The unified theory of chirped-pulse oscillators
Vladimir L. Kalashnikov
TL;DR
This paper introduces a comprehensive analytical theory for chirped-pulse oscillators, enabling the prediction of their behavior in both solid-state and fiber systems within the positive dispersion regime.
Contribution
It provides an approximate analytical framework based on the nonlinear complex Ginzburg-Landau equation for understanding chirped-pulse oscillators.
Findings
Parametric space characterization of oscillators
Application to solid-state and fiber systems
Insights into positive dispersion regime operation
Abstract
A completely analytical theory of chirped-pulse oscillators is presented. The theory is based on an approximate integration of the generalized nonlinear complex Ginzburg-Landau equation. The obtained parametric space of a chirped-pulse oscillator allows easy tracing the characteristics of both solid-state and fiber oscillators operating in the positive dispersion regime.
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