Follytons and the Removal of Eigenvalues for Fourth Order Differential Operators

Abstract

A non-linear functional Q[u,v] is given that governs the loss, respectively gain, of (doubly degenerate) eigenvalues of fourth order differential operators L = ∂4 + ∂ u ∂ + v on the line. Apart from factorizing L as A*A + E0, providing several explicit examples, and deriving various relations between u, v and eigenfunctions of L, we find u and v such that L is isospectral to the free operator L0 = ∂4 up to one (multiplicity 2) eigenvalue E0 < 0. Not unexpectedly, this choice of u, v leads to exact solutions of the corresponding time-dependent PDE's.

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