On Large-Space and Long-Time Asymptotic Behaviors of Kink-Soliton Gases in the Sine-Gordon Equation

Abstract

We conduct a comprehensive analysis of the large-space and long-time asymptotics of kink-soliton gases in the sine-Gordon (sG) equation, addressing an important open problem highlighted in the recent work [Phys. Rev. E 109 (2024) 061001]. We focus on kink-soliton gases modeled within a Riemann-Hilbert framework and characterized by two types of generalized reflection coefficients, each defined on the interval [η1, η2]: r0(λ) = (λ - η1)β1 (η2 - λ)β2 |λ - η0|β0 γ(λ) and rc(λ) = (λ - η1)β1 (η2 - λ)β2 c(λ) γ(λ), where 0 < η1 < η0 < η2 and βj > -1, \(γ(λ)\) is a continuous, strictly positive function defined on [η1, η2]. The function \(c(λ)\) demonstrates a step-like behavior: it is given by \(c(λ) = 1\) for \(λ ∈ [η1, η0)\) and \(c(λ) = c2\) for \(λ ∈ (η0, η2]\), with \(c\) as a positive constant distinct from one. To rigorously derive the asymptotic results, we leverage the Deift-Zhou steepest descent method. A central component of this approach is constructing an appropriate \(g\)-function for the conjugation process. Unlike in the KdV equation, the sG presents unique challenges for \(g\)-function formulation, particularly concerning the singularity at the origin. The Riemann-Hilbert problem also requires carefully constructed local parametrices near endpoints \(ηj\) and the singularity \(η0\). At the endpoints \(ηj\), we employ a modified Bessel parametrix of the first kind. For the singularity \(η0\), the parametrix selection depends on the reflection coefficient: the second kind of modified Bessel parametrix is used for \(r0(λ)\), while a confluent hypergeometric parametrix is applied for \(rc(λ)\).