An R package to compute and decompose the Mutual Information Index (M) introduced to the social sciences by Theil and Finizza (1971). The M index is a multigroup segregation measure that is highly decomposable, satisfiying both the Strong Unit Decomposability (SUD) and the Strong Group Decomposability (SGD) properties (Frankel and Volij, 2011; Mora and Ruiz-Castillo, 2011).

The package allows for:

- The computation of the M index, either overall or over subsamples defined by the user.
- The decomposition of the M index into a “between” and a “within” term.
- The identification of the “exclusive contributions” of segregation sources defined either by group or unit characteristics.
- The computation of all the elements that conform the “within” term in the decomposition.
- Fast computation employing more than one CPU core in Mac, Linux,
Unix, and BSD systems. This option uses the
`data.table`

and`parallel`

libraries (which Windows does not permit to run with more than one CPU core).

**Rafael Fuentealba-Chaura**

School of Computer Science

Universidad Católica de Temuco

Rudecindo Ortega 02351

Temuco, Chile

rafael.fuentealba97@gmail.com

**Ricardo Mora**

Department of Economics

Universidad Carlos III de Madrid

Getafe, Spain

ricmora@eco.uc3m.es

**Julio Rojas-Mora**

Department of Computer Science

Universidad Católica de Temuco

Rudecindo Ortega 02351

Temuco, Chile

and

Centro de Políticas Públicas

Universidad Católica de Temuco

Temuco, Chile

julio.rojas@uct.cl

You can install the stable version of `mutualinf`

from CRAN with:

`install.packages("mutualinf")`

and the development version from GitHub with:

```
# install.packages("devtools")
::install_github("RafaelFuentealbaC/mutualinf") devtools
```

The package provides two functions:

` ?prepare_data `

- Which prepares the data to be used by the
`mutual`

function. For more details see`help(prepare_data)`

.

` ?mutual`

- Which computes the M index and its decompositions. For more details
see
`help(mutual)`

.

The library computes the M Index. Suppose you have 2016-2018 primary
school enrollment Chile data. Each observation is a combination of,
among other variables, school (`school`

), school district
(`district`

), ethnicity (`ethnicity`

), and
socio-economic level (`csep`

) in a tabular format object
(data.frame, data.table, tibble). Variable `nobs`

represents
students frequencies in each of these combinations. In the first step,
we load the package and use the `prepare_data`

function (i)
to declare the variable that includes the frequencies and (ii) to format
the data for the `mutual`

function:

```
library(mutualinf)
<- prepare_data(data = DF_Seg_Chile,
DT_Seg_Chile_1 vars = "all_vars",
fw = "nobs")
class(DT_Seg_Chile_1)
#> [1] "data.table" "data.frame" "mutual.data"
```

If `vars =" all_vars "`

, `prepare_data`

uses
all columns in the table. You may, nonetheless, use option
`vars`

with tables that have a large number of columns that
are not needed in the analysis. For example:

```
<- prepare_data(data = DF_Seg_Chile,
DT_Seg_Chile_1 vars = c("school", "csep"),
fw = "nobs")
```

prepares the data to conduct, as we see below, an analysis of socioeconomic segregation by school. If you want to additionally study segregation by ethnicity in the schools, the data preparation should collect all the relevant variables:

```
<- prepare_data(data = DF_Seg_Chile,
DT_Seg_Chile_1 vars = c("school", "csep", "ethnicity"),
fw = "nobs")
```

If the data is originally fully disaggregated (i.e., one record
represents one student), `prepare_data`

computes the cell
frequencies of the specified variables:

```
<- prepare_data(data = DF_Seg_Chile,
DT_Seg_Chile_2 vars = "all_vars")
```

The `mutual`

function can compute the index M in its
simplest form, i.e., on a group dimension for a unit of analysis. For
example, to compute socioeconomic segregation by schools:

```
mutual(data = DT_Seg_Chile,
group = "csep",
unit = "school")
#> M
#> 1: 0.1995499
```

and to compute ethnic segregation by schools:

```
mutual(data = DT_Seg_Chile,
group = "ethnicity",
unit = "school")
#> M
#> 1: 0.06213906
```

The `mutual`

function also allows the use of multiple
group dimensions on which segregation is computed. For example:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = "school")
#> M
#> 1: 0.2610338
```

computes socioeconomic and ethnic segregation in schools, effectively
defining the groups as the combinations of socioeconomic and ethnic
categories. As we can see, the segregation obtained considering,
simultaneously, socioeconomic level and ethnicity
(`0.2610338`

) is larger than those obtained separately
(`0.1995499`

and `0.06213906`

, respectively).

More generally, segregation analysis can be computed using multiple unit and/or group dimensions. For example:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "district"))
#> M
#> 1: 0.2610338
```

computes socioeconomic and ethnic segregation in combinations of
schools and districts. Note that the result is identical to that
obtained in the previous case, `0.2610338`

. The reason is
that each school only belongs to one district so that the combinations
of schools and districts coincide with the set of schools. We can say
that the districts are a partition of the schools and districts do not
add a new source for socioeconomic and ethnic segregation.

Yet the variables that define the units may not have a hierarchical
relationship between them. For example, if instead of district
(`district`

) we use type of school (`sch_type`

,
either private, charter, or public):

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"))
#> M
#> 1: 0.2610865
```

computes segregation in units defined by combinations of schools and
types of schools. There is no hierarchical structure in the units as
some schools change their type in the sample period. Consequently, the
level of segregation is higher (`0.2610865`

vs. `0.2610338`

).

Option `by`

computes the index for subsamples. The data
used as an illustration include primary schools in the Chilean regions
of Biobio, La Araucania, and Los Rios. Option `by`

allows
obtaining the level of segregation for each of the three regions in a
single command:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region")
#> region M
#> 1: Biobio 0.2312423
#> 2: La Araucania 0.2367493
#> 3: Los Rios 0.2125013
```

In this case, the function displays the index for each region. We see
that socioeconomic and ethnic segregation is greater in La Araucania
(`0.2367493`

) than in Biobio (`0.2312423`

) and Los
Rios (`0.2125013`

).

Option `within`

additively decomposes the total
segregation index into a “between” and a “within” term:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region",
within = "csep")
#> region M M_B_csep M_W_csep
#> 1: Biobio 0.2312423 0.2030819 0.02816039
#> 2: La Araucania 0.2367493 0.1906641 0.04608521
#> 3: Los Rios 0.2125013 0.1774420 0.03505928
```

We get three terms for each region. The first, `M`

,
contains the total segregation and matches the values without option
`within`

. The second, `M_B_csep`

, referred to as
the “between” term, measures socioeconomic segregation in the
combinations of schools and types of schools. The third,
`M_W_csep`

, referred to as the “within” term, is the weighted
average of ethnic segregation (in the combinations of schools and types
of schools) computed for each socioeconomic level (with weights equal to
the demographic importance of each socioeconomic level). This “within”
term can be interpreted as the part of total segregation,
`M`

, derived exclusively from ethnic differences. From this
point on, we will refer to this term as “the contribution of”
ethnicity.

It is also possible to obtain the decomposition of the index into a “between” ethnicity term and a “within” ethnicity term:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region",
within = "ethnicity")
#> region M M_B_ethnicity M_W_ethnicity
#> 1: Biobio 0.2312423 0.02582674 0.2054156
#> 2: La Araucania 0.2367493 0.04840892 0.1883404
#> 3: Los Rios 0.2125013 0.03324738 0.1792539
```

We get, again, three terms for each region. The first,
`M`

, captures total segregation as before. The second,
`M_B_ethnicity`

, is ethnic segregation in the schools and
types of schools combinations. The third, `M_W_ethnicity`

, is
the socioeconomic contribution.

Option `contribution.from`

displays the two contributions
simultaneously:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region",
contribution.from = "group_vars")
#> region M C_csep C_ethnicity interaction
#> 1: Biobio 0.2312423 0.2054156 0.02816039 -0.002333648
#> 2: La Araucania 0.2367493 0.1883404 0.04608521 0.002323710
#> 3: Los Rios 0.2125013 0.1792539 0.03505928 -0.001811897
```

We get four terms for each region: `M`

,
`C_csep`

, `C_ethnicity`

, and
`interaction`

. `M`

is total segregation, as we
have already seen. `C_csep`

is the socioeconomic contribution
and matches the “within” ethnicity term,`M_W_ethnicity`

.
`C_ethnicity`

is the ethnic contribution and matches the
“within” socioeconomic term,`M_W_csep`

. Finally,
`interaction`

is equal to `M`

minus the sum of
`C_csep`

and `C_ethnicity`

. It is the part of the
total segregation in the combinations of schools and school types that
cannot be exclusively attributed to the segregation effect of either
`ethnicity`

or `csep`

. We can see that the
socioeconomic contribution is largest in Biobio
(`0.2054156`

), while the ethnicity contribution is largest in
La Araucania (`0.04608521`

).

Option `contribution.from`

may also display the
contributions of a subset of variables. For example:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region",
contribution.from = "csep")
#> region M C_csep
#> 1: Biobio 0.2312423 0.2054156
#> 2: La Araucania 0.2367493 0.1883404
#> 3: Los Rios 0.2125013 0.1792539
```

returns `M`

and `C_csep`

, omitting
`C_ethnicity`

and `interaction`

.

The display of contributions can also be performed for organizational units. For example:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "sch_type"),
by = "region",
contribution.from = "unit_vars")
#> region M C_school C_sch_type interaction
#> 1: Biobio 0.2312423 0.1293566 4.860549e-05 0.10183706
#> 2: La Araucania 0.2367493 0.1709480 8.563946e-06 0.06579272
#> 3: Los Rios 0.2125013 0.1351602 1.903942e-04 0.07715072
```

The first of the four terms is total segregation, `M`

, as
before. The second term, `C_school`

, contains the
contribution of schools, while the third term, `C_sch_type`

,
captures the contribution of school types. The fourth term,
`interaction`

, is the part of socioeconomic and ethnic
segregation that cannot be exclusively attributed to segregation by
schools or by school type. Most schools types do not vary in the sample,
so `sch_type`

is almost a partition of schools. Hence, the
type of school is a minor source of information compared to the school,
and its contribution is minimal.

In the presence of a true partition, the analysis of contributions is simpler:

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity"),
unit = c("school", "district"),
by = "region",
contribution.from = "unit_vars")
#> region M C_school C_district interaction
#> 1: Biobio 0.2311937 0.1558457 0 0.07534802
#> 2: La Araucania 0.2367407 0.1635589 0 0.07318187
#> 3: Los Rios 0.2123109 0.1605696 0 0.05174127
```

The contribution of districts, `C_district`

, is zero since
there is no segregation by districts within each school. Intuitively,
all segregation by districts becomes segregation by schools.

The analysis of contributions is generalized to situations in which
there are more than two sources of segregation by groups or units. For
example, if we consider three sources of group segregation
(`csep`

,`ethnicity`

and `gender`

):

```
mutual(data = DT_Seg_Chile,
group = c("csep", "ethnicity", "gender"),
unit = c("school", "district"),
by = "region",
contribution.from = "group_vars")
#> region M C_csep C_ethnicity C_gender interaction
#> 1: Biobio 0.2731123 0.2143102 0.03438802 0.04191863 -0.01750455
#> 2: La Araucania 0.2718037 0.2017662 0.05742349 0.03506293 -0.02244892
#> 3: Los Rios 0.2836338 0.1941962 0.04642725 0.07132289 -0.02831253
```

displays five terms: total segregation, the contributions of the three sources of segregation by groups, and the interaction term.

The only restriction of option `contribution.from`

is that
contributions of variables that define groups and variables that define
units cannot be simultaneously computed since there is no single way to
do this decomposition. However, option `components`

allows
retrieving all the elements of the linear combination of the “within”
terms to compute the decomposition desired by an advanced user.

Rafael Fuentealba-Chaura and Julio Rojas-Mora acknowledge the financial support by the FONDECYT/ANID Project 11170583. Ricardo Mora acknowledge the financial support of MCIN/AEI/10.13039/501100011033 (Project no. PID2019-108576RB-I00). Cluster time was provided by the UCT VIP Project FEQUIP2019-INRN-03.

Frankel, D. and Volij, O. (2011). Measuring school segregation.
*Journal of Economic Theory, 146*(1):1-38. https://doi.org/10.1016/j.jet.2010.10.008.

Guinea-Martin, D., Mora, R., & Ruiz-Castillo, J. (2018). The
evolution of gender segregation over the life course. *American
Sociological Review, 83*(5), 983-1019. https://doi.org/10.1177/0003122418794503.

Mora, R. and Guinea-Martin, D. (2021). Computing decomposable
multigroup indexes of segregation. *UC3M Working papers, Economics
31803*, Universidad Carlos III de Madrid. Departamento de
Economía.

Mora, R. and Ruiz-Castillo, J. (2011). Entropy-based segregation
indices. *Sociological Methodology, 41*(1):159-194. https://doi.org/10.1111/j.1467-9531.2011.01237.x.

Theil, H. and Finizza, A. J. (1971). A note on the measurement of
racial integration of schools by means of informational concepts.
*The Journal of Mathematical Sociology, 1*(2):187-193. https://doi.org/10.1080/0022250X.1971.9989795.