Abstract :
We consider the periodic parabolic differential equation ε2( ∂2u
∂x2 − ∂u
∂t ) = f (u, x, t, ε) under
the assumption that ε is a small positive parameter and that the degenerate equation
f (u, x, t, 0) = 0 has two intersecting solutions. We derive conditions such that there exists
an asymptotically stable solution up(x, t, ε) which is T -periodic in t, satisfies no-flux
boundary conditions and tends to the stable composed root of the degenerate equation
as ε→0.
