Large deviation principles for first-order scalar conservation laws with stochastic forcing

Abstract: In this paper, we established the Freidlin-Wentzell type large deviation principles for first-order scalar conservation laws perturbed by small multiplicative noise. Due to the lack of the viscous terms in the stochastic equations, the kinetic solution to the Cauchy problem for these first-order conservation laws is studied. Then, based on the well-posedness of the kinetic solutions, we show that the large deviations holds by utilising the weak convergence approach. * Corresponding author MSC 2010 subject clas… Show more

“…Notably, in [2], the bounds for the rate function have also been derived in the vanishing viscosity limit only, so that the noise is allowed in the limit, and in the multidimensional setting. Finally, we mention the more recent work [41] and the references cited therein, large deviation principles have been derived for the first-order scalar conservation laws with small multiplicative noise on T d in the zero-noise limit by using the Freidlin-Wentzell theory. Much still remains to be explored in this direction.…”

Invariant Measures for Nonlinear Conservation Laws Driven by Stochastic Forcing

“…Notably, in [2], the bounds for the rate function have also been derived in the vanishing viscosity limit only, so that the noise is allowed in the limit, and in the multidimensional setting. Finally, we mention the more recent work [41] and the references cited therein, large deviation principles have been derived for the first-order scalar conservation laws with small multiplicative noise on T d in the zero-noise limit by using the Freidlin-Wentzell theory. Much still remains to be explored in this direction.…”

Invariant Measures for Nonlinear Conservation Laws Driven by Stochastic Forcing

“…The advantage of the new sufficient condition is to avoid proving the tightness of the controlled stochastic partial differential equation. This new sufficient condition is recently successfully applied to study the large deviation principle in [8,29,30].…”

Large deviation principle for stochastic generalized Ginzburg-Landau equation driven by jump noise

“…In recent years, the stochastic conservation laws has been developed rapidly. We refer the reader to [26,33,22,16], etc. We particularly mention the paper [13] in which the authors proved the existence and uniqueness of kinetic solution to the Cauchy problem for (1.2) in any dimension.…”

“…Later, Debussche and Vovelle [14] studied scalar conservation laws with additive stochastic forcing on torus of any dimension and proved the existence and uniqueness of an invariant measure for sub-cubic fluxes and subquadratic fluxes, respectively. Recently, for the small noise asymptotic behaviour, Dong et al [16] established Freidlin-Wentzell's type large deviation principles (LDP) for the kinetic solution to the scalar stochastic conservation laws.…”

Central Limit Theorem And Moderate Deviation Principle For Inviscid Stochastic Burgers Equation