Litcius/Paper detail

Diagonalization of the Hamiltonian for finite-sized dispersive media: Canonical quantization with numerical mode decomposition

Dong-Yeop Na, Jie Zhu, Weng Cho Chew

2021Physical review. A/Physical review, A24 citationsDOIOpen Access PDF

Abstract

We present a math-physics modeling approach called canonical quantization with numerical mode decomposition for capturing the physics of how incoming photons interact with finite-sized dispersive media, which is not describable by the previous Fano-diagonalization methods. The main procedure is to (1) study a system where electromagnetic fields are coupled to nonuniformly distributed Lorentz oscillators in Hamiltonian mechanics, (2) derive a generalized Hermitian eigenvalue problem for conjugate pairs in coordinate space, (3) apply computational electromagnetics methods to find a countably finite set of time-harmonic eigenmodes that diagonalizes the Hamiltonian, and (4) perform the subsequent canonical quantization with mode decomposition. Moreover, we provide several numerical simulations that capture the physics of full quantum effects, impossible by classical Maxwell's equations, such as nonlocal dispersion cancellation of an entangled photon pair and the Hong-Ou-Mandel effect in a dispersive beam splitter.

Topics & Concepts

Hamiltonian (control theory)Mathematical physicsCanonical quantizationQuantization (signal processing)MathematicsPhysicsQuantum mechanicsQuantumMathematical optimizationAlgorithmQuantum gravityQuantum optics and atomic interactionsPhotonic and Optical DevicesLaser-Matter Interactions and Applications