430 Ordinary Differential Equations
21y0
-1-1 0 1 2
xFigure 10.8b Phase-Plane Portrait for System (11)EXAMPLE 8 Determining Critical Points and Type of Stability
for a Nonlinear SystemFind all critical points of the nonli near systemx' = -y-x^3 = f(x,y)
(13)
y' = x - y^3 = g(x, y).For each critical point determine the type of stability and type of critical
point.
SOLUTIONSolving -y - x^3 = 0 for y and substituting the res ult into x - y^3 = 0, we
see that the x coordinate of the critical points must satisfy
x - (- x^3 )^3 = x + x^9 = x(l + x^8 ) = 0.
Since x = 0 is the only real solution of x(l + x^8 ) = 0, the only critical point
of system (13) is (0, 0).