LAB 2POPULATION ESTIMATION Part 1Closed Models

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LAB 2POPULATION ESTIMATION Part 1Closed Models

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Title: LAB 2POPULATION ESTIMATION Part 1Closed Models

1
LAB 2--POPULATION ESTIMATIONPart 1Closed Models

Readings
Krebs. 1989. Ecological Methodology. Chapter 2
White et al. 1981. Capture-Recapture and
Removal Methods
Sutherland. 1996. Ecological census techniques
(1995)

How do we determine abundance?

Is an absolute density needed
Relative Abundance Indices
No
3

How do we determine abundance?

Is an absolute density needed
Relative Abundance Indices
No
Yes
Need data on individuals?
Yes
Mark- Recapture techniques
4

How do we determine abundance?

Is an absolute density needed
Relative Abundance Indices
No
Yes
Need data on individuals?
Yes
Mark- Recapture techniques
No
Organisms Mobile?
No
Quadrat counts
5

How do we determine abundance?

Is an absolute density needed
Relative Abundance Indices
No
Yes
Change-in-ratio methods
Need data on individuals?
Yes
Mark- Recapture techniques
Yes
No
Is exploitation age- or sex- selective
Yes
Yes
Organisms Mobile?
Is population being exploited?
No
No
No
Quadrat counts
Catch-effort methods
6
Mark-recapture

ratio of marked to unmarked animals during the
recapture period represents the proportion of
marked animals to the total population
(1995)

7
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
(1995)

8
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
We catch and mark 10 animals on day 1
(1995)

9
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
We catch and mark 10 animals on day 1
We then trap a second day and find we have caught
10 animals, two of which are marked
(1995)

10
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
We catch and mark 10 animals on day 1
We then trap a second day and find we have caught
10 animals, two of which are marked
The number of recaptures is thus 2/10 or 20.
(1995)

11
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
We catch and mark 10 animals on day 1
We then trap a second day and find we have caught
10 animals, two of which are marked
The number of recaptures is thus 2/10 or 20
We then assume that the total number of marked
animals (10)20 of the population
(1995)

12
Mark-recapture Lincoln-Peterson

Simplest form is a Lincoln/Petersen estimate
We catch and mark 10 animals on day 1
We then trap a second day and find we have caught
10 animals, two of which are marked
The number of recaptures is thus 2/10 or 20
We then assume that the total number of marked
animals (10)20 of the population
therefore the population estimate is 50.
(1995)

13
Mark-recapture Lincoln-Peterson

Mathematically
N/MC/R and N/1010/2
NCM/R1010/250
where Npopulation estimate--the Petersen
estimate
Mnumber of marked animals
Cnumber of recaptures
Rnumber of marked recaptures

14
Mark-recapture Lincoln-Peterson

Or in general

where Npopulation estimate Mnumber of
marked animals Cnumber of recaptures Rnumber
of marked recaptures
15
Mark-recapture Lincoln-Peterson

Uses
Estimate population size

16
Mark-recapture Lincoln-Peterson

Uses
Estimate population size
Determine rate of exploitation

17
Mark-recapture Lincoln-Peterson

Uses
Estimate population size
Determine rate of exploitation
Determine discrete survivorship rates

18
Mark-recapture Lincoln-Peterson

Uses
Estimate population size
Determine rate of exploitation
Determine discrete survivorship rates
Determine recruitment rates

19
Mark-recapture Lincoln-Peterson

Uses
Estimate population size
Determine rate of exploitation
Determine discrete survivorship rates
Determine recruitment rates
Uses 2,3 4 require running the method more than
once (multiple)

20
Mark-recapture Lincoln-Peterson

Problems
Calculation of confidence intervals
Statistical bias due to small sample size
Technique bias

21
Mark-recapture Lincoln-Peterson

Problem 1
Calculation of confidence intervals
are not normally distributed

22
Mark-recapture Lincoln-Peterson

Problem 1
Calculation of confidence intervals
are not normally distributed
But, reciprocal of , (1/ ), is

23
Mark-recapture Lincoln-Peterson

Problem 1
Calculation of confidence intervals

24
Mark-recapture Lincoln-Peterson

Problem 1
Calculation of confidence intervals
where

25
Mark-recapture Lincoln-Peterson

Problem 2
Statistical bias
if R 7 we have high bias

26
Mark-recapture Lincoln-Peterson

Problem 3
Technique bias
Can be most serious and invalidate assumptions

27
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
No Additions (Birth or Immigration)
No Subtractions (Death or Emigration)

28
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
If trap shy?

29
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
If trap shy--R decreases

30
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
If trap shy
If trap happy?

31
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
If trap shy
If trap happy--R increases

32
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality

33
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
Incr mortality of marked animals?

34
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
Incr mortality of marked animals--decr. R

35
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
Incr mortality of marked animals-
Decr mortality of marked animals?

36
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
No tag loss

37
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
No tag loss
decreases R, thus?

38
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
No tag loss
Marked and unmarked animals mix

39
Mark-recapture Lincoln-Peterson

Assumptions
Closed population
Equal probability of capture
Equal mortality
No tag loss
Marked and unmarked animals mix
All marks are identified and reported correctly

40
Mark-recapture Lincoln-Peterson

How to decrease bias
Different capture techniques for each phase

41
Mark-recapture Lincoln-Peterson

How to decrease bias
Different capture techniques for each phase
Different types of marks

42
Mark-recapture Lincoln-Peterson

How to decrease bias
Different capture techniques for each phase
Different types of marks
Short time period

43
Mark-recapture Lincoln-Peterson

Example
M7 C12 R4

44
Mark-recapture Lincoln-Peterson

Example

M7 C12 R4
45
Mark-recapture Lincoln-Peterson

Example

M7 C12 R4
46
Mark-recapture Lincoln-Peterson

Example

M7 C12 R4
47
Mark-recapture Lincoln-Peterson

Example

M7 C12 R4
48
Mark-recapture Lincoln-Peterson

Is this a good estimate?

49
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation

50
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance

51
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance

52
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI

53
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI

54
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI

55
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
Positive interval 0.050505 0.038107 0.088612

56
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
Positive interval 0.050505 0.038107 0.088612
Negative interval 0.050505 - 0.038107 0.012398

57
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
Positive interval 0.050505 0.038107 0.088612
Negative interval 0.050505 - 0.038107 0.012398
Do these seem small, why?

58
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
and taking the reciprocal (since we were using 1/
)

59
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
and taking the reciprocal (since we were using 1/
)

60
Mark-recapture Lincoln-Peterson

95 Confidence Interval calculation
Calculate the variance, then we can estimate CI
and taking the reciprocal (since we were using 1/
)

61
Mark-recapture Multiple Peterson

A series of estimates based on single Petersen

62
Mark-recapture Multiple Peterson

A series of estimates based on single Petersen
Allows comparison of daily estimates

63
Mark-recapture Multiple Peterson

A series of estimates based on single Petersen
Allows comparison of daily estimates
Similar assumptions

64
Mark-recapture Multiple Peterson

Set up data in a table

65
Mark-recapture Multiple Peterson

Since

66
Mark-recapture Multiple Peterson

Since
and

67
Mark-recapture Multiple Peterson

General form

68
Mark-recapture Multiple Peterson

Confidence intervals

69
Mark-recapture Multiple Peterson

But the variance is now

70
Mark-recapture Multiple Peterson

Example
1 died following tagging

71
Mark-recapture Multiple Peterson

Calculating for EACH occasion

72
Mark-recapture Multiple Peterson

Calculating for EACH occasion

73
Mark-recapture Multiple Peterson

Calculating for EACH occasion

74
Mark-recapture Multiple Peterson

Calculating for EACH occasion

75
Mark-recapture Multiple Peterson

Calculating variance for t2

76
Mark-recapture Multiple Peterson

Calculating variance for t2

77
Mark-recapture Multiple Peterson

Calculating variance for t2

78
Mark-recapture Multiple Peterson

Calculating variance for t2

79
Mark-recapture Multiple Peterson

Calculating 95 CI for t2

80
Mark-recapture Multiple Peterson

Calculating 95 CI for t2

81
Mark-recapture Multiple Peterson

Calculating 95 CI for t2
Positive interval 0.028571 0.024402 0.052973

82
Mark-recapture Multiple Peterson

Calculating 95 CI for t2
Positive interval 0.028571 0.024402 0.052973
Negative interval 0.028571 - 0.024402 0.004169

83
Mark-recapture Multiple Peterson

Calculating 95 CI for t2
Positive interval 0.028571 0.024402 0.052973
Negative interval 0.028571 - 0.024402 0.004169

84
Mark-recapture Multiple Peterson

Calculating 95 CI for t2
Positive interval 0.028571 0.024402 0.052973
Negative interval 0.028571 - 0.024402 0.004169

85
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Why?

86
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Increased time?

87
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Increased time more immigr, emigr., mortality

88
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Multiple Petersen increases precision and
decreases variability, why?

89
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Multiple Petersen increases precision and
decreases variability
Increased sample size

90
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Multiple Petersen increases precision and
decreases variability
Multiple Petersen allows better data
interpretation

91
Mark-recapture Single vs Multiple Peterson

Multiple Petersen increases potential bias
Multiple Petersen increases precision and
decreases variability
Multiple Petersen allows better data
interpretation
E.g. trap-shy or -happy animals

92
Mark-recapture Schnabel estimate

multiple recapture method that produces one
population estimate
Allows for time varying capture probability on
each occasion

93
Mark-recapture Schnabel estimate

Formula

94
Mark-recapture Schnabel estimate

Formula

95
Mark-recapture Schnabel estimate

Table

96
Mark-recapture Schnabel estimate

Example

97
Mark-recapture Schnabel estimate

Example

98
Mark-recapture Schnabel estimate

Calculating CIs
What is the variance?

99
Mark-recapture Schnabel estimate

Calculating CIs
What is the variance?

100
Mark-recapture Schnabel estimate

Calculating CIs

101
Mark-recapture Schnabel estimate

Calculating Cis
and after taking reciprocals

102
Mark-recapture Schnabel estimate

Assumptions
Same as Petersen
Advantage
Easier to test for violations of assumptions
Regression plots

103
Removal Methods

Zippin Method
Electrofishing data
Assumptions
Population is closed
Constant capture probability
Uses Maximum Likelihood Estimator

104
Regression MethodCatch Per Unit Effort (CPUE)

Tabulate the number of animals caught on each
sample
uj removed on occasion j
Tabulate the total number removed before each
sample
Mj u1 u2 .uj-1

105
Regression Method
j
uj
Mj
0
260
1
2
260
141
97
3
401
4
50
498
106
Regression MethodCatch Per Unit Effort (CPUE)

Under the assumption of constant capture
probability, relationship between uj and mj is
linear

107
Linear Regression Model
Remember apN b-p
108
POPULATION ESTIMATIONPart 2--the Jolly-Seber
estimator

Readings
Krebs. 1989. Ecological Methodology. Chapter 2
Hayek and Buzas. 1997. Surveying natural
populations.
Sutherland. 1996. Ecological census techniques
(1995)

109
Mark-recapture Jolly-Seber estimate

A method that accounts for mortality and
immigration

110
Mark-recapture Jolly-Seber estimate

Assumptions
open population

111
Mark-recapture Jolly-Seber estimate

Assumptions
open population
3 or more sampling periods

112
Mark-recapture Jolly-Seber estimate

Assumptions
open population
3 or more sampling periods
marks must be identifiable to sampling occasion

113
Mark-recapture Jolly-Seber estimate

Concept
All animals in first sample are unmarked

114
Mark-recapture Jolly-Seber estimate

Concept
All animals in first sample are unmarked
In subsequent samples the total catch can be
subdivided into two fractions marked and
unmarked animals.

115
Mark-recapture Jolly-Seber estimate

Concept
All animals in first sample are unmarked
In subsequent samples the total catch can be
subdivided into two fractions marked and
unmarked animals
For marked individuals we ask When was this
marked individual last captured?

116
Mark-recapture Jolly-Seber estimate

Concept
All animals in first sample are unmarked
In subsequent samples the total catch can be
subdivided into two fractions marked and
unmarked animals
For marked individuals we ask When was this
marked individual last captured?
Most of the marked animals caught will have been
last caught at the previous sampling and
consequently will appear along the subdiagonal

117
Mark-recapture Jolly-Seber estimate

Step 1- Setting up the J-S table
mt of marked individuals caught in sample t

118
Mark-recapture Jolly-Seber estimate

Step 1- Setting up the J-S table
mt of marked individuals caught in sample t
ut of unmarked individuals caught in sample t

119
Mark-recapture Jolly-Seber estimate

Step 1- Setting up the J-S table
mt of marked individuals caught in sample t
ut of unmarked individuals caught in sample t
nttotal of individuals caught in sample
t (mtut)

120
Mark-recapture Jolly-Seber estimate

Step 1- Setting up the J-S table
mt of marked individuals caught in sample t
ut of unmarked individuals caught in sample t
nttotal of individuals caught in sample
t (mtut)
sttotal of individuals released after sample t
(nt-deaths or removals)

121
Mark-recapture Jolly-Seber estimate

Step 1- Setting up the J-S table

122
Jolly-Seber estimate

Step 2- Calculate Rt
Rt of the st indiv released at sample t and
caught again in some later sample (e.g., for t3,
R33)

123
Jolly-Seber estimate

Step 3- Calculate Zt
Ztof individuals marked before sample t, not
caught in sample t, but caught in some other
sample after sample t (e.g., for t3, Z35)

124
Jolly-Seber estimate