Propagation modes and linear systems

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In the book "Fundamentals of photonics", the authors defined waveguide modes using the notion of linear systems, where they said:

"Every linear system is characterized by special inputs that are invariant to the system, i.e., inputs that are not altered (except for a multiplicative constant) upon passage through the system. These inputs are called the modes, or the eigenfunctions, of the system. The multiplicative constants are the eigenvalues; they are the attenuation or amplification factors of the modes."

What is the link between this definition and the eigenvalue problem determined by helmholtz equation?
 
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I want to clarify my question. In fact, a linear system is caracterised by a linear operator H shch that
Ao = H Ai, where Ai and Ao are respectively the input and output. A mode of this linear system should satisfy
Ao = λ Ai, so that H Ai = λ Ai.
However, in the case of helmholtz equation ∆E = - k2E, and we can certainly not say that the input is the electric field and the output is - k2E.