AbstractComputationally efficient physically accurate solutions have been found for broad classes of equations including systems of nonlinear partial differential equations without linearization by the decomposition method
Decompositions of linear ordinary differential equations (ode's) into components of lower order have...
This chapter runs through some techniques that can be used to tackle partial differential equations ...
This article covers the concept of general solutions of partial differential equations. Also, as in ...
The purpose of this research is to employ a new method to solve nonlinear differential equations to ...
AbstractWe present a further development of the decomposition method [1,2], which leads to a single ...
Differential equations, especially nonlinear, present the most effective way for describing complex ...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
Investigating the correspondence between systems of partial differential equations and their analyti...
AbstractSolution of a coupled system of nonlinear partial differential equations is demonstrated for...
A balanced guide to the essential techniques for solving elliptic partial differential equations Nu...
A standard approach for solving linear partial differential equations is to split the solution into ...
This paper aims to exemplify some concepts in partial differential equations. Partial differential e...
A semi-analytical solution technique is presented for solving linear partial differential equations....
Abstract. Numerical approximation of the solution of partial differential equations plays an importa...
AbstractGeneric operator equations allowing multidimensional operators are solved by a decomposition...
Decompositions of linear ordinary differential equations (ode's) into components of lower order have...
This chapter runs through some techniques that can be used to tackle partial differential equations ...
This article covers the concept of general solutions of partial differential equations. Also, as in ...
The purpose of this research is to employ a new method to solve nonlinear differential equations to ...
AbstractWe present a further development of the decomposition method [1,2], which leads to a single ...
Differential equations, especially nonlinear, present the most effective way for describing complex ...
AbstractWe consider the solution of partial differential equations for initial/boundary conditions u...
Investigating the correspondence between systems of partial differential equations and their analyti...
AbstractSolution of a coupled system of nonlinear partial differential equations is demonstrated for...
A balanced guide to the essential techniques for solving elliptic partial differential equations Nu...
A standard approach for solving linear partial differential equations is to split the solution into ...
This paper aims to exemplify some concepts in partial differential equations. Partial differential e...
A semi-analytical solution technique is presented for solving linear partial differential equations....
Abstract. Numerical approximation of the solution of partial differential equations plays an importa...
AbstractGeneric operator equations allowing multidimensional operators are solved by a decomposition...
Decompositions of linear ordinary differential equations (ode's) into components of lower order have...
This chapter runs through some techniques that can be used to tackle partial differential equations ...
This article covers the concept of general solutions of partial differential equations. Also, as in ...