Linear Superposition for a Large Number of Nonlinear Equations

Abstract

We demonstrate a kind of linear superposition for a large number of nonlinear equations, both continuum and discrete. In particular, we show that whenever a nonlinear equation admits solutions in terms of Jacobi elliptic functions (x,m) and (x,m), then it also admits solutions in terms of their sum as well as difference, i.e. (x,m) m\, (x,m). Further, we also show that whenever a nonlinear equation admits a solution in terms of 2(x,m), it also has solutions in terms of 2(x,m) m\, (x,m)\, (x,m) even though (x,m)\, (x,m) is not a solution of that nonlinear equation. Finally, we obtain similar superposed solutions in coupled theories.