We consider Neumann boundary value problems of the form u(xx) + f(x, u, u(x
)) = 0 oil the unit interval 0 less than or equal to x less than or equal t
o 1 for a certain class of dissipative nonlinearities f. Associated to thes
e problems we have ii) meanders in the phase space (u, u(x)) is an element
of R-2 which are connected oriented simple curves on the plane intersecting
a fixed oriented line (the u-axis) in n points corresponding to the soluti
ons: and iii) meander permutations pi(f) is an element of S(n) obtained by
ordering the intersection points first along the u-axis and then along the
meander. The meander permutation pi(f) is the permutation defined by the br
aid of solutions in the space (x, u, u(x)). It was recently shown by Fiedle
r and Rocha that n, determines the global attractor of the dynamical system
generated by the semilinear parabolic differential equation u(t) = u(xx) f(x, u, u(x)), up to C-0 orbit equivalence. Therefore. these permutations
are of considerable importance in the classification problem of the (Morse
Smale) attractors for these dynamical systems. In this paper we present a p
urely combinatorial characterization of the set of meander permutations tha
t ale realizable by the above boundary value problems. (C) 1999 Academic Pr
ess.