Vincent average

Statistical estimation technique

In applied statistics, Vincentization[1] was described by Ratcliff (1979),[2] and is named after biologist S. B. Vincent (1912),[3] who used something very similar to it for constructing learning curves at the beginning of the 1900s. It basically consists of averaging n 2 {\displaystyle n\geq 2} subjects' estimated or elicited quantile functions in order to define group quantiles from which F {\displaystyle F} can be constructed.

To cast it in its greatest generality, let F 1 , , F n {\displaystyle F_{1},\dots ,F_{n}} represent arbitrary (empirical or theoretical) distribution functions and define their corresponding quantile functions by

F i 1 ( α ) = inf { t R : F i ( t ) α ) } , 0 < α 1. {\displaystyle F_{i}^{-1}(\alpha )=\inf\{t\in \mathbb {R} :F_{i}(t)\geq \alpha )\},\quad 0<\alpha \leq 1.}

The Vincent average of the F i {\displaystyle F_{i}} 's is then computed as

F 1 ( α ) = w i F i 1 ( α ) , 0 < α 1 , i = 1 , , n {\displaystyle F^{-1}(\alpha )=\sum w_{i}F_{i}^{-1}(\alpha ),\quad 0<\alpha \leq 1,\quad i=1,\ldots ,n}

where the non-negative numbers w 1 , , w n {\displaystyle w_{1},\dots ,w_{n}} have a sum of 1 {\displaystyle 1} .

References

  1. ^ Genest, Christian (1992). "Vincentization Revisited" (PDF). 20 (2). The Annals of Statistics: 1137–1142. Retrieved 5 Sep 2018. {{cite journal}}: Cite journal requires |journal= (help)
  2. ^ Ratcliff, Roger (1979). "Group Reaction Time Distributions and an Analysis of Distribution Statistics" (PDF). Psychological Bulletin. 86 (3): 446–461. doi:10.1037/0033-2909.86.3.446. PMID 451109. Retrieved 18 November 2016.
  3. ^ Vincent, Stella; Burnham (1912). "The function of the viborissae in the behavior of the white rat". 1. Behavior Monographs. {{cite journal}}: Cite journal requires |journal= (help)