Gastão A. Braga, Jussara M. Moreira, Camila F. Souza
Published 2017-08-11Version 1
In this paper we employ the Renormalization Group (RG) method to study the long-time asymptotics of a class of nonlinear integral equations with a generalized heat kernel and with time-dependent coefficients. The nonlinearities are classified and studied according to its role in the asymptotic behavior. Here we prove that adding nonlinear perturbations classified as irrelevant, the behavior of the solution in the limit $t \to\infty$ remains unchanged from the linear case. In a companion paper, we will include a type of nonlinearities called marginal and we will show that, in this case, the large time limit gains an extra logarithmic decay factor.
Asymptotics for Nonlinear Integral Equations with a Generalized Heat Kernel using Renormalization Group Technique II: Marginal Perturbations and Logarithmic Corrections to the Time Decay of Solutions
A Renormalization Group Approach to Higher Order Corrections to the Decay of Solutions to Nonlinear Integral Equations
Note on self-adjoint sub-classes of fourth-order evolution equations with time dependent coefficients
![QR code for arXiv:1708.03618 [math-ph]](http://oss.arxitics.com/images/favicon.svg)