an observation X=x a guess or estimate of what the unobserved label Y=r actually was. In theoretical terms, a classifier is a measurable function $C:\mathbb {R} ^{d}\to \{1,2,\dots ,K\}$ , with the interpretation that C classifies the point x to the class C(x). The probability of misclassification, or risk, of a classifier C is defined as

{\mathcal {R}}(C)=\operatorname {P} \{C(X)\neq Y\}.

The Bayes classifier is

C^{\text{Bayes}}(x)={\underset {r\in \{1,2,\dots ,K\}}{\operatorname {argmax} }}\operatorname {P} (Y=r\mid X=x).

In practice, as in most of statistics, the difficulties and subtleties are associated with modeling the probability distributions effectively -- in this case, $\operatorname {P} (Y=r\mid X=x)$ . The Bayes classifier is one of the useful benchmarks in statistical classification.

The excess risk of a general classifier $C$ (possibly depending on some training data) is defined as ${\mathcal {R}}(C)-{\mathcal {R}}(C^{\text{Bayes}}).$ Thus this non-negative quantity is important for assessing the performance of different classification techniques. A classifier is said to be consistent if the excess risk converges to zero as the size of the training data set tends to infinity.Template:Cn

References

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[1]

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+{{Underlinked|date=March 2013}}
+In [[statistical classification]] the '''Bayes classifier''' minimises the [[probability]] of [[misclassification]].<ref name = "PTPR">{{cite book |author = Devroye, L., Gyorfi, L. & Lugosi, G. |year = 1996 |title = A probabilistic theory of pattern recognition| publisher=Springer | isbn=0-3879-4618-7}}</ref>
+==Definition==
+Suppose a pair <math>(X,Y)</math> takes values in <math>\mathbb{R}^d \times \{1,2,\dots,K\}</math>, where <math>Y</math> is the class label of <math>X</math>. This means that the [[conditional distribution]] of ''X'', given that the label ''Y'' takes the value ''r'' is given by
+:<math>X\mid Y=r \sim P_r</math> for <math>r=1,2,\dots,K</math>
+where "<math>\sim</math>" means "is distributed as", and where <math>P_r</math> denotes a probability distribution.
+A classifier is a rule that assigns to an observation ''X''=''x'' a guess or estimate of what the unobserved label ''Y''=''r'' actually was. In theoretical terms, a classifier is a measurable function <math>C: \mathbb{R}^d \to \{1,2,\dots,K\}</math>, with the interpretation that ''C'' classifies the point ''x'' to the class ''C''(''x'').  The probability of misclassification, or risk, of a classifier ''C'' is defined as
+:<math>\mathcal{R}(C)  = \operatorname{P}\{C(X) \neq Y\}.</math>
+The Bayes classifier is
+:<math>C^\text{Bayes}(x) = \underset{r \in \{1,2,\dots, K\}}{\operatorname{argmax}} \operatorname{P}(Y=r \mid X=x).</math>
+In practice, as in most of statistics, the difficulties and subtleties are associated with modeling the probability distributions effectively -- in this case, <math>\operatorname{P}(Y=r \mid X=x)</math>. The Bayes classifier is one of the useful benchmarks in [[statistical classification]].
+The excess risk of a general classifier <math>C</math> (possibly depending on some training data) is defined as <math>\mathcal{R}(C) - \mathcal{R}(C^\text{Bayes}).</math>
+Thus this non-negative quantity is important for assessing the performance of different classification techniques. A classifier is said to be [[Consistency (statistics)|consistent]] if the excess risk converges to zero as the size of the training data set tends to infinity.{{cn|date=March 2013}}
+==See also==
+*[[Naive Bayes classifier]]
+==References==
+{{reflist|1}}
+[[Category:Bayesian statistics]]
+[[Category:Statistical classification]]

Quasisymmetric function: Difference between revisions

Revision as of 20:44, 21 May 2013

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