q-Gaussian integrable Hamiltonian reductions in anisentropic gasdynamics

Integrable reductions in non-isothermal spatial gasdynamics are isolated corresponding to q-Gaussian density distributions. The availability of a Tsallis parameter q in the reductions permits the construction via a Madelung transformation of wave packet solutions of a class of associated q-logarithmic nonlinear Schrodinger equations involving a de Broglie-Bohm quantum potential term.

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