1. Introduction
1.1. Ecological resilience and the EDR framework
Ecological resilience is defined as the ability of
ecological systems to tolerate disturbances and still maintain the same
relationships between state variables (Holling, 1973; Annu.
Rev. Ecol. Evol. Syst., https://doi.org/10.1146/annurev.es.04.110173.000245).
Measuring ecological resilience requires considering two important
components: the dynamic trends of the system, including its cyclic
behaviors, and the random forces representing positive and negative
feedback relationships between the components of the system (Holling,
1973). As such, assessing ecological resilience must account for the
system dynamic regimes.
An ecological dynamic regime (EDR) is defined as the
“fluctuations of an ecological system around some trend or average
resulting from the interaction between internal processes and external
forces that, in the absence of perturbations, keep the system within the
basin of attraction” (Sánchez-Pinillos et al., 2023). The main
dynamic trends characterizing an EDR are useful to identify cyclic
behaviors and other more complex dynamics, such as transient dynamics.
Additionally, the fluctuations and variability of ecological dynamics
resulting from the interaction of multiple factors define the shape,
size, and characteristics of dynamic regimes and potential domains of
attraction (Sánchez-Pinillos et al., 2024).
The EDR framework is a set of algorithms and metrics
to characterize and compare ecological dynamic regimes from empirical
data so they can be used as the reference to assess ecological
resilience accounting for both the dynamic trends of the system and the
feedback relationships between its components.
To know more about the relevance of dynamic regimes for assessing
ecological resilience, see this publication:
Additional information about the EDR framework can be found in this
publication:
- Sánchez-Pinillos M., Kéfi, S., De Cáceres, M., Dakos, V. 2023.
Ecological Dynamic Regimes: Identification, characterization, and
comparison. Ecological Monographs. https://doi.org/10.1002/ecm.1589
1.2. About this vignette
This vignette aims to illustrate how ecological resilience can be
assessed using the EDR framework implemented in ecoregime.
In particular, this vignette focuses on the quantitative indices
proposed in Sánchez-Pinillos et al. (2024) and their geometric
rationale, taking ecological dynamic regimes as the reference to
evaluate ecological resilience.
You can install ecoregime directly from CRAN or from my
GitHub account (development version):
# install.packages("ecoregime")
# devtools::install_github(repo = "MSPinillos/ecoregime", dependencies = T, build_vignettes = T)
Once you have installed ecoregime you will have to load
it:
citation("ecoregime")
#> To cite 'ecoregime' in publications use:
#>
#> Sánchez-Pinillos M, Kéfi S, De Cáceres M, Dakos V (2023). "Ecological
#> dynamic regimes: Identification, characterization, and comparison."
#> _Ecological Monographs_, e1589. <https://doi.org/10.1002/ecm.1589>.
#>
#> Sánchez-Pinillos M, Dakos V, Kéfi S (2024). "Ecological dynamic
#> regimes: A key concept for assessing ecological resilience."
#> _Biological Conservation_, 110409.
#> <https://doi.org/10.1016/j.biocon.2023.110409>.
#>
#> Sánchez-Pinillos M (2023). _ecoregime: Analysis of Ecological Dynamic
#> Regimes_. <https://doi.org/10.5281/zenodo.7584943>.
#>
#> To see these entries in BibTeX format, use 'print(<citation>,
#> bibtex=TRUE)', 'toBibtex(.)', or set
#> 'options(citation.bibtex.max=999)'.
2. Assessing ecological dynamic regimes
2.1. Identifying the reference ecological dynamic regime
To assess the ecological resilience of a system, we need to identify
its ecological dynamic regime (EDR) so it can be used as the reference
to compare the disturbed dynamics. That is, the EDR to which the
disturbed trajectories belonged before being disturbed.
Given a stability landscape composed of alternative dynamic regimes,
we can compute the dynamic dispersion (dDis) of the pre-disturbance
portion of the disturbed trajectories in relation to each alternative
EDR. The function dDis() allows us to quantify the degree
of membership of any trajectory within an EDR. You can see more
information about dDis() in
vignette("EDR_framework").
In the data included in ecoregime (i.e.,
EDR_data), you will find three abundance matrices
corresponding to a set of community trajectories forming three
ecological dynamic regimes (EDR1, EDR2, EDR3). Additionally, you will
find an abundance matrix associated with three disturbed communities
(EDR3_disturbed). Assuming that EDR1, EDR2, and EDR3 are
three alternative dynamic regimes in a stability landscape, we will see
how dDis() can be used to identify the EDR with which the
disturbed trajectories are associated.
# Species abundances in undisturbed states of the disturbed trajectories
# (Undisturbed states are identified by disturbed_states = 0)
abun_undist <- EDR_data$EDR3_disturbed$abundance[disturbed_states == 0]
selcols <- names(EDR_data$EDR1$abundance)
## EDR1 ------------------------------------------------------------------------
# Species abundances in EDR1 and the undisturbed states of disturbed trajectories
abun1_undist <- rbind(EDR_data$EDR1$abundance, abun_undist[, ..selcols])
# State dissimilarities in EDR1 and the undisturbed states of disturbed trajectories
d1_undist <- vegan::vegdist(x = abun1_undist[, paste0("sp", 1:12)], method = "bray")
# dDis of the disturbed trajectories in relation to EDR1
dDis1 <- sapply(unique(abun_undist$traj), function(iundist){
dDis(d = d1_undist, d.type = "dStates",
trajectories = abun1_undist$traj, states = abun1_undist$state,
reference = as.character(iundist))
})
## EDR2 ------------------------------------------------------------------------
# Species abundances in EDR2 and the undisturbed states of disturbed trajectories
abun2_undist <- rbind(EDR_data$EDR2$abundance, abun_undist[, ..selcols])
# State dissimilarities in EDR2 and the undisturbed states of disturbed trajectories
d2_undist <- vegan::vegdist(x = abun2_undist[, paste0("sp", 1:12)], method = "bray")
# dDis of the disturbed trajectories in relation to EDR2
dDis2 <- sapply(unique(abun_undist$traj), function(iundist){
dDis(d = d2_undist, d.type = "dStates",
trajectories = abun2_undist$traj, states = abun2_undist$state,
reference = as.character(iundist))
})
## EDR3 ------------------------------------------------------------------------
# Species abundances in EDR3 and the undisturbed states of disturbed trajectories
abun3_undist <- rbind(EDR_data$EDR3$abundance, abun_undist[, ..selcols])
# State dissimilarities in EDR3 and the undisturbed states of disturbed trajectories
d3_undist <- vegan::vegdist(x = abun3_undist[, paste0("sp", 1:12)], method = "bray")
# dDis of the disturbed trajectories in relation to EDR3
dDis3 <- sapply(unique(abun_undist$traj), function(iundist){
dDis(d = d3_undist, d.type = "dStates",
trajectories = abun3_undist$traj, states = abun3_undist$state,
reference = as.character(iundist))
})
## Compare dynamic dispersion --------------------------------------------------
# Compare dDis values for the three EDRs
dDis_df <- data.frame(EDR1 = dDis1, EDR2 = dDis2, EDR3 = dDis3)
If we compare the values of dDis for each disturbed trajectory (ref.
31, ref. 32, ref. 33) and EDR (EDR1, EDR2, EDR3), we see that the lowest
dDis values are associated with EDR3. We can take EDR3 as the reference
to assess the ecological resilience of the three disturbed
communities.
| dDis (ref. 31) |
0.649 |
0.748 |
0.356 |
| dDis (ref. 32) |
0.734 |
0.556 |
0.268 |
| dDis (ref. 33) |
0.711 |
0.436 |
0.412 |
2.2. Define the main dynamic trends through representative
trajectories
Once we have identified the EDR of reference, we can compute the
representative trajectories using the function retra_edr().
See vignette("EDR_framework") for more information.
# State dissimilarities for EDR3 (considering only the undisturbed trajectories)
d_EDR3 <- vegan::vegdist(EDR_data$EDR3$abundance[, paste0("sp", 1:12)])
# Representative trajectories
retra <- retra_edr(d = d_EDR3,
trajectories = EDR_data$EDR3$abundance$traj,
states = EDR_data$EDR3$abundance$state, minSegs = 5)
Although there are five representative trajectories, we will select
“T4” as the reference for being the longest and covering all regions of
the EDR relatively well.
# Summarize retra
summary(retra)
#> ID Size Length Avg_link Sum_link Avg_density Max_density Avg_depth
#> T1 T1 8 0.56912543 0.12435644 0.24871287 7.250000 8 4.750000
#> T2 T2 6 0.39900498 0.10718905 0.21437811 7.666667 8 4.666667
#> T3 T3 4 0.08970149 0.03482587 0.03482587 6.500000 7 6.500000
#> T4 T4 16 1.11654181 0.08961127 0.53766760 6.625000 8 5.125000
#> T5 T5 6 0.35468137 0.08723881 0.17447761 7.333333 10 5.333333
#> Max_depth
#> T1 6
#> T2 6
#> T3 7
#> T4 7
#> T5 7
# Define T4 as the unique representative trajectory and generate an object of class 'RETRA'
retra_ref <- define_retra(data = retra$T4$Segments, d = d_EDR3,
trajectories = EDR_data$EDR3$abundance$traj,
states = EDR_data$EDR3$abundance$state,
retra = retra)
# Plot EDR3 and its representative trajectories
plot(retra, d = d_EDR3,
trajectories = EDR_data$EDR3$abundance$traj,
states = EDR_data$EDR3$abundance$state, select_RT = "T4",
main = "Representative trajectories in EDR3")
legend("topleft", c("Representative trajectory 'T4'",
"Other representative trajectories",
"Individual trajectories in EDR3"),
lty = 1, col = c("red", "black", "grey"), bty = "n")
3. Metrics of ecological resilience to pulse disturbances
When an ecological system is disturbed, its dynamics can deviate from
the reference EDR and its representative trajectories. Depending on the
immediate impact of the disturbance and the changes in the state
variables following the release of the disturbance, post-disturbance
trajectories can be characterized through four complementary indices:
resistance (Rt), amplitude (A), recovery
(Rc), and net change (NC).
3.1. Resistance
The resistance index (Rt) quantifies the impact of the
disturbance on the system based on the immediate changes in the state
variables. That is, it is a measure of how similar the disturbed (1) and
the pre-disturbance (0) states are (Sánchez-Pinillos et al., 2019). As
such, the resistance index does not depend on the position of the system
within the EDR.
\[Rt = 1 - d_{pre, dist}\]
where \(d_{pre,dist}\) is the
dissimilarity between the pre-disturbance (0) and the disturbed (1)
states.
Given the three disturbed trajectories in EDR3 (i.e.,
EDR3_disturbed), we can compute the resistance index using
the function resistance():
# To calculate resistance, we need a state dissimilarity matrix for the disturbed trajectories
d_disturbed <- vegan::vegdist(EDR_data$EDR3_disturbed$abundance[, paste0("sp", 1:12)],
method = "bray")
# Compute resistance
# Note that the disturbed states are identified by disturbed_states = 1
Rt <- resistance(d = d_disturbed,
trajectories = EDR_data$EDR3_disturbed$abundance$traj,
states = EDR_data$EDR3_disturbed$abundance$state,
disturbed_trajectories = unique(EDR_data$EDR3_disturbed$abundance$traj),
disturbed_states = EDR_data$EDR3_disturbed$abundance[disturbed_states == 1]$state)
The three hypothetical systems show a relatively high resistance
(close to 1) to the disturbance:
| 31 |
0.958 |
| 32 |
0.812 |
| 33 |
0.693 |
3.2. Amplitude
The amplitude (A) quantifies how much the system is deviated
from its trajectory during the disturbance assuming that, in the absence
of disturbances, the system would keep a constant distance to a
representative trajectory taken as the reference.
The amplitude can be calculated in absolute terms as the difference
of the dissimilarity between the disturbed state (1) and the
representative trajectory (\(d_{dist,RT}\)) and the dissimilarity
between the pre-disturbance state (0) and the representative trajectory
(\(d_{pre,RT}\)):
\[A_{abs} = d_{dist,RT} -
d_{pre,RT}\]
Alternatively, the amplitude can be calculated in relation to the
impact of the disturbance (\(d_{pre,dist}\)). In this case, the
amplitude quantifies the ability of the system to remain close to the
representative trajectory in relation to the changes in the state
variables provoked by the disturbance.
\[A_{rel} = \frac{d_{dist,RT} -
d_{pre,RT}}{d_{pre,dist}}\]
In any case, positive amplitude values indicate that the system is
deviated towards the boundaries of the EDR, whereas negative values
indicate the deviation towards the representative trajectory taken as
the reference.
Amplitude can be calculated using the function
amplitude():
# We need a state dissimilarity matrix containing the states of the disturbed
# trajectories and the representative trajectory taken as the reference
abun <- rbind(EDR_data$EDR3$abundance, EDR_data$EDR3_disturbed$abundance, fill = T)
d <- vegan::vegdist(abun[, paste0("sp", 1:12)], method = "bray")
# Compute amplitude
A <- amplitude(d = d,
trajectories = abun$traj,
states = abun$state,
disturbed_trajectories = abun[disturbed_states == 1]$traj,
disturbed_states = abun[disturbed_states == 1]$state,
reference = retra_ref, method = "nearest_state")
The three considered systems show positive amplitude values,
indicating that the disturbance lead them towards the boundaries of the
EDR. Whereas the absolute amplitude of trajectory 31 (\(A_{abs}(31) = 0.027\)) is smaller than the
absolute amplitude of trajectory 32 (\(A_{rel}(32) = 0.119\)), both have similar
relative values (\(A_{rel}(31) =
0.653\); \(A_{rel}(32) =
0.631\)). This result indicates that despite the small deviation
of trajectory 31 from the representative trajectory during the
disturbance, such deviation is disproportionately high in relation to
the impact of the disturbance on the state variables.
| 31 |
T4.1 |
0.027 |
0.653 |
| 32 |
T4.1 |
0.119 |
0.631 |
| 33 |
T4.1 |
0.268 |
0.871 |
3.3. Recovery
The recovery index (Rc) quantifies the ability of the system
to reorganize itself after a disturbance and evolve towards the
representative trajectory representing its dominant dynamic trends.
The recovery can be calculated in absolute terms as the difference of
the dissimilarity between the disturbed state (1) and the representative
trajectory (\(d_{dist,RT}\)) and the
dissimilarity between one of the post-disturbance states (> 1) and
the representative trajectory (\(d_{post,RT}\)):
\[Rc_{abs} = d_{dist,RT} -
d_{post,RT}\]
Alternatively, the recovery can be calculated in relation to the
changes in the state variables that the system must perform to return
towards the representative trajectory from the disturbed state (\(d_{dist, post}\)). In this case, the index
penalizes the systems that require major restructuring of the state
variables to return towards the representative trajectory (positive
recovery) and gives less negative values to the systems minimizing the
escape from the dynamic regime through major changes in its state
variables.
\[Rc_{rel} = \frac{d_{dist,RT} -
d_{post,RT}}{d_{dist, post}}\]
Both absolute and relative recovery indices are positive when the
system evolves towards the representative trajectory. Otherwise,
negative values indicate that the system evolves towards the boundaries
of the EDR.
Recovery can be calculated using the function recovery()
considering all states after the disturbed state (> 1):
# Compute recovery using the same data used for amplitude
Rc <- recovery(d = d,
trajectories = abun$traj,
states = abun$state,
disturbed_trajectories = abun[disturbed_states == 1]$traj,
disturbed_states = abun[disturbed_states == 1]$state,
reference = retra_ref, method = "nearest_state")
We can plot the variation of recovery over time considering all
post-disturbance states:
# Number of states after the disturbed state
Rc <- data.table::data.table(Rc)
Rc[, ID_post := 1:(.N), by = disturbed_trajectories]
# Plot absolute recovery over time
plot(x = range(Rc$ID_post), y = range(Rc$Rc_abs), type = "n",
xlab = "Nb. states after disturbance", ylab = "Absolute recovery",
main = "Variation of absolute recovery")
for (i in unique(Rc$disturbed_trajectories)) {
lines(Rc[disturbed_trajectories == i, c("ID_post", "Rc_abs")],
col = which(unique(Rc$disturbed_trajectories) %in% i) + 1)
}
legend("bottomleft", legend = unique(Rc$disturbed_trajectories), lty = 1,
col = seq_along(unique(Rc$disturbed_trajectories)) + 1, bty = "n")
# Plot relative recovery over time
plot(x = range(Rc$ID_post), y = range(Rc$Rc_rel), type = "n",
xlab = "Nb. states after disturbance", ylab = "Relative recovery",
main = "Variation of relative recovery")
for (i in unique(Rc$disturbed_trajectories)) {
lines(Rc[disturbed_trajectories == i, c("ID_post", "Rc_rel")],
col = which(unique(Rc$disturbed_trajectories) %in% i) + 1)
}
legend("topright", legend = unique(Rc$disturbed_trajectories), lty = 1,
col = seq_along(unique(Rc$disturbed_trajectories)) + 1, bty = "n")
3.4. Net change
Net change (NC) quantifies how much the system is deviated
from its trajectory after the release of the disturbance assuming that,
in the absence of disturbances, the system would keep a constant
distance to a representative trajectory taken as the reference.
Like amplitude and recovery, net change can be calculated in absolute
or relative terms. The absolute net change is expressed as the
difference of the dissimilarity between one of the post-disturbance
states (> 1) and the representative trajectory (\(d_{post,RT}\)) and the dissimilarity
between the pre-disturbance state (0) and the representative trajectory
(\(d_{pre,RT}\)):
\[NC_{abs} = d_{post,RT} -
d_{pre,RT}\]
The relative net change is calculated in relation to the changes
produced in the state variables between the pre-disturbance and the
post-disturbance states (\(d_{pre,post}\)). In this way, the index
penalizes the systems that deviated from the expected trajectory despite
being very similar to the pre-disturbance state.
\[NC_{rel} = \frac{d_{post,RT} -
d_{pre,RT}}{d_{pre,post}}\]
As in the amplitude index, positive values indicate that the system
is deviated towards the boundaries of the EDR and negative values
indicate the deviation towards the representative trajectory taken as
the reference.
The function net_change() included in
ecoregime can be used to calculate the net change of all
post-disturbance states in relation to the pre-disturbance state:
# Compute net change using the same data used for amplitude
NC <- net_change(d = d,
trajectories = abun$traj,
states = abun$state,
disturbed_trajectories = abun[disturbed_states == 1]$traj,
disturbed_states = abun[disturbed_states == 1]$state,
reference = retra_ref, method = "nearest_state")
We can plot the variation of net change over time considering all
post-disturbance states:
# ID post-disturbance states
NC <- data.table::data.table(NC)
NC[, ID_post := 1:(.N), by = disturbed_trajectories]
# Plot absolute net change over time
plot(x = range(NC$ID_post), y = range(NC$NC_abs), type = "n",
xlab = "Nb. states after disturbance", ylab = "Absolute net change",
main = "Variation of absolute net change")
for (i in unique(NC$disturbed_trajectories)) {
lines(NC[disturbed_trajectories == i, c("ID_post", "NC_abs")],
col = which(unique(NC$disturbed_trajectories) %in% i) + 1)
}
legend("topleft", legend = unique(NC$disturbed_trajectories), lty = 1,
col = seq_along(unique(NC$disturbed_trajectories)) + 1, bty = "n")
# Plot relative net change over time
plot(x = range(NC$ID_post), y = range(NC$NC_rel), type = "n",
xlab = "Nb. states after disturbance", ylab = "Relative net change",
main = "Variation of relative net change")
for (i in unique(NC$disturbed_trajectories)) {
lines(NC[disturbed_trajectories == i, c("ID_post", "NC_rel")],
col = which(unique(NC$disturbed_trajectories) %in% i) + 1)
}
legend("bottomleft", legend = unique(NC$disturbed_trajectories), lty = 1,
col = seq_along(unique(NC$disturbed_trajectories)) + 1, bty = "n")
4. Assessing the ecological resilience of systems affected by pulse
disturbances
Altogether, the metrics of amplitude, recovery, and net change define
the geometry of disturbed trajectories in relation to the reference EDR.
Additionally, the resistance index helps interpret the response of the
system considering the immediate impact of the disturbance.
As an example, we will take the three disturbed trajectories used in
the previous section. For simplicity, we will only focus on resistance
and the absolute values of amplitude, recovery, and net change and we
will consider the 14th post-disturbance state (last post-disturbance
state of Trajectory 33) of all trajectories to calculate
recovery and net change.
# Merge the results for resistance, amplitude, recovery, and net change
results <- Reduce(function(x, y) merge(x, y, all = T),
list(Rt, A, Rc, NC))
results <- results[which(results$ID_post == 14),
c("disturbed_trajectories", "Rt", "A_abs", "Rc_abs", "NC_abs")]
| 31 |
0.958 |
0.027 |
-0.474 |
0.502 |
| 32 |
0.812 |
0.119 |
0.099 |
0.020 |
| 33 |
0.693 |
0.268 |
0.283 |
-0.016 |
Based on the values of the indices, we can figure out the shape of
the disturbed trajectories. For example, Trajectory 31 was very
resistant to the immediate impact of the disturbance (in terms of
changes in the state variables) (\(Rt =
0.958\)) and the amplitude provoked by the disturbance was very
small (\(A = 0.027\)). However, unlike
Trajectory 32 and Trajectory 33, the recovery was
negative (\(Rc = -0.474\)) and the net
change positive and relatively high (\(NC =
0.502\)). Thus, despite the relatively low impact of the
disturbance, the values of recovery and net change indicate that
Trajectory 31 goes away from the reference EDR and the system
potentially changes to an alternative dynamic regime.
Both Trajectory 32 and Trajectory 33 showed
positive values of recovery and net change values close to zero. In both
cases, amplitude and recovery have similar values, respectively
(Trajectory 32: \(A = 0.119\),
\(Rc = 0.099\); Trajectory 33:
\(A = 0.268\), \(Rc = 0.283\)), indicating that these
systems are able to reorganize and remain within the EDR.
Trajectory 32 was relatively resistant to the impact of the
disturbance (\(Rt = 0.812\)) and showed
a relatively low deviation from the representative trajectory (\(A = 0.119\)). In contrast, Trajectory
33 was more severely impacted by the disturbance (\(Rt = 0.693\); \(A
= 0.268\)) but showed a high recovery capacity (\(Rc = 0.283\)). Thus, while both communities
could be considered resilient, they showed different strategies. Whereas
Trajectory 32 represents a resistant dynamic within the EDR,
Trajectory 33 represents a more variable system whose dynamics
visit the borders of the EDR to eventually return towards the
representative trajectory.
To support our evaluation of the ecological resilience of disturbed
trajectories, we can calculate the dynamic dispersion (dDis) of the
post-disturbance portion of the disturbed trajectories in relation to
the trajectories in the EDR.
# Species abundances in post-disturbance states of the disturbed trajectories
# The states after the release of the disturbance are identified by disturbed_states > 1
abun_post <- EDR_data$EDR3_disturbed$abundance[disturbed_states > 1]
selcols <- names(EDR_data$EDR3$abundance)
# Species abundances in EDR3 and the post-disturbance states of disturbed trajectories
abun3_post <- rbind(EDR_data$EDR3$abundance, abun_post[, ..selcols])
# State dissimilarities in EDR3 and the post-disturbance states of disturbed trajectories
d3_post <- as.matrix(vegan::vegdist(x = abun3_post[, paste0("sp", 1:12)], method = "bray"))
# dDis of each disturbed trajectory
dDis_dist <- sapply(unique(abun_post$traj), function(idist){
rm_disturbed <- unique(abun_post$traj[which(abun_post$traj != idist)])
irm <- which(abun3_post$traj %in% rm_disturbed)
dDis(d = d3_post[-irm, -irm], d.type = "dStates",
trajectories = abun3_post$traj[-irm],
states = abun3_post$state[-irm],
reference = as.character(idist))
})
The values of dDis confirm the resilience of Trajectory 32
and show that, despite being able to recover after the disturbance, the
dynamic represented by Trajectory 33 is anomalous in relation
to the other dynamics in the EDR.
| 31 |
0.463 |
| 32 |
0.257 |
| 33 |
0.474 |
Finally, we can illustrate the responses of the three disturbed
communities by representing their trajectories in relation to the
reference EDR and its representative trajectory:
# Plot EDR3 and its representative trajectories
plot(retra_ref, d = d,
trajectories = abun$traj,
states = abun$state,
traj.colors = c(rep("grey", 30), 2:4),
main = "Comparison of disturbed trajectories and EDR3")
legend("topleft", c("Representative trajectory",
"Individual trajectories in EDR3",
"Trajectory 31",
"Trajectory 32",
"Trajectory 33"),
lty = 1, col = c("black", "grey", 2:4), bty = "n")
