This tutorial describes the basic workflow showing how to compute
step by step functional diversity (FD) indices in a multidimensional
space using mFD
package. Other functions are available and
their uses are illustrated in others tutorials.
DATA The dataset used to illustrate this tutorial is a fruits dataset based on 25 types of fruits (i.e. species) distributed in 10 fruits baskets (i.e. assemblages). Each fruit is characterized by five traits values summarized in the following table:
Trait name | Trait measurement | Trait type | Number of classes | Classes code | Unit |
---|---|---|---|---|---|
Size | Maximal diameter | Ordinal | 5 | 0-1 ; 1-3 ; 3-5 ; 5-10 ; 10-20 | cm |
Plant | Growth form | Categorical | 4 | tree; shrub; vine; forb | NA |
Climate | Climatic niche | Ordinal | 3 | temperate ; subtropical ; tropical | NA |
Seed | Seed type | Ordinal | 3 | none ; pip ; pit | NA |
Sugar | Sugar | Continuous | NA | NA | g/kg |
The use of the mFD
package is based on two datasets:
fruits_traits
in this tutorial# Load data:
data("fruits_traits", package = "mFD")
# Remove fuzzy traits in this tutorial:
fruits_traits <- fruits_traits[ , -c(6:8)]
# Display the table:
knitr::kable(head(fruits_traits),
caption = "Species x traits data frame")
Size | Plant | Climate | Seed | Sugar | |
---|---|---|---|---|---|
apple | 5-10cm | tree | temperate | pip | 103.9 |
apricot | 3-5cm | tree | temperate | pit | 92.4 |
banana | 10-20cm | tree | tropical | none | 122.3 |
currant | 0-1cm | shrub | temperate | pip | 73.7 |
blackberry | 1-3cm | shrub | temperate | pip | 48.8 |
blueberry | 0-1cm | forb | temperate | pip | 100.0 |
baskets_fruits_weights
in this tutorial. Weights in this
matrix can be occurrence data, abundance, biomass, coverage, etc. This
matrix must have assemblages names in rownames. The studied example
works with biomass (i.e. grams of a fruit in a basket) and this
matrix looks as follows:# Load data:
data("baskets_fruits_weights", package = "mFD")
# Display the table:
knitr::kable(as.data.frame(baskets_fruits_weights[1:6, 1:6]),
centering = TRUE,
caption = "Species x assemblages matrix based on the **fruits** dataset")
apple | apricot | banana | currant | blackberry | blueberry | |
---|---|---|---|---|---|---|
basket_1 | 400 | 0 | 100 | 0 | 0 | 0 |
basket_2 | 200 | 0 | 400 | 0 | 0 | 0 |
basket_3 | 200 | 0 | 500 | 0 | 0 | 0 |
basket_4 | 300 | 0 | 0 | 0 | 0 | 0 |
basket_5 | 200 | 0 | 0 | 0 | 0 | 0 |
basket_6 | 100 | 0 | 200 | 0 | 0 | 0 |
This tutorial will guide you through the main framework, illustrated in the flowchart below, step by step.
The first thing to do before starting analyses is to know your data.
To do so, you must be able to characterize the traits you are using
(i.e. tell the package what type of traits you are using). That
is why mFD
package needs a data frame summarizing the type
of each trait (i.e. each column of the
fruits_traits
data frame).
NB You need to set up a data frame with the same
columns names as the below example and traits names need to be in the
same order as in the fruits_traits
data frame:
# Load data:
data("fruits_traits_cat", package = "mFD")
# Remove fuzzy traits in this tutorial:
fruits_traits_cat <- fruits_traits_cat[-c(6:8), ]
# Thus remove the "fuzzy_name" column:
fruits_traits_cat <- fruits_traits_cat[ , -3]
# Display the table:
knitr::kable(head(fruits_traits_cat),
caption = "Traits types based on **fruits & baskets** dataset")
trait_name | trait_type |
---|---|
Size | O |
Plant | N |
Climate | O |
Seed | O |
Sugar | Q |
The first column contains traits name. The second column contains traits type following this code:
mFD
function used to compute functional distance but ok for summary function
and function to group species into Functional Entities)fruits_traits
data
frame)You can add a third column if your dataset use fuzzy traits (then the third column summarizes to which fuzzy trait belongs each column that refers to a fuzzy trait) or if you want to give weight to each traits (then the third column summarizes traits weights).
NOTE The traits types dataframe thus has:
two columns if no fuzzy traits and no weight
given to traits (columns names: trait_name
and
trait_type
) ; three columns if
fuzzy traits (columns names:
trait_name
,trait_type
and
fuzzy_name
) or if no fuzzy traits
and weight given to traits (columns names:
trait_name
,trait_type
and
trait_weight
). See the first part of the Compute
Functional Diversity Hill Indices to see how the
fruits_traits
and fruits_traits_cat
look like
with fuzzy traits.
The mFD
package helps you to summarize your
data using two distinct functions:
mFD::sp.tr.summary()
and
mFD::asb.sp.summary()
.
The function mFD::sp.tr.summary()
summarizes the
fruits_traits
dataframe and returns a list gathering
several tables and lists:
tables with summaries for non-fuzzy & fuzzy traits. For non-fuzzy traits, the table sums up the number of species having each category for ordinal, nominal and circular traits or minimum/first quartile/median/mean/third quartile/maximum for continuous traits. For fuzzy traits, the table sums up minimum/first quartile/median/mean/third quartile/maximum for each category of each fuzzy trait.
a list gathering traits types for non-fuzzy traits
a list gathering modalities of non-continuous and non-fuzzy traits
USAGE
# Species traits summary:
fruits_traits_summ <- mFD::sp.tr.summary(
tr_cat = fruits_traits_cat,
sp_tr = fruits_traits,
stop_if_NA = TRUE)
## $Size
## [1] "ordered" "factor"
##
## $Plant
## [1] "factor"
##
## $Climate
## [1] "ordered" "factor"
##
## $Seed
## [1] "ordered" "factor"
##
## $Sugar
## [1] "numeric"
## $Size
## [1] 5-10cm 3-5cm 10-20cm 0-1cm 1-3cm
## Levels: 0-1cm < 1-3cm < 3-5cm < 5-10cm < 10-20cm
##
## $Plant
## [1] tree shrub forb vine
## Levels: forb shrub tree vine
##
## $Climate
## [1] temperate tropical subtropical
## Levels: temperate < subtropical < tropical
##
## $Seed
## [1] pip pit none
## Levels: none < pip < pit
##
## $Sugar
## [1] 103.9 92.4 122.3 73.7 48.8 100.0 128.2 162.5 73.1 89.9 25.0 16.9
## [13] 152.3 136.6 78.6 91.4 112.0 83.9 97.5 98.5 99.2 44.0 48.9 105.8
## [25] 81.2
The second function helping you to summarize your data in the
mFD
package is mFD::asb.sp.summary()
. It
summarizes the baskets_fruits_weights
matrix and returns a
list gathering a matrix, a list and several vectors:
a matrix of species occurrences
a vector gathering species total biomass in all assemblages
a vector gathering the total abundance/biomass per assemblage
a vector gathering species richness per assemblage
a list gathering species names present in each assemblage
USAGE
# Summary of the assemblages * species dataframe:
asb_sp_fruits_summ <- mFD::asb.sp.summary(asb_sp_w = baskets_fruits_weights)
## apple apricot banana currant blackberry blueberry cherry grape
## basket_1 1 0 1 0 0 0 1 0
## basket_2 1 0 1 0 0 0 1 0
## basket_3 1 0 1 0 0 0 1 0
## grapefruit kiwifruit lemon lime litchi mango melon orange
## basket_1 0 0 1 0 0 0 1 0
## basket_2 0 0 1 0 0 0 1 0
## basket_3 0 0 1 0 0 0 1 0
## passion_fruit peach pear pineapple plum raspberry strawberry tangerine
## basket_1 1 0 1 0 0 0 1 0
## basket_2 1 0 1 0 0 0 1 0
## basket_3 1 0 1 0 0 0 1 0
## water_melon
## basket_1 0
## basket_2 0
## basket_3 0
## apple apricot banana currant blackberry
## 1850 200 1400 300 400
## blueberry cherry grape grapefruit kiwifruit
## 300 950 900 300 400
## lemon lime litchi mango melon
## 1200 400 300 700 1500
## orange passion_fruit peach pear pineapple
## 900 300 600 1900 1000
## plum raspberry strawberry tangerine water_melon
## 550 900 1650 300 800
## basket_1 basket_2 basket_3 basket_4 basket_5 basket_6 basket_7 basket_8
## 2000 2000 2000 2000 2000 2000 2000 2000
## basket_9 basket_10
## 2000 2000
## basket_1 basket_2 basket_3 basket_4 basket_5 basket_6 basket_7 basket_8
## 8 8 8 8 8 8 8 8
## basket_9 basket_10
## 8 8
## apple banana cherry lemon melon
## 1 1 1 1 1
## passion_fruit pear strawberry
## 1 1 1
If you have many species described by few categorical and ordinal traits only, then you might want to group them into Functional Entities (FE), i.e groups of species with same trait values when species are described with categorical and/or ordinal traits. It is particularly useful when using large datasets with “functionally similar” species.
In this tutorial, this function is not illustrated (FE for the fruits dataset have a single species) and thus functional diversity indices based on FE are not computed. You can have a look to the Compute Functional Diversity Indices based on Functional Entities tutorial for further analysis using FE.
mFD
also allows the user to compute FD indices based on
Functional Entities (FEs). Computed indices are Functional
Redundancy (FRed), Functional OverRedundancy
(FORed) and Functional Vulnerability (FVuln)
(Mouillot
et al. 2014). The fruits & baskets
example does not allow to compute FEs, thus FD indices based on FEs can
not be compute. Check the Compute
functional diversity indices based on Functional Entities tutorial
to see how to compute them.
The next step toward the computation of functional diversity indices is to estimate functional traits-based distances between species in order to build the functional space in which indices will be computed.
To compute trait-based distances, we will use the
mFD::funct.dist()
function which includes the following
arguments:
USAGE
sp_dist_fruits <- mFD::funct.dist(
sp_tr = fruits_traits,
tr_cat = fruits_traits_cat,
metric = "gower",
scale_euclid = "scale_center",
ordinal_var = "classic",
weight_type = "equal",
stop_if_NA = TRUE)
sp_tr
is the species x trait data frame
tr_cat
is the data frame summarizing trait type for
each trait
metric
is a character string referring to the metric
used to compute distances. Two metrics are available and the
choice depends on your traits data:
if all traits are continuous use the
Euclidean distance (metric = "euclidean"
)
and check the Compute
Functional Diversity Indices based on Only Continuous Traits
tutorial which explains how to build a multidimensional space from
traits through PCA analysis or considering directly each trait as a
dimension.
if you have non-continuous traits use the
Gower distance (metric = "gower"
) as this
method allows traits weighting. This method can also deal with fuzzy
traits.
scale_euclid
is a character string referring to the
way the user wants to scale euclidean traits. You can
either chose to scale by range range
, use the center
transformation center
, use the scale transformation
scale
, use the scale-center transformation
scale_center
or you can chose not to scale
noscale
.
ordinal_var
is a character string specifying the
method to be used for ordinal variables (i.e. ordered). You can
either chose to treat ordinal variables as continuous variables (with
"classic"
option) or to treat ordinal variables as ranks
(with metric
or podani
options, see
mFD::funct.dist()
help file for details).
weight_type
is a character string referring to the
type of method to weight traits. You can either chose to define weights
using the tr_cat
dataframe (cf step 1.1)
(user
option) or you can chose to give the same weight to
all traits (equal
option). (NB Using
mFD
, you can not define weights for fuzzy traits, use gawdis
package instead) (NB If you only have continuous traits
(see the Continuous
traits Framework: using up to the 1.0.6.9 version of the
mFD
package does not allow weighting, it will be done in a
next version of the package. You can use the col.w
argument of the PCA function of the FactomineR package.)
stop_if_NA
is a logical value to stop or not the
process if the sp_tr
data frame contains NA. If the
sp_tr
data frame contains NA
you can either
chose to compute anyway functional distances (but keep in mind that
Functional measures are sensitive to missing traits!)
or you can delete species with missing or extrapolate missing traits
(see Johnson
et al. (2020)).
NB If your data gather a high number of species and/or traits, this function might take time to run (and you might have memory issues).
This function returns a dist
object with traits-based
distances between all pairs of species:
## apple apricot banana currant blackberry blueberry cherry grape
## apricot 0.166
## banana 0.375 0.541
## currant 0.391 0.426 0.767
## blackberry 0.376 0.410 0.751 0.084
## blueberry 0.355 0.410 0.731 0.236 0.320
## cherry 0.233 0.099 0.558 0.425 0.409 0.389
## grape 0.380 0.446 0.705 0.372 0.356 0.336 0.347
## grapefruit 0.192 0.327 0.268 0.501 0.483 0.537 0.426 0.573
## kiwifruit 0.219 0.353 0.595 0.372 0.356 0.364 0.453 0.200
## lemon 0.208 0.343 0.384 0.517 0.433 0.553 0.442 0.589
## lime 0.370 0.404 0.345 0.578 0.494 0.614 0.503 0.650
## litchi 0.466 0.332 0.391 0.658 0.642 0.622 0.233 0.514
## mango 0.395 0.361 0.220 0.786 0.771 0.750 0.362 0.686
## melon 0.285 0.419 0.560 0.407 0.391 0.229 0.518 0.465
## orange 0.117 0.251 0.292 0.474 0.459 0.462 0.351 0.498
## passion_fruit 0.461 0.527 0.414 0.553 0.537 0.516 0.572 0.319
## peach 0.127 0.062 0.503 0.464 0.448 0.472 0.161 0.508
## pear 0.009 0.157 0.384 0.383 0.367 0.353 0.242 0.389
## pineapple 0.557 0.708 0.233 0.734 0.718 0.502 0.791 0.738
## plum 0.156 0.009 0.532 0.435 0.419 0.401 0.090 0.437
## raspberry 0.382 0.416 0.758 0.091 0.007 0.327 0.416 0.363
## strawberry 0.376 0.410 0.751 0.284 0.200 0.120 0.409 0.356
## tangerine 0.153 0.218 0.323 0.444 0.428 0.408 0.281 0.428
## water_melon 0.281 0.415 0.556 0.410 0.395 0.226 0.515 0.462
## grapefruit kiwifruit lemon lime litchi mango melon orange
## apricot
## banana
## currant
## blackberry
## blueberry
## cherry
## grape
## grapefruit
## kiwifruit 0.373
## lemon 0.116 0.389
## lime 0.277 0.550 0.161
## litchi 0.459 0.686 0.475 0.336
## mango 0.287 0.614 0.403 0.364 0.172
## melon 0.308 0.266 0.424 0.585 0.751 0.580
## orange 0.075 0.302 0.091 0.252 0.384 0.312 0.368
## passion_fruit 0.453 0.280 0.470 0.331 0.405 0.434 0.546 0.378
## peach 0.265 0.308 0.281 0.442 0.394 0.322 0.357 0.210
## pear 0.184 0.210 0.200 0.361 0.475 0.404 0.276 0.108
## pineapple 0.435 0.562 0.551 0.512 0.624 0.452 0.327 0.460
## plum 0.336 0.363 0.352 0.413 0.323 0.351 0.428 0.261
## raspberry 0.490 0.363 0.426 0.487 0.649 0.777 0.398 0.465
## strawberry 0.483 0.356 0.433 0.494 0.642 0.770 0.191 0.458
## tangerine 0.145 0.372 0.161 0.222 0.314 0.342 0.437 0.070
## water_melon 0.311 0.262 0.427 0.588 0.748 0.576 0.004 0.364
## passion_fruit peach pear pineapple plum raspberry strawberry
## apricot
## banana
## currant
## blackberry
## blueberry
## cherry
## grape
## grapefruit
## kiwifruit
## lemon
## lime
## litchi
## mango
## melon
## orange
## passion_fruit
## peach 0.589
## pear 0.470 0.119
## pineapple 0.419 0.670 0.551
## plum 0.518 0.071 0.152 0.701
## raspberry 0.543 0.455 0.373 0.725 0.426
## strawberry 0.537 0.448 0.367 0.518 0.419 0.207
## tangerine 0.309 0.280 0.161 0.510 0.209 0.435 0.428
## water_melon 0.542 0.354 0.272 0.324 0.425 0.401 0.194
## tangerine
## apricot
## banana
## currant
## blackberry
## blueberry
## cherry
## grape
## grapefruit
## kiwifruit
## lemon
## lime
## litchi
## mango
## melon
## orange
## passion_fruit
## peach
## pear
## pineapple
## plum
## raspberry
## strawberry
## tangerine
## water_melon 0.434
In order to generate a multidimensional space in which functional
diversity indices are computed (Mouillot
et al. 2013, we will perform a PCoA using the trait-based
distances (and if required a functional dendrogram). mFD
evaluates the quality of PCoA-based multidimensional spaces according to
the deviation between trait-based distances and distances in the
functional space (extension of Maire
et al. (2015) framework). For that, we will use the
mFD::quality.fspaces()
function:
USAGE
fspaces_quality_fruits <- mFD::quality.fspaces(
sp_dist = sp_dist_fruits,
maxdim_pcoa = 10,
deviation_weighting = "absolute",
fdist_scaling = FALSE,
fdendro = "average")
sp_dist
is the dist
object with
pairwise trait-based distance between species as computed in
step 3
maxdim_pcoa
is the maximum number of PCoA axes to
consider to build multidimensional spaces. Actually, the maximum number
of dimensions considered depends on the number of PCoA axes with
positive eigenvalues.
deviation_weighting
refers to the method(s) used to
weight the difference between species pairwise distances in the
functional space and trait-based distances. You can chose
between:
absolute
: absolute differences are used to compute the
mean absolute deviation (mad) . It reflects the actual
magnitude of errors that will affect FD metrics.squared
: squared differences are used to compute the
root of mean square deviation (rmsd). This weighting
puts more weight to the large deviations between trait-based distances
and distances in the functional space. misplaced in the functional
space.deviation_weighting = c("absolute", "squared")
.fdist_scaling
specifies whether distances in the
functional space should be scaled before computing differences with
trait-based distances. Scaling ensures that trait-based distances and
distances in the functional space have the same maximum. Scaling
distances implies that the quality of the functional space accounts for
congruence in distances rather than their equality.
NOTE The combination of
deviation_weighting
and fdist_scaling
arguments leads to four possible quality metrics:
mad
, rmsd
, mad_scaled
and
rmsd_scaled
fdendro
specifies the clustering algorithm to compute a
functional dendrogram. NULL
means no dendrogram computed.
The chosen algorithm must be one of the method recognized by the
stats::hclust()
function from the stats
package.This function returns a list various objects:
## mad
## pcoa_1d 0.150
## pcoa_2d 0.073
## pcoa_3d 0.047
## pcoa_4d 0.040
## pcoa_5d 0.049
## pcoa_6d 0.055
## pcoa_7d 0.060
## pcoa_8d 0.064
## pcoa_9d 0.065
## pcoa_10d 0.065
## tree_average 0.082
NOTE The space with the best quality has the lowest quality metric. Here, thanks to mad values, we can see that the 4D space is the best one. That is why the following of this tutorial will use this multidimensional space.
With the mFD
package, it is possible to illustrate the
quality of PCoA-based multidimensional spaces according to deviation
between trait-based distances and distances in the functional space. For
that, we use the mFD::quality.fspace.plot()
function with
the following arguments:
Note: You might encounter the following error while
doing plot with mFD
:
Error in Ops.data.frame(guide_loc, panel_loc) : # ‘==’ only defined for equally-sized data frames}
This error is due to a update of the patchwork
package, to
be able to run the plots, please update the patchwork
package to vers. 1.2.0 at least.
USAGE
mFD::quality.fspaces.plot(
fspaces_quality = fspaces_quality_fruits,
quality_metric = "mad",
fspaces_plot = c("tree_average", "pcoa_2d", "pcoa_3d",
"pcoa_4d", "pcoa_5d", "pcoa_6d"),
name_file = NULL,
range_dist = NULL,
range_dev = NULL,
range_qdev = NULL,
gradient_deviation = c(neg = "darkblue", nul = "grey80", pos = "darkred"),
gradient_deviation_quality = c(low = "yellow", high = "red"),
x_lab = "Trait-based distance")
fspaces_quality
is the output of the
mFD::quality.fspaces()
function (step
4.1).
quality_metric
refers to the quality metric used. It
should be one of the column name(s) of the table gathering quality
metric values (output of mFD::quality.fspaces()
called
quality_fspaces
) (here:
fspaces_quality_fruits$quality_fspaces
) Thus it can be:
mad
, rmsd
, mad_scaled
or
rmsd_scaled
(see step 4.1)
fspaces_plot
refers to the names of spaces for which
quality has to be illustrated (up to 10). Names are those used in the
output of mFD::quality.fspaces()
function showing the
values of the quality metric.
name_file
refers to the name of file to save
(without extension) if the user wants to save the figure. If the user
only wants the plot to be displayed, then
name_file = NULL
.
range_dist
, range_dev
,
range_qdev
are arguments to set ranges of panel axes (check
function help for further information).
gradient_deviation
and
gradient_deviation_quality
are arguments to set points
colors (check function help for further information).
xlab
is a parameter to set x-axis label.
This function generates a figure with three panels (in rows) for each selected functional space (in columns). Each column represents a functional space, the value of the quality metric is written on the top of each column. The x-axis of all panels represents trait-based distances. The y-axis is different for each row:
mFD::quality.fspaces.plot(
fspaces_quality = fspaces_quality_fruits,
quality_metric = "mad",
fspaces_plot = c("tree_average", "pcoa_2d", "pcoa_3d",
"pcoa_4d", "pcoa_5d", "pcoa_6d"),
name_file = NULL,
range_dist = NULL,
range_dev = NULL,
range_qdev = NULL,
gradient_deviation = c(neg = "darkblue", nul = "grey80", pos = "darkred"),
gradient_deviation_quality = c(low = "yellow", high = "red"),
x_lab = "Trait-based distance")
For the 2D space, on the top row there are a lot of points below the 1:1 lines, meaning that distances are overestimated in this multidimensional space. Looking at panels, we can see that the 4D space is the one in which points are the closest to the 1:1 line on the top row,and the closest to the x-axis for the two bottom rows, which reflects a better quality compared to other functional spaces / dendrogram. For the dendrogram, we can see on the top row that species pairs arrange in horizontal lines, meaning that different trait-based distances have then the same cophenetic distance on the dendrogram.
NOTE To know more and better understand how to interpret quality of functional spaces, you should read the Compute and Interpret Quality of Functional Space tutorial.
mFD
allows to test for correlations between traits and
functional axes and then illustrate possible correlations. For
continuous traits, a linear model is computed and r2 and associated
p-value are returned. For non-continuous traits, a Kruskal-Wallis test
is computed and eta2 statistic is returned. The function
mFD::traits.faxes.cor()
allows to test and plot correlation
and needs the following arguments:
sp_tr
is the species x traits data framesp_faxes_coord
is a matrix of species coordinates taken
from the outputs of the mFD::quality.fspaces()
function
with columns representing axes on which functional space must be
computed. For instance, in this tutorial, we will plot the
functional space for 4 and 10 dimensions (cf. the two examples
below). The whole sp_faxes_coord
can be retrieved through
the output of the mFD::quality.fspaces()
function:
plot
is a logical value indicating whether correlations
should be illustrated or not. If this option is set to
TRUE
, traits-axis relationships are plotted through
scatterplot for continuous traits and boxplot for non-continuous
traits.mFD::traits.faxes.cor
works as follows:
USAGE
fruits_tr_faxes <- mFD::traits.faxes.cor(
sp_tr = fruits_traits,
sp_faxes_coord = sp_faxes_coord_fruits[ , c("PC1", "PC2", "PC3", "PC4")],
plot = TRUE)
We can print only traits with significant effect on position
along one of the axis and look at the plots:
# Print traits with significant effect:
fruits_tr_faxes$"tr_faxes_stat"[which(fruits_tr_faxes$"tr_faxes_stat"$"p.value" < 0.05), ]
## trait axis test stat value p.value
## 1 Size PC1 Kruskal-Wallis eta2 0.308 0.0377
## 3 Size PC3 Kruskal-Wallis eta2 0.326 0.0325
## 5 Plant PC1 Kruskal-Wallis eta2 0.471 0.0049
## 6 Plant PC2 Kruskal-Wallis eta2 0.382 0.0116
## 8 Plant PC4 Kruskal-Wallis eta2 0.264 0.0360
## 9 Climate PC1 Kruskal-Wallis eta2 0.731 0.0001
## 13 Seed PC1 Kruskal-Wallis eta2 0.201 0.0402
## 14 Seed PC2 Kruskal-Wallis eta2 0.593 0.0005
## 20 Sugar PC4 Linear Model r2 0.682 0.0000
We can thus see that PC1 is mostly driven by Climate (temperate on the left and tropical on the right) and Plant Type (forb & shrub on the left vs tree & vine on the right) and Size (large fruits on the right) with weaker influence of Seed (eta2 < 0.25). Then, PC2 is mostly driven by Seed (no seed on the left and pit seed on the right) with weaker influence of Plant Type. PC3 is driven by only one trait, Size. And finally PC4 is mostly driven by Sugar (high sugar content on the right and low sugar content on the left) with a weaker influence of Plant Type.
Once the user has selected the dimensionality of the functional
space, mFD
allows you to plot the given multidimensional
functional space and the position of species in all 2-dimensions spaces
made by pairs of axes.
The mFD::funct.space.plot()
function allows to
illustrate the position of all species along pairs of space axes.
This function allows to plot with many possibilities to change colors/shapes of each plotted element. Here are listed the main arguments:
sp_faxes_coord
is a matrix of species coordinates taken
from the outputs of the mFD::quality.fspaces()
function
with columns representing axes on which functional space must be
computed. For instance, in this tutorial, we will plot the
functional space for 4 and 10 dimensions (cf. the two examples
below). The whole sp_faxes_coord
can be retrieved through
the output of the mFD::quality.fspaces()
function:faxes
is a vector containing names of axes to plot.
If set to NULL
, the first four functional axes will be
plotted.
faxes_nm
is a vector containing labels of
faxes
(following faxes vector rank). If NULL
,
labels follow faxes
vector names.
range_faxes
is a vector to complete if the user
wants to set specific limits for functional axes. If
range_faxes = c(NA, NA)
, the range is computed according to
the range of values among all axes.
plot_ch
is a logical value used to draw or not the
2D convex-hull filled by the global pool of species. Color, fill and
opacity of the convex hull can be chosen through other inputs , please
refer to the function’s help.
plot_sp_nm
is a vector containing species names to
plot. If NULL
, no species names plotted. Name size, color
and font can be chosen through other inputs, please refer to the
function’s help.
plot_vertices
is a logical value used to plot or not
vertices with a different shape than other species. Be
careful: these representations are 2D representations, thus
vertices of the convex-hull in the n-multidimensional space can be close
to the center of the hull projected in 2D. Color, fill, shape and size
of vertices can be chosen through other inputs, please refer to the
function’s help.
color_bg
is a R color or an hexadecimal color code
referring to the color of the background of the plot.
other inputs are used to chose color, fill, size, and shape of species from the global pool, please refer to the function’s help.
check_input
is a recurrent argument in the
mFD
package. It defines whether inputs should be checked
before computation or not. Possible error messages will thus be more
understandable for the user than R error messages
(Recommendation: set it as TRUE
).
Here are the plots for the fruits & baskets dataset for the first four PCoA axis:
USAGE
big_plot <- mFD::funct.space.plot(
sp_faxes_coord = sp_faxes_coord_fruits[ , c("PC1", "PC2", "PC3", "PC4")],
faxes = c("PC1", "PC2", "PC3", "PC4"),
name_file = NULL,
faxes_nm = NULL,
range_faxes = c(NA, NA),
color_bg = "grey95",
color_pool = "darkgreen",
fill_pool = "white",
shape_pool = 21,
size_pool = 1,
plot_ch = TRUE,
color_ch = "black",
fill_ch = "white",
alpha_ch = 0.5,
plot_vertices = TRUE,
color_vert = "blueviolet",
fill_vert = "blueviolet",
shape_vert = 23,
size_vert = 1,
plot_sp_nm = NULL,
nm_size = 3,
nm_color = "black",
nm_fontface = "plain",
check_input = TRUE)
Here, the convex-hull of the species pool is plotted in white and axis have the same range to get rid of bias based on different axis scales. Species beign vertices of the 4D convex hull are in purple.
Here are the plots for the fruits & baskets dataset for the first ten PCoA axis:
big_plot <- mFD::funct.space.plot(
sp_faxes_coord = sp_faxes_coord_fruits,
faxes = NULL,
name_file = NULL,
faxes_nm = NULL,
range_faxes = c(NA, NA),
color_bg = "grey95",
color_pool = "darkgreen",
fill_pool = "white",
shape_pool = 21,
size_pool = 1,
plot_ch = TRUE,
color_ch = "black",
fill_ch = "white",
alpha_ch = 0.5,
plot_vertices = TRUE,
color_vert = "blueviolet",
fill_vert = "blueviolet",
shape_vert = 23,
size_vert = 1,
plot_sp_nm = NULL,
nm_size = 3,
nm_color = "black",
nm_fontface = "plain",
check_input = TRUE)
# Plot the graph with all pairs of axes:
big_plot$patchwork
Here, all the species are vertices compared with the last example with only four dimensions.
The mFD::alpha.fd.multidim()
function allows computing
many alpha FD indices:
USAGE
alpha_fd_indices_fruits <- mFD::alpha.fd.multidim(
sp_faxes_coord = sp_faxes_coord_fruits[ , c("PC1", "PC2", "PC3", "PC4")],
asb_sp_w = baskets_fruits_weights,
ind_vect = c("fdis", "fmpd", "fnnd", "feve", "fric", "fdiv", "fori",
"fspe", "fide"),
scaling = TRUE,
check_input = TRUE,
details_returned = TRUE)
## basket_1 done 10%
## basket_2 done 20%
## basket_3 done 30%
## basket_4 done 40%
## basket_5 done 50%
## basket_6 done 60%
## basket_7 done 70%
## basket_8 done 80%
## basket_9 done 90%
## basket_10 done 100%
The arguments and their use are listed below:
sp_faxes_coord
is the species coordinates matrix.
This dataframe gathers only axis of the functional space you have chosen
based on step 4.
asb_sp_w
is the matrix linking species and
assemblages they belong to (summarized in step
1).
ind_vect
is a vector with names of diversity
functional indices to compute. FD indices computed in the
mFD
package can be (explanations based on (Mouillot
et al. 2013):
FDis
Functional Dispersion: the
biomass weighted deviation of species traits values from the center of
the functional space filled by the assemblage i.e. the
biomass-weighted mean distance to the biomass-weighted mean trait values
of the assemblage.
FRic
Functional Richness: the
proportion of functional space filled by species of the studied
assemblage, i.e. the volume inside the convex-hull shaping
species. To compute FRic
the number of species must be at
least higher than the number of functional axis + 1.
FDiv
Functional Divergence: the
proportion of the biomass supported by the species with the most extreme
functional traits i.e. the ones located close to the edge of
the convex-hull filled by the assemblage.
FEve
Functional Evenness: the
regularity of biomass distribution in the functional space using the
Minimum Spanning Tree linking all species present in the
assemblage.
FSpe
Functional Specialization: the
biomass weighted mean distance to the mean position of species from the
global pool (present in all assemblages).
FMPD
Functional Mean Pairwise
Distance: the mean weighted distance between all species
pairs.
FNND
Functional Mean Nearest Neighbour
Distance: the weighted distance to the nearest neighbor within
the assemblage.
FIde
Functional Identity: the mean
traits values for the assemblage. FIde
is always computed
when FDis
is computed.
FOri
Functional Originality: the
weighted mean distance to the nearest species from the global species
pool.
scaling
is a logical value indicating whether
indices should be scaled between 0 and 1. If scaling is to be done, this
argument must be set to TRUE
.
check_input
is a recurrent argument in the
mFD
package. It defines whether inputs should be checked
before computation or not. Possible error messages will thus be more
understandable for the user than R error messages
(Recommendation: set it as TRUE
).
details_returned
is used if the user wants to store
information that are used in graphical functions. If the user wants to
plot FD indices, then details_returned
must be set to
TRUE
.
NB Use lowercase letters to enter FD indices names
The function has two main outputs:
FIde
values, there are as many
columns as there are axes to the studied functional space).## sp_richn fdis fmpd fnnd feve fric fdiv
## basket_1 8 0.4763773 0.6255537 0.4050890 0.565326 0.162830681 0.5514453
## basket_2 8 0.7207823 0.7204459 0.6604092 0.754999 0.162830681 0.8064809
## basket_3 8 0.7416008 0.7274367 0.6748312 0.805534 0.162830681 0.8089535
## basket_4 8 0.2958614 0.3426258 0.2258304 0.759802 0.007880372 0.6080409
## basket_5 8 0.3673992 0.3782650 0.2922436 0.843120 0.007880372 0.7288912
## basket_6 8 0.8001980 0.7838356 0.7295674 0.814829 0.147936148 0.8937934
## basket_7 8 0.8121314 0.8092985 0.7566157 0.827061 0.147936148 0.8989094
## basket_8 8 0.4678159 0.5182996 0.3618776 0.566161 0.036480112 0.7113688
## basket_9 8 0.5577452 0.5566262 0.4563761 0.675735 0.036480112 0.7787237
## basket_10 8 0.5505783 0.5501381 0.4118548 0.660085 0.025774304 0.7741681
## fori fspe fide_PC1 fide_PC2 fide_PC3 fide_PC4
## basket_1 0.2024008 0.4127138 -0.01473662 -0.009461738 -0.05670043 -0.001823969
## basket_2 0.2788762 0.5781232 0.01887361 -0.061601373 -0.04427402 0.021249327
## basket_3 0.3067367 0.5888104 0.04724418 -0.056571400 -0.03631846 0.018045257
## basket_4 0.1766279 0.3106937 0.03994897 0.052581211 -0.08413271 -0.001343112
## basket_5 0.2165945 0.3488358 0.02349573 0.039069220 -0.08187248 -0.010262902
## basket_6 0.6071369 0.7930809 0.24320913 -0.114434642 0.01394977 0.025500282
## basket_7 0.4841824 0.7443406 0.13341179 -0.183609095 -0.01782549 0.021494300
## basket_8 0.2538185 0.6363814 -0.24497368 0.036194656 0.04748935 -0.038827673
## basket_9 0.3126927 0.6309078 -0.21021559 0.029339706 0.05516746 -0.041392184
## basket_10 0.1799705 0.4587432 -0.05375867 -0.005743348 -0.05649324 0.041191011
Then, you can plot functional indices using the
mFD::alpha.multidim.plot()
function as follows:
USAGE
plots_alpha <- mFD::alpha.multidim.plot(
output_alpha_fd_multidim = alpha_fd_indices_fruits,
plot_asb_nm = c("basket_1", "basket_5"),
ind_nm = c("fdis", "fide", "fnnd", "feve", "fric",
"fdiv", "fori", "fspe"),
faxes = NULL,
faxes_nm = NULL,
range_faxes = c(NA, NA),
color_bg = "grey95",
shape_sp = c(pool = 3, asb1 = 21, asb2 = 21),
size_sp = c(pool = 0.7, asb1 = 1, asb2 = 1),
color_sp = c(pool = "grey50", asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
color_vert = c(pool = "grey50", asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
fill_sp = c(pool = NA, asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
fill_vert = c(pool = NA, asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
color_ch = c(pool = NA, asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
fill_ch = c(pool = "white", asb1 = "#1F968BFF", asb2 = "#DCE319FF"),
alpha_ch = c(pool = 1, asb1 = 0.3, asb2 = 0.3),
shape_centroid_fdis = c(asb1 = 22, asb2 = 24),
shape_centroid_fdiv = c(asb1 = 22, asb2 = 24),
shape_centroid_fspe = 23,
color_centroid_fspe = "black",
size_sp_nm = 3,
color_sp_nm = "black",
plot_sp_nm = NULL,
fontface_sp_nm = "plain",
save_file = FALSE,
check_input = TRUE)
As you can see, this function has a lot of arguments: most of them are graphical arguments allowing the user to chose colors, shapes, sizes, scales, etc. This tutorial only presents main arguments. To learn about the use of graphical arguments, check the function help file. The main arguments of this function are listed below:
output_alpha_fd_multidim
is the output of the
`mFD::alpha.fd.multidim()
function.
plot_asb_nm
is a vector gathering name(s) of
assemblage(s) to plot.
ind_vect
is a vector gathering FD indices to plot.
Plots are available for FDis
, FIde
,
FEve
, FRic
, FDiv
,
FOri
, FSpe
, and FNND.
faxes
is a vector containing names of axes to plot.
You can only plot from two to four axes labels for graphical
reasons.
faxes_nm
is a vector with axes labels if the user
ants different axes labels than faxes
ones.
range_faxes
is a vector with minimum and maximum
values for axes. If range_faxes = c(NA, NA)
, the range is
computed according to the range of values among all axes, all axes
having thus the same range. To have a fair representation of species
positions in all plots, all axes must have the same range.
plot_sp_nm
is a vector containing species names to
plot. If NULL
, then no name is plotted.
size, color, fill, and shape arguments for each component of the
graphs i.e. species of the global pool, species of the studied
assemblage(s), vertices, centroids and segments. If you have to plot two
assemblages, then inputs should be formatted as follow:
c(pool = ..., asb1 = ..., asb2 = ...)
for inputs used for
global pool and studied assemblages and
c(asb1 = ..., asb2 = ...)
for inputs used for studied
assemblages only.
check_input
is a recurrent argument in
mFD
. It defines whether inputs should be checked before
computation or not. Possible error messages will thus be more
understandable for the user than R error messages
(Recommendation: set it as TRUE
.
Then, using these arguments, here are the output plots for the fruits & baskets dataset:
FRic
representation: the colored shapes reflect the
convex-hull of the studied assemblages and the white shape reflects the
convex-hull of the global pool of species:FDiv
representation: the gravity centers of
vertices (i.e. species with the most extreme functional
traits) of each assemblages are plotted as a square and a triangle.
Species of each assemblage have different size given their relative
weight into the assemblage.FSpe
representation: colored traits represent distances
of each species from a given assemblage to the center of gravity of the
global pool (i.e center of the functional space). the center of gravity
is plotted with a purple diamond. Species of each assemblage have
different size given their relative weight into the assemblage.FDis
representation: colored traits represent distances
of each species from a given assemblage to the center of gravity of
species of the assemblage (defined by FIde values). The center of
gravity of each assemblage is plotted using a square and a triangle.
Species of each assemblage havedifferent size given their relative
weight into the assemblage.FIde
representation:colored lines refer to the weighted
average position of species of each assemblage along each axis. Species
of each assemblage have different size given their relative weight into
the assemblage.FEve
representation: colored traits represent the
Minimum Spanning Tree linking species of each assemblage. Species of
each assemblage have different size given their relative weight into the
assemblage.FOri
representation: colored arrows represent the
distances of each species from each assemblage to the nearest species in
the global species pool. Species of each assemblage have different size
given their relative weight into the assemblage.FNND
representation: colored arrows represent the
distances of each species from each assemblage to the nearest species in
the studied assemblage. Species of each assemblage have different size
given their relative weight into the assemblage.NOTE: Some Mac OS X 10.15 may encounter some issues with the beta_*() functions.
mFD
package allows you to compute beta diversity indices
for each assemblage pairs following Villeger
et al. 2013. For that we will use the
mFD::beta.fd.multidim()
function.
NOTE This function can compute two families of functional beta diversity indices, either Jaccard or Sorensen.
In this example, we will use Jaccard index. For each assemblages pair, the dissimilarity index is decomposed into two additive components: turnover and nestedness-resultant. NB The turnover component is the highest if there is no shared traits combination between the two assemblages. The nestedness component is the highest if one assemblage hosts a small subset of the functional strategies present in the other.
The mFD::beta.fd.multidim()
function has the main
following arguments:
USAGE
beta_fd_indices_fruits <- mFD::beta.fd.multidim(
sp_faxes_coord = sp_faxes_coord_fruits[ , c("PC1", "PC2", "PC3", "PC4")],
asb_sp_occ = asb_sp_fruits_occ,
check_input = TRUE,
beta_family = c("Jaccard"),
details_returned = TRUE)
sp_faxes_coord
is the species coordinates matrix.
This dataframe gathers only axis of the functional
space you have chosen based on step 4.
asb_sp_occ
is the matrix of occurrence (coded as
0/1) of species assemblages (summarized in step
1).
check_input
is a recurrent argument in the
mFD
package. It defines whether inputs should be checked
before computation or not. Possible error messages will thus be more
understandable for the user than R error messages
(Recommendation: set it as TRUE
.
beta_family
a character string for the type of
beta-diversity index to compute, it can either be Jaccard
or Sorensen
.
details_returned
is a logical value indicating
whether details of outputs must be stored. It should be stored if you
plan to use the graphical function to illustrate beta diversity indices
thereafter.
There are also other arguments for parallelisation options. Check the function help file for more explanation.
The function returns a list containing:
a vector containing the FRic
value for each
assemblage retrieved through the details_beta
list
a list of vectors containing names of species being vertices of
the convex hull for each assemblage retrieved through the
details_beta
list
Then, the package allows the user to illustrate functional
beta-diversity indices for a pair of assemblages in a multidimensional
space using the mFD::beta.multidim.plot()
function. The
output of this function is a figure showing the overlap between convex
hulls shaping each of the two species assemblages.
The plotting function has a large number of arguments, allowing the user to chose graphical options. Arguments are listed below:
USAGE
beta_plot_fruits <- mFD::beta.multidim.plot(
output_beta_fd_multidim = beta_fd_indices_fruits,
plot_asb_nm = c("basket_1", "basket_4"),
beta_family = c("Jaccard"),
plot_sp_nm = c("apple", "lemon", "pear"),
faxes = paste0("PC", 1:4),
name_file = NULL,
faxes_nm = NULL,
range_faxes = c(NA, NA),
color_bg = "grey95",
shape_sp = c("pool" = 3.0, asb1 = 22, asb2 = 21),
size_sp = c("pool" = 0.8, asb1 = 1, asb2 = 1),
color_sp = c("pool" = "grey50", asb1 = "blue", asb2 = "red"),
fill_sp = c("pool" = NA, asb1 = "white", asb2 = "white"),
fill_vert = c("pool" = NA, asb1 = "blue", asb2 = "red"),
color_ch = c("pool" = NA, asb1 = "blue", asb2 = "red"),
fill_ch = c("pool" = "white", asb1 = "blue", asb2 = "red"),
alpha_ch = c("pool" = 1, asb1 = 0.3, asb2 = 0.3),
nm_size = 3,
nm_color = "black",
nm_fontface = "plain",
check_input = TRUE)
output_beta_fd_multidim
is the output of the
mFD::beta.fd.multidim()
function retrieved before as
beta_fd_indices
.
plot_asb_nm
is a vector containing the name of the
two assemblages to plot. Here plots of indices will be shown for
basket_1 and basket_4.
beta_family
refers to the family of the plotted
index. It must be the same as the family chosen to compute beta
functional indices values with the mFD::beta.fd.multidim()
function.
plot_sp_nm
is a vector containing the names of
species the user want to plot, if any. If no the user does not want to
plot any species name, then this argument must be set up to
NULL
. Here, apple, cherry and
lemon will be plotted on the graph.
faxes
is a vector containing the names of the
functional axes of the plotted functional space. Here, the figure will
be plotted for PC1, PC2 and PC3. This
function allows you to plot between two and four axes for graphical
reasons.
name_file
is a character string with the name of the
file to save the figure (without extension). If the user does not want
to save the file and only display it, this argument must be set up to
NULL
.
faxes_nm
is a vector containing the axes labels for
the figure if the user wants to set up different labels than those
contained in faxes
.
range_faxes
is a vector with minimum and maximum
values of functional axes. To have a fair representation of the position
of species in all plots, axes should have the same range. If the user
wants the range to be computed according to the range of values among
all axes, this argument must be set up to
c(NA, NA)
.
check_input
is a recurrent argument in the
mFD
package. It defines whether inputs should be checked
before computation or not. Possible error messages will thus be more
understandable for the user than R error messages
(Recommendation: set it as TRUE
)
Others arguments to set up colors, shapes, sizes and, text fonts are also available. For more information about them, read the function help file.
Then, the function returns each graph for each functional axes combination and also a multipanel plot with all combinations of axes and the graph caption.
For each assemblage, the associated convex hull is plotted in a different colour and indices values are printed on the right corner of the plot. Vertices of the convex hull of a given assemblage can be plotted with a different symbol such as in this example. Species of all assemblages are plotted with gray cross and the associated convex hull is plotted in white.
Johnson et al. (2020) Handling missing values in trait data. Global Ecology and Biogeography, 30, 51-62.
Maire et al. (2015) How many dimensions are needed to accurately assess functional diversity? A pragmatic approach for assessing the quality of functional spaces. Global Ecology and Biogeography, 24, 728-740.
Mouillot et al. (2013) A functional approach reveals community responses to disturbances. Trends in Ecology and Evolution, 28, 167-177.
Mouillot et al. (2014) Functional over-redundancy and high functional vulnerability in global fish faunas on tropical reefs. PNAS, 38, 13757-13762.