https://doi.org/10.1007/s100510051011
Pump and probe nonlinear processes: new modified sum rules from a simple oscillator model
Scuola Normale Superiore, 56100 Pisa
and Istituto Nazionale di Fisica della Materia, Italy
Corresponding author: a lucarini@cibs.sns.it
Received:
25
January
1999
Revised:
26
April
1999
Published online: 15 December 1999
The nonlinear oscillator model is useful to basically understand the most important properties of nonlinear optical processes. It has been shown to give the correct asymptotic behaviour and to provide the general features of harmonic generation to all orders, in particular dispersion relations and sum rules. We investigate the properties of pump and probe processes using this model, and study those cases where general theorems based on the holomorphic character of the Kubo response functions cannot be applied. We show that it is possible to derive new sum rules and new Kramers-Krönig relations for the two lowest moments of the real and of the imaginary part of the third order susceptibility and that new specific contributions become relevant as the intensity of the probe increases. Since the analytic properties of the susceptibility functions depend only upon the time causality of the system we are confident that these results are not model dependent and therefore have a general validity, provided one substitutes for the equilibrium values of the potential derivatives the density matrix expectation values of the corresponding operators.
PACS: 42.65.An – Optical susceptibility, hyperpolarizability / 42.65.Dr – Stimulated Raman scattering; CARS / 42.65.Sf – Dynamics of nonlinear optical systems; optical instabilities, optical chaos and complexity, and optical spatio-temporal dynamics / 78.20.Bh – Theory, models, and numerical simulation / 78.20.Ci – Optical constants (including refractive index, complex dielectric constant, absorption, reflection and transmission coefficients, emissivity)
© EDP Sciences, Società Italiana di Fisica, Springer-Verlag, 1999