THEORETICAL MODELING OF RELAXATION OSCILLATIONS IN ER-DOPED WAVE-GUIDE LASERS

An analysis of relaxation oscillations (lambda(s) almost-equal-to 1.5 mum) in locally Er-doped optically pumped (lambda(p) almost-equal-to 1 .48 mum) waveguide lasers is reported. The theoretical model is based on time dependent rate equations for a quasi-two-level-system and on t he equation of continuity for a gain medium. For the first time a nume rically reliable simulation of the elementary properties of the laser oscillations was possible: the build-up time and decay of the relaxati on oscillations, the time-dependent repetition period, the steady stat e signal output power and the evolution of the pump power versus time. Mathematically the problem can be characterized as a large boundary v alue problem, which can approximately be replaced by a stiff initial v alue problem of ordinary differential equations. In this report, pump- and signal evolution versus time are presented for planar Er-diffused Ti:LiNbO3 waveguide lasers. The numerically obtained results show a g ood quantitatively agreement with experimental investigations.