Post on 27-Mar-2015
transcript
COBECOS model simulations.
Dutch beam trawl fishery
Model
• Two species: sole and plaice
• One enforcement instrument: port inspections
• One type of offence: over-quota catches
Private benefit function (1)
• Penalty structure: Fine plus confiscation of over-quota catch
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Social benefit function
• Social benefits = private benefits excl payments of fines – shadow value fished biomass – enforcement costs
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Probability function
• Probability estimated as number of inspections devided by number of landings
• This assumes: probability of detection when inspected is 1
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Enforcement costs function
• Enforcement costs estimated as a linear function of enforcement effort
• Costs per inspection: € 965
Simulations
• Effects of varying effort and penalty• Full compliance and optimal level of effort
at current penalty• Full compliance and optimal level of
penalty at current effort• Effects of alternative penalty structure on
optimal effort, compliance and social benefits
Simulations (2)
Current situation (2006):• Enforcement effort: 2028 port inspections per year (8%
of landings controlled)• Penalty: confiscation of over quota catches plus fine
€2200• Private benefits of the beam trawl fleet: -10 mEUR• Total revenues of the beam trawl fleet: 160 mEUR
Definitions• Non compliance (NC) = over quota catch as % of quota• Biomass effect = biomass next year as % of biomass in
simulation year
Full compliance effort and optimal effort at current penalty
Effort
Enforcement costs mEUR PB SB
Sole landings (kt)
Plaice landings (kt)
NC sole
NC plaice
Biomass sole
Biomass plaice
Current effort 2,028 2.0 -10 -130 13.0 22.5 0% 0% 108% 121%
Minimum effort f.c. 2,000 1.9 -10 -130 13.0 22.5 0% 0% 108% 121%Optimal
effort 1,800 1.7 -7 -128 13.0 37.6 0% 67% 108% 102%
No enforcem
ent 0 0.0 52 -166 21.0 78.8 62% 250% 70% 50%
Effects of varying effort on the level of Non- compliance
Minimum effort for full compliance: 2000 insp.
Effect of varying enforcement effort on private benefits
Lowering effort from 2000 to 0 increases private benefits from -10 tot 50 mEUR
Effect of varying effort on social benefits
Optimal effort: 1800 inspections per year
Effect of varying effort on private and social benefits
NPB = SB – PB = payed fines - shadow value – enforcement costs
Effects of changing enforcement effort on biomass of plaice and sole
Biomass effect = Biomass as % of biomass in previous year
Full compliance fine and optimal fine at current effort
Fine (€) PB SB
Catch sole (kt)
Catch plaice
NC sole
NC plaice
Biomass sole
Biomass plaice
Current fine
2,200 -10 -130 13.0 22.5 0% 0%108
%121
%Minimum fine for full compliance 1,800 -10 -130 13.0 22.5 0% 0%
108%
121%
Range of optimal fines 0-1700
0 -9 -129 13.0 30.0 0% 33%108
%112
%
1,700 -10 -129 13.0 30.0 0% 33%108
%112
%
Varying the complete penalty: Full compliance and optimal
penalty at current effort
Penalty
% of current penalty PB SB NC sole
NC plaice
Biomass sole
Biomass plaice
Minimum penalty for full compliance 100% -10 - 130.0 0% 0% 108% 121%
Optimal penalty 90% -9 - 129.6 0% 50% 108% 107%
Varying the complete penalty: for instance penalty of 90% of current penaltymeans that 90% of catches are confiscated and the fine is 90% of current fine
Effect of varying the penalty on compliance
Effect of varying the penalty on private and social benefits
Effect of varying the penalty on biomass
Impact of more efficient enforcement on optimal effort
Decrease of
enforcement
costs per unit
Optimal Effort
Enforcement costs PB SB
sole (kt)
Plaice (kt)
NC sole
NC plaice
Biomass sole
Biomass plaice
0%1,800 1.7 -7 -128 13.0 37.6 0% 67% 108% 102%
10%1,800 1.6 -7 -128 13.0 37.6 0% 67% 108% 102%
20%1,800 1.4 -7 -127 13.0 37.6 0% 67% 108% 102%
50%1,880 0.9 -9 -119 13.0 33.8 0% 50% 108% 107%
Impact of an alternative penalty structure
• Does a different penalty structure change the optimal level enforcement effort?
• And does it change social benefits at the optimal solution?
• Current penalty: fine (€2200) + confiscation of over-quota catch
• Alternative penalty: fine proportional to over-quota catch
Private benefit function (2)
• Penalty structure: Fine proportional to over-quota catch
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Comparing penalty structuresP: proportional fineC: confiscation + fine Fine Effort
Enforcement costs PB SB
NC sole
NC plaice
P: Minimum fine for full compliance at current effort
8.4 €/kg 2,028 2.0 -10 -130.0 0% 0%
C: Minimum penalty for full compliance 100% 2,028 2.0 -10 -130.0 0% 0%P: Optimal fine at current effort
8.4 €/kg 2,028 2.0 -10 -130.0 0% 0%
C: Optimal penalty, current effort 90% 2,028 2.0 -9 - 129.6 0% 50%P: Optimal effort at that fine level 8.4€/kg 1,752 1.7 -9 -128.3 8% 0%C: Optimal effort, current fine 100% 1,800 1.7 -7 -128.0 0% 67%
Conclusions /Discussion
• Different penalty structures may provide different incentives for fishermen and can lead to different private and social benefits
• Partial analysis of: landings inspections are also used for other offences (undersized fish, logbook etc); optimal effort may be different when other offences taken into account
Discussion / Questions
• Should the shadow value of discards be included in the social benefit function?? If discards are related to landings this would influence the optimizing process.
• What does it mean when social benefits are negative? Is society better off without fishing? Have we included all social benefits?
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The End
Increasing social benefits by lowering effort and increasing
the fine
Enforcement effort
Minimum fine full compliance (€) PB SB
Catch sole (kt)
Catch plaice (kt) NC sole
NC plaice
1,800 9,000 -10 -128 13.0 22.5 0% 0%
1,600 26,000 -10 -126 13.0 22.5 0% 0%
1,400 61,000 -10 -124 13.0 22.5 0% 0%
Higher penalties: minimum level of effort for f.c.
Penalty Effort PB SB
Landings sole (kt)
Landings plaice (kt)
Biomass sole
Biomass plaice
100% 2,000 -10 -130 13.0 22.5 108% 121%
150% 1,680 -9 -127 13.0 22.5 108% 121%
200% 1,480 -10 -125 13.0 22.5 108% 121%
Higher penalties: optimal level of effort
Penalty Effort
Enforcement costs PB SB
Landings sole (kt)
Landings plaice (kt)
Biomass sole
Biomass plaice
100% 1,800 1.7 -7 -128 13.0 37.6 108% 102%
150% 1,600 1.6 -10 -125 13.0 33.8 108% 107%
200% 1,360 1.3 -7 -124 13.0 37.6 108% 102%