1. The Lotka-Volterra or predator-prey equationsdU= aU – UV,dt(1)AP= eyUV – BV.dt(2)have two fixed points (U., V.) = (0,0), (U., V.) = (-:). The trivial fixed point (0,0) is unstablesince the prey population grows exponentially if it is initially small.Investigate the stability of the second fixed point (U..V.) =6:27 PM3/3/2021近

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1. The Lotka-Volterra or predator-prey equations dU (1) = aU-UV, dt AP eyUV-BV. (2) dt have two fixed points (U., V.) (0,0), (U.,V.) = (2 4). The trivial fixed point (0,0) is unstable %3D ey since the prey population grows exponentially if it is initially small. Investigate the stability of the second fixed point (U..V.) = (

1. The Lotka-Volterra or predator-prey equations dU (1) = aU-UV, dt AP eyUV-BV. (2) dt have two fixed points (U., V.) (0,0), (U.,V.) = (2 4). The trivial fixed point (0,0) is unstable %3D ey since the prey population grows exponentially if it is initially small. Investigate the stability of the second fixed point (U..V.) = (

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

1. The Lotka-Volterra or predator-prey equations
dU
= aU – UV,
dt
(1)
AP
= eyUV – BV.
dt
(2)
have two fixed points (U., V.) = (0,0), (U., V.) = (-
:). The trivial fixed point (0,0) is unstable
since the prey population grows exponentially if it is initially small.
Investigate the stability of the second fixed point (U..V.) =
6:27 PM
3/3/2021
近

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ISBN:

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