In statistics, compositional data are quantitative descriptions of the parts of some whole, conveying relative information. Mathematically, compositional data is represented by points on a simplex. Measurements involving probabilities, proportions, percentages, and ppm can all be thought of as compositional data.
In three variables, compositional data in three variables can be plotted via ternary plots. The use of a barycentric plot on three variables graphically depicts the ratios of the three variables as positions in an equilateral triangle.
Simplicial sample spaceEdit
In general, John Aitchison defined compositional data to be proportions of some whole in 1982. In particular, a compositional data point (or composition for short) can be represented by a real vector with positive components. The sample space of compositional data is a simplex:
The only information is given by the ratios between components, so the information of a composition is preserved under multiplication by any positive constant. Therefore, the sample space of compositional data can always be assumed to be a standard simplex, i.e. . In this context, normalization to the standard simplex is called closure and is denoted by :
where D is the number of parts (components) and denotes a row vector.
The simplex can be given the structure of a real vector space in several different ways. The following vector space structure is called Aitchison geometry or the Aitchison simplex and has the following operations:
- Inner product
Under these operations alone, it is sufficient to show that the Aitchison simplex forms a -dimensional Euclidean vector space.
Since the Aitchison simplex forms a finite dimensional Hilbert space, it is possible to construct orthonormal bases in the simplex. Every composition can be decomposed as follows
where forms an orthonormal basis in the simplex. The values are the (orthonormal and Cartesian) coordinates of with respect to the given basis. They are called isometric log-ratio coordinates .
There are three well-characterized isomorphisms that transform from the Aitchison simplex to real space. All of these transforms satisfy linearity and as given below
Additive logratio transformEdit
The additive log ratio (alr) transform is an isomorphism where . This is given by
The choice of denominator component is arbitrary, and could be any specified component. This transform is commonly used in chemistry with measurements such as pH. In addition, this is the transform most commonly used for multinomial logistic regression. The alr transform is not an isometry, meaning that distances on transformed values will not be equivalent to distances on the original compositions in the simplex.
Center logratio transformEdit
The center log ratio (clr) transform is both an isomorphism and an isometry where
Where is the geometric mean of . The inverse of this function is also known as the softmax function commonly used in neural networks.
Isometric logratio transformEdit
The isometric log ratio (ilr) transform is both an isomorphism and an isometry where
There are multiple ways to construct orthonormal bases, including using the Gram–Schmidt orthogonalization or singular-value decomposition of clr transformed data. Another alternative is to construct log contrasts from a bifurcating tree. If are given a bifurcating tree, we can construct a basis from the internal nodes in the tree.
Each vector in the basis would be determined as follows
The elements within each vector are given as follows
where are the respective number of tips in the corresponding subtrees shown in the figure. It can be shown that the resulting basis is orthonormal
Once the basis is built, the ilr transform can be calculated as follows
where each element in the ilr transformed data is of the following form
where and are the set of values corresponding to the tips in the subtrees and
- In chemistry, compositions can be expressed as molar concentrations of each component. As the sum of all concentrations is not determined, the whole composition of D parts is needed and thus expressed as a vector of D molar concentrations. These compositions can be translated into weight per cent multiplying each component by the appropriated constant.
- In demography, a town may be a compositional data point in a sample of towns; a town in which 35% of the people are Christians, 55% are Muslims, 6% are Jews, and the remaining 4% are others would correspond to the quadruple [0.35, 0.55, 0.06, 0.04]. A data set would correspond to a list of towns.
- In geology, a rock composed of different minerals may be a compositional data point in a sample of rocks; a rock of which 10% is the first mineral, 30% is the second, and the remaining 60% is the third would correspond to the triple [0.1, 0.3, 0.6]. A data set would contain one such triple for each rock in a sample of rocks.
- In high throughput sequencing, data obtained are count compositions since the capacity of the machine determines the number of reads observed. These reduce to probabilities of observing a feature given the sequencing depth.
- In probability and statistics, a partition of the sampling space into disjoint events is described by the probabilities assigned to such events. The vector of D probabilities can be considered as a composition of D parts. As they add to one, one probability can be suppressed and the composition is completely determined.
- In a survey, the proportions of people positively answering some different items can be expressed as percentages. As the total amount is identified as 100, the compositional vector of D components can be defined using only D − 1 components, assuming that the remaining component is the percentage needed for the whole vector to add to 100.
- Aitchison J. (1986), The Statistical Analysis of Compositional Data, Chapman & Hall; reprinted in 2003, with additional material, by The Blackburn Press
- van den Boogaart, K. G.; Tolosana-Delgado, R. (2013), Analyzing Compositional Data With R, Springer.
- Egozcue, Juan Jose; Pawlowsky-Glahn, Vera; Mateu-Figueras, Gloria; Barcelo-Vidal, Carles (2003), "Isometric logratio transformations for compositional data analysis", Mathematical Geology, 35 (3): 279–300, doi:10.1023/A:1023818214614
- Egozcue, Juan Jose; Pawlowsky-Glahn, Vera (2005), "Groups of parts and their balances in compositional data analysis", Mathematical Geology, 37 (7): 795–828, doi:10.1007/s11004-005-7381-9
- Pawlowsky-Glahn, Vera; Egozcue, Juan Jose; Tolosana-Delgado, Raimon (2015), Modeling and Analysis of Compositional Data, John Wiley & Sons, doi:10.1002/9781119003144, ISBN 9781119003144