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Linear systems are characterized by two main properties: superposition and homogeneity. Superposition allows the response to multiple inputs to be the sum of the responses to each individual input. Homogeneity ensures that scaling an input by a scalar results in the response being scaled by the same scalar.
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James Clerk Maxwell (1831–1879) was one of the significant contributors to physics in the nineteenth century. He is probably best known for having combined existing knowledge of the laws of electricity and the laws of magnetism with his insights to form a complete overarching electromagnetic theory, represented by Maxwell's equations. The four basic laws of electricity and magnetism were discovered experimentally through the work of physicists such as Oersted, Coulomb, Gauss, and...
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The first order operators using the del operator include the gradient, divergence and curl. Certain combinations of first order operators on a scalar or vector function yield second order expressions. Second-order expressions play a very important role in mathematics and physics. Some second order expressions include the divergence and curl of a gradient function, the divergence and curl of a curl function, and the gradient of a divergence function.
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In an underdamped second-order system, where the damping ratio ζ is between 0 and 1, a unit-step input results in a transfer function that, when transformed using the inverse Laplace method, reveals the output response. The output exhibits a damped sinusoidal oscillation, and the difference between the input and output is termed the error signal. This error signal also demonstrates damped oscillatory behavior. Eventually, as the system reaches a steady state, the error diminishes to zero.
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Stable, high-order computation of impedance-impedance operators for three-dimensional layered medium simulations.

Proceedings. Mathematical, physical, and engineering sciences·2018
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Related Experiment Video

Updated: Sep 11, 2025

Measurement of Scattering Nonlinearities from a Single Plasmonic Nanoparticle
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A high-order perturbation method for analysing the Dirichlet-Neumann operator for a nonlinear Kerr medium.

David P Nicholls1

  • 1Department of Mathematics, Statistics, and Computer Science (MC 249) 851 South Morgan Street, University of Illinois Chicago, Chicago, IL 60607, USA.

Philosophical Transactions. Series A, Mathematical, Physical, and Engineering Sciences
|August 14, 2025
PubMed
Summary

Discovering nonlinear optical responses in epsilon-near-zero (ENZ) materials using moderate light fields is now possible. This study introduces a novel surface method using Dirichlet-Neumann operators for accurate simulations of nonlinear optical phenomena.

Keywords:
Dirichlet–Neumann operatorshigh-order perturbation methodsnonlinear Kerr media

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Area of Science:

  • Computational Electromagnetics
  • Nonlinear Optics
  • Materials Science

Background:

  • Intense radiation is not the sole method for achieving nonlinear optical responses.
  • Indium Tin Oxide (ITO) exhibits strong nonlinear effects near epsilon-near-zero (ENZ) wavelengths even with moderate fields.

Purpose of the Study:

  • To introduce and analyze a novel formulation for the Capretti experiment.
  • To develop robust and accurate numerical simulations for nonlinear optical phenomena.
  • To explore surface methods as an alternative to volumetric algorithms for specific geometries.

Main Methods:

  • Development of a surface-based approach utilizing Dirichlet-Neumann operators (DNOs).
  • Analysis of the DNO for a nonlinear Kerr medium layer.
  • Perturbative proof methods to establish DNO properties.

Main Results:

  • The Dirichlet-Neumann operator is well-defined and analytic for nonlinear Kerr media layers.
  • Surface methods offer optimal performance for piecewise homogeneous geometries.
  • The perturbative approach suggests avenues for stable numerical simulations.

Conclusions:

  • The proposed interfacial approach using DNOs provides an efficient and accurate method for simulating nonlinear optical responses in ENZ materials.
  • This work opens new possibilities for incorporating interface deformations into theoretical and numerical models.
  • The findings contribute to advancements in computationally grounded full-wave methods.