Understanding natural populations with dynamic models

Understanding natural
populations with dynamic models

Edmund M. Hart
University of Vermont

The beginning

Charles Elton
1900-1991

A. J. Nicholson
1895-1969

The beginning

H. G. Andrewartha
1907-1992

L. Charles Birch
The logarithm of the average population size per month for 1918-2009
several years in the study of Thrips imaginis

The unanswered question

A. J. Nicholson Charles Elton
1895-1969 1900-1991

How can we fit experimental and
observational data to population
dynamic models in order to understand
what regulates populations? H. G. Andrewartha
1907-1992
L. Charles Birch
1918-2009

First principles

N B D

N B D
rt
Nt 1 Nt 1

First principles

N B D Nt
rt ln
Nt 1 Nt 1 Nt 1

Nt Nt 1 rt N t 1

First principles

Nt Nt 1 rt N t 1

rt f ( N , environment , competitors, etc...)

Mathematical Framework
Three basic types of population growth

Random Walk rt 0 N (0, 2
)

Exponential Growth rt r0 N (0, 2
)

Logistic Growth (Ricker form rt r0 N t 1 exp(c) Ν( 0 ,σ 2 )
shown)

Random walk Density dependent

Exponential

Vertical shift

rt f ( N t 1 ) g ( zt )

Lateral shift

rt f ( Nt 1 zt )

Testing hypotheses

Two methods:
 Carry out experiments and test how
populations change over parameter
space

 Fit models to observational data

Experimental approach

How can expected changes in the mean
and variance of an environmental factor
caused by climate change alter
population processes in aquatic
communities?


Climate change in New England


Surface response
7 Levels of Water Variation
7 Levels of Water mean depth
Fully crossed for 49 tubs

Means (cm): 6.6,9.9,13.2,
16.5,19.8, 23.1, 26.4

Coeffecients of Variation
(C.V.): 0,.1,.2,.3,.4,.5,.6

Mean Water Level

Low water level, high CV High water level, high CV
Water C.V.

High water level, low CV
Low water level, low CV


Mosquitoes

Midges

ymn 0 1 MWL WCV
2 3 MWL *WCV mn

β1 (p<0.05) R2=0.27

β2 (p<0.05)
β3 (p<0.05) R2=0.49


2 jk Growth rate, same as r0
rtjk ~ N ( jk jk X [t 1] jk , r )
jk Strength of density dependence
X [t 1] jk Log abundance

jk Grand mean
Effect of mean water level
jk
Effect of water level CV

U A vector of 0’s of length 2
B j ~ MVN (U , B ) B A 2x2 variance covariance matrix

Growth rate Density dependence

Estimates of the Gompertz logistic
(GL) parameters for each treatment
combination for growth rate and
density dependence in Culicidae
and Chironomidae. Darker squares
indicate either higher population
growth rate or stronger density
dependence.

Growth rate Density dependence


• The mean and variance of pond hydrological
process impacts larval abundance in opposing
directions

• Abundances change due to alterations in
population dynamic parameters

 Changes in intrinsic rate of increase in mosquitoes probably due to
female oviposition choice
 Density dependent effects in midges most likely caused by
competition for space

Observational approach

Using monitoring data, how
can we understand what
controls toxic algal bloom
population dynamics in
Missisquoi Bay?

Microcystis Anabaena

The nutrients The competitors

Chlorophyceae (green algae) Bacillariophyceae (diatoms)

TP SRP TN

TN

TP Cryptophyceae

Toxic algal blooms in Missisquoi Bay
2003 - 2006
• Data is from the Rubenstein
Ecosystems Science Laboratory’s toxic
algal bloom monitoring program

• Data from dominant taxa (Microcystis
2003-2005, Anabaena 2006)

• Averaged across all sites within
Missisquoi bay for each year

• Included only sites that had ancillary
nutrient data

Nt Nt 1 rt N t 1

rt f ( Nt 1 , Nt 2 ...Nt d ) g ( Et , Et 1...Et d ) h(C1t 1 C1t 2...C1t d )

Exogenous drivers

f ( N t d ) r0 N t 1 exp( c) g ( Et d ) E
1 t d h(C1t d ) C1t
1 d

Ricker logistic growth Linear Linear



f ( N t d ) r0 N t 1 exp( c) g ( Et d ) E
1 t d h(C1t d ) C1t
1 d

rt r0 N t 1 exp( c) 1 Et d

rt r0 N t 1 exp( c 1 Et d )
rt r0 N t 1 exp( c C1t d )
1

We fit 29 different models from the following:
Random walk / Density dependent Environmental factors Competitors
exponential growth (endogenous factors)

rt r0 rt r0 N t 1 exp( c) rt r0 N t 1 exp( c) 1 Et rt r0 N t 1 exp( c C1t 1 )
1

rt r0 N t 1 exp( c) 1 Et 1

rt r0 N t 1 exp( c 1 Et )

rt r0 N t 1 exp( c 1 Et 1 )
rt r0 1 Et

rt r0 E
1 t 1

Assessed model fit with AICc (AIC + 2K(K+1)/n-K-1)


Growth rates of toxic algal blooms in Missisquoi Bay 2003 - 2006


2004 Microcystis

2003 Microcystis 2005 Microcystis

2006 Anabaena
2004 Microcystis

Julian Day

Julian Growth Microcystis
Microcystis
Day Rate (cells/ml)
Julian Day (cells/ml)
182 2.54 3667.88
182 3667.883 188 0.65 46381.51
188 46381.514 195 0.23 89095.14
195 89095.144 203 -1.28 111960.54
203 111960.543 210 -0.45 31070.73
210 31070.727 217 -0.19 19824.80
217 19824.800 224 0.52 16395.25
224 16395.252 231 -0.05 27626.31
231 27626.305 238 0.52 26363.80
238 26363.801 247 -0.48 44301.53
247 44301.534 252 0.47 27541.29
252 27541.291 259 -0.99 43930.60
259 43930.596 267 -0.01 16324.47
267 16324.465
273 -0.93 16104.06
273 16104.062
280 0.35 6366.31
280 6366.310
287 9052.005


AICc ∆AICc AIC R2
Model weight

TN t 33.1 0 0.63 0.8
rt r0 N t 1 exp( c) 1
TPt
38.3 5.2 0.04 0.71
rt r0 N t 1 exp( c) TPt
1

38.4 5.3 0.04 0.64
rt r0 N t 1 exp( c)

38.9 5.8 0.03 0.7
rt r0 N t 1 exp( c) 1TN t 1

38.9 5.8 0.03 0.7
rt r0 N t 1 exp( c) 1 SRPt 1

TN t
rt 0.28 N t 1 exp( 10 .8) 0.08
TPt

Decline phase dynamics

AICc ∆AICc AIC R2
Model weight

rt r0 N t 1 exp( c TN t ) 78.8 0 0.21 0.18
1

81.2 2.4 0.06 -
rt r0

81.4 2.6 0.06 0.13
rt r0 N t 1 exp( c TPt )
1

81.6 2.8 0.05 0.12
rt r0 N t 1 exp( c 1 Crt 1 )

rt r0 N t 1 exp( c) 81.7 2.9 0.05 0.04

* Cr = Cryptophyceae

rt 0.12 N t 1 exp( 7.05 33 .1* TN t )

Two phase growth

Growth rates of toxic algal blooms in Missisquoi Bay 2003 - 2006

TNt
r0 Nt 1 exp(c) 1 ,t 5
rt TPt
r0 Nt 1 exp(c 1TNt ), t 5


Partial residual plot of bloom
Population size and N:P on bloom phase data phase growth rate model


• Toxic algal blooms have two distinct dynamic
phases, a pattern observed across years and
genera.

• N:P important in the bloom phase, but not the
decline, i.e. nutrients don’t always matter.

• Capturing the dynamics of a bloom are important.
i.e. if correlating N:P with populations, depending
when samples are taken you may get different
results

Conclusions
• Populations can be understood from both
experimental and observational data

• Population dynamic models provide a deeper
understanding of changes in abundance and
correlation with environmental variables.
• Dynamic models showed how climate change alters different aspects
of population processes depending on the taxa and its life history,
which in turn drive abundance.

• Dynamic models of observational data elucidated relationships
between environmental covariates and population growth rates that
otherwise are missed by simple regression on abundances.

Acknowledgements
Committee Members Funding
Nick Gotelli Vermont EPSCoR
Alison Brody NSF
Sara Cahan
Brian Beckage

Jericho forest
David Brynn
Don Tobi

Undergraduate field assistants
Chris Graves
Cyrus Mallon (University of Groningen) My faithful field companion,
Tuesday. General helper and
Co-Authors on the plankton manuscript protector from squirrels and the
Nick Gotelli occasional bear
Rebecca Gorney
Mary Watzin

Understanding natural populations with dynamic models

Understanding natural populations with dynamic models

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