In this article, stability of multiple-pulse solutions in semilinear parabolic equations on the real line is studied. A system of equations is derived which determines stability of
N
N
-pulses bifurcating from a stable primary pulse. The system depends only on the particular bifurcation leading to the existence of the
N
N
-pulses.
As an example, existence and stability of multiple pulses are investigated if the primary pulse converges to a saddle-focus. It turns out that under suitable assumptions infinitely many
N
N
-pulses bifurcate for any fixed
N
>
1
N>1
. Among them are infinitely many stable ones. In fact, any number of eigenvalues between 0 and
N
−
1
N-1
in the right half plane can be prescribed.