A short note on the appearance of the simplest antilinear ODE in several physical contexts
Abstract
In this short note, we review several one-dimensional problems such as those involving linear Schroedinger equation, variable-coefficient Helmholtz equation, Zakharov-Shabat system and Kubelka-Munk equations. We show that they all can be reduced to solving one simple antilinear ordinary differential equation u(x)=f(x)u(x) or its nonhomogeneous version u(x)=f(x)u(x)+g(x), x∈(0,x0)⊂R. We point out some of the advantages of the proposed reformulation and call for further investigation of the obtained ODE.
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