We present a novel method for numerically computing the wave speed of a soliton-like travelling wave in chiral smectic C liquid crystals (SmC*) that satisfies a parabolic partial differential equation (PDE) with a general nonlinear term [1]. By transforming the PDE to a co-moving frame and recasting the resulting problem in phase-space, the original PDE can be expressed as an integral equation known as an exceptional nonlinear Volterra-type equation of the second kind. This technique is motivated by, but distinct in nature from, iterative integral methods introduced by Chernyak [2]. By applying a simple trapezoidal method to the integral equation we generate a system of nonlinear simultaneous equations which we solve for our phase plane var...
Employing the continuum theory of liquid crystals proposed by 'Leslie- (1), we present an analy...
We discuss minimality conditions for the speed of monotone travelling waves in a sample of smectic C...
(Communicated by Pierangelo Marcati) Abstract. We study a variational system of nonlinear hyperbolic...
A continuum model incorporating flow is developed as an extension to the work of Stewart and Momonia...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
In this study, trigonometric and hyperbolic type traveling wave solutions are produced by using the ...
In this research paper, we try to illustrate the structure of the novel exact soliton wave solutions...
We investigate the growth of crystal shape in the presence of corners. The evolution equation can be...
This article investigates, by means of Lie point symmetries, traveling wave solutions to a dynamic e...
In this paper, we present energy-stable numerical schemes for a Smectic-A liquid crystal model. Thi...
In this article, we investigate the lump, soliton, periodic, kink, and rogue waves to the time-fract...
We interpret the purely spectral forward Maxwell equation with up to 3rd order induced polarizations...
This manuscript aims to construct a family of travelling wave solutions to the high nonlinearity dif...
AbstractWe analyze several aspects of the singular behavior of solutions of a variational nonlinear ...
The Belousov Zhabotinskii reaction is a visually dramatic oscillating phenomenon for which a chemica...
Employing the continuum theory of liquid crystals proposed by 'Leslie- (1), we present an analy...
We discuss minimality conditions for the speed of monotone travelling waves in a sample of smectic C...
(Communicated by Pierangelo Marcati) Abstract. We study a variational system of nonlinear hyperbolic...
A continuum model incorporating flow is developed as an extension to the work of Stewart and Momonia...
<p>The parabolic (Fisher-Kolmogorov) PDE gives wave speed that indefinitely grows with network degr...
In this study, trigonometric and hyperbolic type traveling wave solutions are produced by using the ...
In this research paper, we try to illustrate the structure of the novel exact soliton wave solutions...
We investigate the growth of crystal shape in the presence of corners. The evolution equation can be...
This article investigates, by means of Lie point symmetries, traveling wave solutions to a dynamic e...
In this paper, we present energy-stable numerical schemes for a Smectic-A liquid crystal model. Thi...
In this article, we investigate the lump, soliton, periodic, kink, and rogue waves to the time-fract...
We interpret the purely spectral forward Maxwell equation with up to 3rd order induced polarizations...
This manuscript aims to construct a family of travelling wave solutions to the high nonlinearity dif...
AbstractWe analyze several aspects of the singular behavior of solutions of a variational nonlinear ...
The Belousov Zhabotinskii reaction is a visually dramatic oscillating phenomenon for which a chemica...
Employing the continuum theory of liquid crystals proposed by 'Leslie- (1), we present an analy...
We discuss minimality conditions for the speed of monotone travelling waves in a sample of smectic C...
(Communicated by Pierangelo Marcati) Abstract. We study a variational system of nonlinear hyperbolic...