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Transient growth and dissipative exceptional points

K. G. Makris

2021Physical review. E26 citationsDOI

Abstract

In the context of non-Hermitian photonics, we study the physics of transient growth in coupled waveguide systems that exhibit higher-order exceptional points. We demonstrate the counterintuitive effect of transient growth despite the decaying spectrum, which is a direct consequence of the underlying modal nonorthogonality. Eigenvalue analysis fails to capture the power dynamics and thus we have to rely on methods of nonmodal stability theory, namely singular value decomposition and pseudospectra. The relation between the order of the exceptional point and transient growth is also examined. Our work provides a general methodology that can be applied to any non-Hermitian system that contains complex elements with more loss than gain, and exploits the boundaries of transient amplification in dissipative environments.

Topics & Concepts

Dissipative systemTransient (computer programming)Context (archaeology)Stability (learning theory)PhysicsEigenvalues and eigenvectorsWork (physics)Classical mechanicsModalTransient responseMathematicsPower (physics)Statistical physicsDissipative operatorRelation (database)Point (geometry)ComputationMathematical analysisControl theory (sociology)DissipationBreakupLimit (mathematics)Exponential stabilityInstabilityMechanicsQuantum Mechanics and Non-Hermitian PhysicsNonlinear Photonic SystemsAdvanced Fiber Laser Technologies
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