Abstract

We have introduced a novel (to our knowledge) class of complex-variable-function (CVF)—Gaussian solitons that constitute the exact soliton solutions of the Snyder–Mitchell model. The CVF–Gaussian solitons whose transverse structure has an inherent rotation are the product of an arbitrary analytic CVF and a Gaussian function. A distribution factor that is the parameter for the description of the transverse distribution of the CVF–Gaussian solitons is discussed.

© 2008 Optical Society of America

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