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Spatio-temporal dynamics, fish farms and pair-approximations. Maths2005 The University of Liverpool Kieran Sharkey, Roger Bowers, Kenton Morgan. DEFRA funded. Investigate epidemiology of three fish diseases IHN (Infectious Haematopoietic Necrosis) VHS (Viral Haemorrhagic Septicaemia)
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Spatio-temporal dynamics, fish farms and pair-approximations Maths2005 The University of Liverpool Kieran Sharkey, Roger Bowers, Kenton Morgan
DEFRA funded Investigate epidemiology of three fish diseases IHN (Infectious Haematopoietic Necrosis) VHS (Viral Haemorrhagic Septicaemia) GS (Gyrodactylus Salaris) Collaboration between: Liverpool UniversityVeterinaryEpidemiology Group Liverpool UniversityApplied Maths Dept Lancaster UniversityStatistics Dept Stirling UniversityInstitute for Aquaculture CEFAS – Defra funded Laboratory
Outline The symmetric pair-wise model and Foot&Mouth disease Application to fish farms Overview of non-symmetric model Results from non-symmetric model applied to fish farm data
A B C D 0 0 0 1 0 0 1 1 0 1 0 0 1 1 0 0 A B C D Contact Network B C A D
2001 Foot&Mouth Outbreak Total ban on livestock movement Route of transmission assumes to be local & symmetric
I S
S S t I
Pair-wise Equations d[SS]/dt = -2[SSI] d[SI]/dt = ([SSI]-[ISI]-[SI])-g[SI] d[SR]/dt = -[RSI]+g[SI] d[II]/dt = 2([ISI]+[SI])-2g[II] d[IR]/dt = [RSI]+g([II]-[IR]) d[RR]/dt = 2g[IR]
B B B B A A A A C C C C + Triples Approximation
Disease transmission between fish farms Slides in this section provided by Mark Thrush at CEFAS
Nodes Fish Farms Fisheries Wild populations Routes of transmission Live fish movement Water flow Wild fish migration Fish farm personnel & equipment Disease transmission matrix ?
Nodes Fish farms
Nodes Fish farms Fisheries
Nodes Fish farms Fisheries Wild fish (EA sampling sites)
Thames Test Avon Itchen Stour
Route 1: Live Fish Movement Thames Test Avon Itchen Stour
0 1 0 1 0 0 0 0 0 0 0 1 0 0 0 0 1 0 Gs = Ga = Contact network: eg 0 1 1 1 0 0 0 1 0 G =
S I S←I S I S→I S I S↔I
B B B A A A C C C +
Nodes Fish farms
3576 0 65 65 1714 65 65 8 829 0 65 0 32 8 0 0 16 0 0 0 0 0 0 0
Summary The symmetric pair-wise equations can be generalised to include asymmetric transmission.
Summary The non-symmetric model can give significantly different predictions to the symmetric model.
Summary The non-symmetric model is closer to stochastic simulation than the symmetric model on one non-symmetric network.