AbstractWe propose a numerical method for solving integral equations whose solutions possess singularities at the end points. Our method is based on the double exponential transform and effective use of the Fast Fourier Transform. Its accuracy is tested by Nekrasov's integral equation for water-waves and Yamada's equation for solitary waves
In this paper, we produce some properties and relationship between double Laplace and double Sumudu ...
A new theory is developed here for evaluating solitary waves on water, with results of high accuracy...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
AbstractThis paper is concerned with a straightforward method of solving a singular integral equatio...
We used function theoretic method to solve a singular integral equation with logarithmic kernel in t...
In this paper, we present a numerical method for the computation of surface water waves over bottom ...
A quick method of solution of a singular integral equation of the first kind involving both logarith...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
AbstractA direct function theoretic method is applied to solve a weakly singular integral equation w...
There is various ways for solving differential equations as an exact, approximate and numerical. Mos...
A new theory is developed for evaluating solitary waves on water, with results of high accuracy unif...
The homogeneous balance of undetermined coefficient (HBUC) method is presented to obtain not only th...
A computational method for steady water waves is presented on the basis of potential theory in the p...
AbstractA basic problem is that of solving nonlinear elliptic eigenvalue problems in the plane. Prob...
In this article, the two variable (G′/G,1/G)-expansion method is suggested to investigate new and fu...
In this paper, we produce some properties and relationship between double Laplace and double Sumudu ...
A new theory is developed here for evaluating solitary waves on water, with results of high accuracy...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...
AbstractThis paper is concerned with a straightforward method of solving a singular integral equatio...
We used function theoretic method to solve a singular integral equation with logarithmic kernel in t...
In this paper, we present a numerical method for the computation of surface water waves over bottom ...
A quick method of solution of a singular integral equation of the first kind involving both logarith...
A variety of numerical methods are applied to solving the wave equations u_tt = u_xx and u_tt = u_xx...
AbstractA direct function theoretic method is applied to solve a weakly singular integral equation w...
There is various ways for solving differential equations as an exact, approximate and numerical. Mos...
A new theory is developed for evaluating solitary waves on water, with results of high accuracy unif...
The homogeneous balance of undetermined coefficient (HBUC) method is presented to obtain not only th...
A computational method for steady water waves is presented on the basis of potential theory in the p...
AbstractA basic problem is that of solving nonlinear elliptic eigenvalue problems in the plane. Prob...
In this article, the two variable (G′/G,1/G)-expansion method is suggested to investigate new and fu...
In this paper, we produce some properties and relationship between double Laplace and double Sumudu ...
A new theory is developed here for evaluating solitary waves on water, with results of high accuracy...
This is the final report of a three-year, Laboratory-Directed Research and Development (LDRD) projec...