Statistical test

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[ilmath]\newcommand{\P}[2][]{\mathbb{P}#1{\left[{#2}\right]} } \newcommand{\Pcond}[3][]{\mathbb{P}#1{\left[{#2}\!\ \middle\vert\!\ {#3}\right]} } \newcommand{\Plcond}[3][]{\Pcond[#1]{#2}{#3} } \newcommand{\Prcond}[3][]{\Pcond[#1]{#2}{#3} }[/ilmath]
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Include hypothesis testing of which are an instance of statistical tests. Link to true/false positive/negative and create pages for false positive and such that redirect to an anchor on that page. Don't forget the power function - Alec (talk) 13:32, 14 December 2017 (UTC)

Definition

A statistical test, [ilmath]T[/ilmath], is characterised by two (a pair) of probabilities:

  • [ilmath]T\eq(u,v)[/ilmath], where:
    • [ilmath]u[/ilmath] is the probability of the test yielding a true-positive result
    • [ilmath]v[/ilmath] is the probability of the test yielding a true-negative result

If we write [ilmath][T\eq 1][/ilmath] for the test coming back positive, [ilmath][T\eq 0][/ilmath] for negative and let [ilmath]P[/ilmath] denote the actual correct outcome (which may be unknowable), denoting [ilmath][P\eq 1][/ilmath] if the thing being tested for is, in truth, present and [ilmath][P\eq 0][/ilmath] if absent, then:

Outcomes: Truly present
[ilmath][P\eq 1][/ilmath]
Truly absent
[ilmath][P\eq 0][/ilmath]
Test positive
[ilmath][T\eq 1][/ilmath]
[ilmath]\Pcond{T\eq 1}{P\eq 1}\eq u[/ilmath] [ilmath]\Pcond{T\eq 1}{P\eq 0}\eq 1-v[/ilmath]
Test negative
[ilmath][T\eq 0][/ilmath]
[ilmath]\Pcond{T\eq 0}{P\eq 1}\eq 1-u[/ilmath]

false negative

[ilmath]\Pcond{T\eq 0}{P\eq 0}\eq v[/ilmath]

true negative

OLD PAGE

Definition

A statistical test, [ilmath]T[/ilmath], is characterised by two (a pair) of probabilities:

  • [ilmath]T\eq(u,v)[/ilmath], where:
    • [ilmath]u[/ilmath] is the probability of the test yielding a true-positive result
    • [ilmath]v[/ilmath] is the probability of the test yielding a true-negative result

Tests are usually asymmetric, see: below and asymmetry of statistical tests for more info.

Notation and Terminology

For a test subject, [ilmath]s[/ilmath], we say the outcome of the test is:

  1. Positive: [ilmath][T(s)\eq 1][/ilmath], [ilmath][T(s)\eq\text{P}][/ilmath], or possibly either of these without the [ilmath][\ ][/ilmath]
  2. Negative: [ilmath][T(s)\eq 0][/ilmath], [ilmath][T(s)\eq\text{N}][/ilmath], or possibly either of these without the [ilmath][\ ][/ilmath]

Power and Significance

The power of the test is

Explanation

Let [ilmath]R[/ilmath] denote the result of the test, here this will be [ilmath]1[/ilmath] or [ilmath]0[/ilmath], and let [ilmath]P[/ilmath] be whether or not the subject actually has the property being tested for. As claimed above the test is characterised by two probabilities