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Main Authors: Lee, Hyeon, Hingee, Kassel Liam, Scealy, Janice L., Wood, Andrew T. A., Grunsky, Eric, Marron, J. S.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2504.09853
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author Lee, Hyeon
Hingee, Kassel Liam
Scealy, Janice L.
Wood, Andrew T. A.
Grunsky, Eric
Marron, J. S.
author_facet Lee, Hyeon
Hingee, Kassel Liam
Scealy, Janice L.
Wood, Andrew T. A.
Grunsky, Eric
Marron, J. S.
contents Compositional data, also referred to as simplicial data, naturally arise in many scientific domains such as geochemistry, microbiology, and economics. In such domains, obtaining sensible lower-dimensional representations and modes of variation plays an important role. A typical approach to the problem is applying a log-ratio transformation followed by principal component analysis (PCA). However, this approach has several well-known weaknesses: it amplifies variation in minor variables; it can obscure important variation within major elements; it is not directly applicable to data sets containing zeros and zero imputation methods give highly variable results; it has limited ability to capture linear patterns present in compositional data. In this paper, we propose novel methods that produce nested sequences of simplices of decreasing dimensions analogous to backwards principal component analysis. These nested sequences offer both interpretable lower dimensional representations and linear modes of variation. In addition, our methods are applicable to data sets contain zeros without any modification. We demonstrate our methods on simulated data and on relative abundances of diatom species during the late Pliocene. Supplementary materials and R implementations for this article are available online.
format Preprint
id arxiv_https___arxiv_org_abs_2504_09853
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Principal Subsimplex Analysis
Lee, Hyeon
Hingee, Kassel Liam
Scealy, Janice L.
Wood, Andrew T. A.
Grunsky, Eric
Marron, J. S.
Methodology
Compositional data, also referred to as simplicial data, naturally arise in many scientific domains such as geochemistry, microbiology, and economics. In such domains, obtaining sensible lower-dimensional representations and modes of variation plays an important role. A typical approach to the problem is applying a log-ratio transformation followed by principal component analysis (PCA). However, this approach has several well-known weaknesses: it amplifies variation in minor variables; it can obscure important variation within major elements; it is not directly applicable to data sets containing zeros and zero imputation methods give highly variable results; it has limited ability to capture linear patterns present in compositional data. In this paper, we propose novel methods that produce nested sequences of simplices of decreasing dimensions analogous to backwards principal component analysis. These nested sequences offer both interpretable lower dimensional representations and linear modes of variation. In addition, our methods are applicable to data sets contain zeros without any modification. We demonstrate our methods on simulated data and on relative abundances of diatom species during the late Pliocene. Supplementary materials and R implementations for this article are available online.
title Principal Subsimplex Analysis
topic Methodology
url https://arxiv.org/abs/2504.09853