| directional_quantile {fdaoutlier} | R Documentation |
Compute directional quantile outlyingness for a sample of discretely observed curves
Description
The directional quantile is a measure of outlyingness based on a scaled pointwise deviation from the mean. These deviations are usually scaled by the deviation of the mean from the 2.5% upper and lower quantiles depending on if the (pointwise) observed value of a function is above or below the (pointwise) mean. Directional quantile was mentioned in Myllymäki et al. (2015) doi:10.1016/j.spasta.2014.11.004, Myllymäki et al. (2017) doi:10.1111/rssb.12172 and Dai et al. (2020) doi:10.1016/j.csda.2020.106960.
Usage
directional_quantile(dt, quantiles = c(0.025, 0.975))
Arguments
dt |
A matrix or dataframe of size |
quantiles |
A numeric vector of length 2 specifying the probabilities of the lower and upper quantiles.
Values must be between 0 and 1. Defaults to |
Details
The method computes the directional quantile of a sample of curves discretely observed on common points.
The directional quantile of a function/curve X_i(t) is the maximum pointwise scaled outlyingness of
X_i(t). The scaling is done using the pointwise absolute difference between the 2.5% mean and the lower (and upper)
quantiles. See Dai et al. (2020) doi:10.1016/j.csda.2020.106960 and
Myllymäki et al. (2017) doi:10.1111/rssb.12172 for more details.
Value
A numeric vector containing the the directional quantiles of each observation of dt.
Author(s)
Oluwasegun Taiwo Ojo
References
Dai, W., Mrkvička, T., Sun, Y., & Genton, M. G. (2020). Functional outlier detection and taxonomy by sequential transformations. Computational Statistics & Data Analysis, 106960.
Myllymäki, M., Mrkvička, T., Grabarnik, P., Seijo, H., & Hahn, U. (2017). Global envelope tests for spatial processes. J. R. Stat. Soc. B, 79:381-404.
Examples
dt1 <- simulation_model1()
dq <- directional_quantile(dt1$data)