Soliton propagation in relativistic hydrodynamics
D.A. Foga\c{c}a, F. S. Navarra
TL;DR
This paper extends the study of KdV solitons from non-relativistic to relativistic hydrodynamics in nuclear matter, using quantum hadrodynamics to analyze soliton formation and propagation.
Contribution
It introduces a relativistic formalism for KdV solitons in nuclear matter, building upon previous non-relativistic models.
Findings
Conditions for relativistic soliton formation established
Results depend on quantum hadrodynamics equation of state
Relativistic effects influence soliton propagation characteristics
Abstract
We study the conditions for the formation and propagation of Korteweg-de Vries (KdV) solitons in nuclear matter. In a previous work we have derived a KdV equation from Euler and continuity equations in non-relativistic hydrodynamics. In the present contribution we extend our formalism to relativistic fluids. We present results for a given equation of state, which is based on quantum hadrodynamics (QHD).
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