Post on 05-Jan-2016
Ecology 8310Population (and Community) Ecology
Seguing into from populations to communities
• Species interactions
• Lotka-Volterra equations
• Competition
• Adding in resources
Species interactions:
Competition (- , -)
Predation (+ , -)
(Herbivory, Parasitism, Disease)
Mutualism (+ , +)
None (0 , 0)
Species interactions:
1
a11
a14=04
a122
aij>0
aij<0
a13
3
6
a16
5
a15
aij gives the per capita effect of
species j on species i’s per capita growth
rate, dNi/Nidt
Generalized Lotka-Volterra system:
.../
.../
.../
333232131333
323222121222
313212111111
NaNaNardtNdN
NaNaNardtNdN
NaNaNardtNdN
Special cases:
1. Exponential model: all a’s=0
2. Logistic model: aii<0; others =0
N2
N1
dN1/N1dt
Slope = a
12
Slo
pe
= a
11
N2
N1
dN1/N1dt
Slope = a 12
Slop
e =
a11
Species interactions: 1
a11
a122
aij>0
aij<0
a13
3
a31
4
a21
a44
What can you say about the interactions between these species?
Which are interspecific competitors?
Which are predator and prey?
Which are mutualists? Which show self limitation?
444343242141444
434333232131333
424323222121222
414313212111111
/
/
/
/
NaNaNaNardtNdN
NaNaNaNardtNdN
NaNaNaNardtNdN
NaNaNaNardtNdN
a43a34
Competition:
1 a122
a21
a11 a22
Alternate terminology:
αij = aij/aii , the effect of interspecific competition relative to the intraspecific effect (e.g., how many of species i does it take to have the same effect as 1 individual of species j?)
Arises when two organisms use the same limited resource,
and deplete its availability(intra. vs. interspecific)
1 2
R
Competition:
1 a122
a21
2121222
222121222
1212111
212111111
/)(
/
/)(
/
KNNKr
NaNardtNdN
KNNKr
NaNardtNdN
α
α
a11 a22
1 a122
a21
a11 a22
Can we use this model to understand patterns of competition among two species (e.g., coexistence and competitive exclusion)?
E.g., Paramecium experiments by Gause…
Competition:
Classic studies of resource competition by Gause (1934,
1935)
Paramecium aurelia
Paramecium bursaria
Paramecium caudatum
Competitive exclusion: P. aurelia excludes P.
caudatum
Paramecium caudatum
Paramecium bursaria
In contrast…
Why this disparity, and can we gain insights via
our model?
1 a122
a21
2121222
222121222
1212111
212111111
/)(
/
/)(
/
KNNKr
NaNardtNdN
KNNKr
NaNardtNdN
α
α
a11 a22
Competition:
212122222
121211111
/)(/
/)(/
KNNKrdtNdN
KNNKrdtNdN
αα
At equilibrium, dN/Ndt=0:
1212*2
2121*1
NKN
NKN
α
α
Competition:
N1
N2
Phase planes:
K1/α12
Graph showing regions where dN/Ndt=0 (and +, -); used to infer dynamics
Species 1’s zero growth isocline…
2121*1 NKN α
dN1/N1dt=0
K1
N1
N2
Phase planes:
K1/α12
What if the system is not on the isocline. Will what N1 do?
dN1/N1dt=0
K1
N1
N2
Phase planes:
K2
dN2/N2dt=0
K2/α21
1212*2 NKN α
N1
N2
Phase planes:
K1/α12
Putting it together…
dN1/N1dt=0
K1
dN2/N2dt=0
Species 2 “wins”:N2
* =K2, N1* =0
(reverse to get Species 1 winning)
K2/α21
K2
N1
N2
Phase planes:
K1/α12
Your turn…. For A and B:
1) Draw the trajectory on the phase-plane
2) Draw the dynamics (N vs. t) for each system.
dN1/N1dt=0
K1
dN2/N2dt=0
K2/α21
K2
A
B
N1
N2
Phase planes:
K1/α12
Another possibility…
dN1/N1dt=0
K1
dN2/N2dt=0
“It depends”: either species can win,
depending on starting conditions
K2/α21
K2
N1
N2
Phase planes:
K1/α12
dN1/N1dt=0
K1K2/α21
K2
Your turn….
Draw the dynamics (N vs. t) for the system that starts at:
• Point A
• Point BA
B
N1
N2
Phase planes:
K1/α12
dN1/N1dt=0
K1K2/α21
K2
Now do it for many starting points:
Separatrix or manifold
N1
N2
Phase planes:
K1/α12
A final possibility…
dN1/N1dt=0
K1
dN2/N2dt=0
Coexistence!
K2/α21
K2
N1
N2
Phase planes:
K1/α12
“Invasibility”…
dN1/N1dt=0
K1
dN2/N2dt=0
Mutual invasibility coexistence!
Why: because each species is self-
limited below the level at which it
prevents growth of the other
K2/α21
K2
N1
N2
Invasibility:
K1/α12
Contrast that with…
dN1/N1dt=0
K1
dN2/N2dt=0
Neither species can invade the other’s equilibrium (hence no coexistence).
K2/α21
K2
N1
N2
Coexistence:
K1/a12 dN1/N1dt=0
K1
dN2/N2dt=0
K2/a21
K2
Coexistence:
“intra > inter”
Coexistence requires that the strength of intraspecific competition
be stronger than the strength of interspecific competition.
Resource partitioning
Two species cannot coexist on a single limiting resource
Can we now explain Gause’s results?
Paramecium aurelia Paramecium bursaria
Paramecium caudatum
Bacteria in water
column
Yeast on bottom
Resources:But what about resources?
(they are “abstracted” in LV model)
Research by David Tilman
Resources:Followed population growthand resource (silicate) when
alone:
Data = points.Lines = predicted from model
Resources:What will happen when growth
together: why?
Resources:R*: resource concentration after consumer population
equilibrates (i.e., R at which Consumer shows no net
growth)
Species with lowest R* wins (under idealized scenario: e.g.,
one limiting resource).
If two limiting resources, then coexistence if each species
limited by one of the resources (intra>inter): trade-off in R*s.
Next time: Tilman's R* framework