Nonlinear bang-bang eigenproblems and optimization of resonances in layered cavities

TL;DR

This paper investigates the optimization of resonances in layered optical or mechanical cavities by analyzing nonlinear eigenproblems, proving the existence of optimal structures, and characterizing the spectrum of bang-bang eigenproblems to find minimal decay configurations.

Contribution

It introduces a variational framework for nonlinear eigenproblems in resonance optimization, proving existence of optimizers and characterizing the spectrum of bang-bang eigenproblems.

Findings

Existence of various optimal structures for resonance optimization.

Identification of structures resembling size-modulated 1-D stack cavities.

Discussion on the nonexistence of global decay rate minimizers.

Abstract

Quasi-normal-eigenvalue optimization is studied under constraints $b_1(x) \le B(x) \le b_2 (x)$ on structure functions $B$ of 2-side open optical or mechanical resonators. We prove existence of various optimizers and provide an example when different structures generate the same optimal quasi-(normal-)eigenvalue. To show that quasi-eigenvalues locally optimal in various senses are in the spectrum $\Sigma^{nl}$ of the bang-bang eigenproblem $y" = - \omega^2 y [ b_1 + (b_2 - b_1) \chi_{\mathbb{C}_+} (y^2 ) ]$, where $\chi_{\mathbb{C}_+} (\cdot)$ is the indicator function of the upper complex half-plane $\mathbb{C}_+$, we obtain a variational characterization of the nonlinear spectrum $\Sigma^{nl}$ in terms of quasi-eigenvalue perturbations. To address the minimization of the decay rate $| \mathrm{Im} \ \omega |$, we study the bang-bang equation and explain how it excludes an unknown optimal $B$ from the optimization process. Computing one of minimal decay structures for 1-side open settings, we show that it resembles gradually size-modulated 1-D stack cavities introduced recently in Optical Engineering. In 2-side open symmetric settings, our example has an additional centered defect. Nonexistence of global decay rate minimizers is discussed.