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Rigorous Formulation of the Lasing Eigenvalue Problem as a Spectral Problem for a Fredholm Operator Function formulation of the lasing eigenvalue problem as a spectral problem for an operator-valued function, which
Residual Inverse Iteration for the Lasing Eigenvalue Problem method for solution of the Lasing Eigenvalue Problem is proposed. The numerical study demonstrates
Symmetry accounting helps solve the Lasing Eigenvalue Problems for optical microcavities formalism of the Lasing Eigenvalue Problem (LEP) with exact boundary and radiation conditions. We reduce
Laser modes of active eccentric microring cavities. The calculations are based on the lasing eigenvalue problem reduced to a set of the boundary integral equations
Spectra, Thresholds, and Modal Fields of a Triangular Microcavity Laser-magnetics approach. Our instrument is the accurate formalism of Lasing Eigenvalue Problem (LEP), i.e. boundary
Muller Boundary Integral Equations in the Microring Lasers Theory-frequency eigenvalue problem and the corresponding nonlinear eigenvalue problem for the set of Muller integral
Unidirectional Emission of Active Eccentric Microring Cavities for active eccentric microring cavities are based on the lasing eigenvalue problem, which was reduced
Modal Fields of a Triangular Microcavity Laser with a Piercing Hole as solutions of the Lasing Eigenvalue Problem using the system of Muller boundary integral equations
Symmetry accounting helps solve the Lasing Eigenvalue Problems for optical microcavities formalism of the Lasing Eigenvalue Problem (LEP) with exact boundary and radiation conditions. We reduce
Exponentially convergent galerkin method for numerical modeling of lasing in microcavities with piercing holesThe paper investigates an algorithm for the numerical solution of a parametric eigenvalue problem
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