AbstractA numerical method is proposed for estimating the blow-up time and the blow-up rate of the solution of ordinary differential equation (ODE), when the solution diverges at a finite time, that is, the blow-up time. The main idea is to transform the ODE into a tractable form by the arc length transformation technique [S. Moriguti, C. Okuno, R. Suekane, M. Iri, K. Takeuchi, Ikiteiru Suugaku—Suuri Kougaku no Hatten (in Japanese), Baifukan, Tokyo, 1979.], and to generate a linearly convergent sequence to the blow-up time. The sequence is then accelerated by the Aitken Δ2 method. The present method is applied to the blow-up problems of partial differential equations (PDEs) by discretising the equations in space and integrating the resultin...
The equation u t =Δu+u p with homogeneous Dirichlet boundary conditions has solutions with blow-up i...
Time dependent nonlinear partial differential equations, like for example reaction diffusion equatio...
AbstractThis paper deals with the blow-up rate of positive solution to semilinear reaction diffusion...
AbstractA numerical method is proposed for estimating the blow-up time and the blow-up rate of the s...
M.Sc.There have been an extensive study on solutions of differential equations modeling physical phe...
In this paper, we study the numerical blow-up solutions and times of the semilinear heat equation wi...
Reactive-diffusive systems modeling physical phenomena in certain situations develop a singularity a...
Abstract. The computation of blow-up solutions to a differential equation is often a difficult task....
In this paper, we investigate the numerical algorithms to capture the blow-up time for a class of co...
Many nonlinear differential equations have solutions that cease to exist in finite time because thei...
Abstract. We find an estimate for the blow-up time in terms of the initial data for solutions of the...
This paper concerns the study of the numerical approximation for the following parabolic equations w...
We study the finite difference approximation for axisymmetric solutions of a parabolic system with b...
We obtain some conditions under which the positive solution for semidiscretizations of the semilinea...
Using the test function technique, we obtain sufficient conditions for the blow-up of solutions to...
The equation u t =Δu+u p with homogeneous Dirichlet boundary conditions has solutions with blow-up i...
Time dependent nonlinear partial differential equations, like for example reaction diffusion equatio...
AbstractThis paper deals with the blow-up rate of positive solution to semilinear reaction diffusion...
AbstractA numerical method is proposed for estimating the blow-up time and the blow-up rate of the s...
M.Sc.There have been an extensive study on solutions of differential equations modeling physical phe...
In this paper, we study the numerical blow-up solutions and times of the semilinear heat equation wi...
Reactive-diffusive systems modeling physical phenomena in certain situations develop a singularity a...
Abstract. The computation of blow-up solutions to a differential equation is often a difficult task....
In this paper, we investigate the numerical algorithms to capture the blow-up time for a class of co...
Many nonlinear differential equations have solutions that cease to exist in finite time because thei...
Abstract. We find an estimate for the blow-up time in terms of the initial data for solutions of the...
This paper concerns the study of the numerical approximation for the following parabolic equations w...
We study the finite difference approximation for axisymmetric solutions of a parabolic system with b...
We obtain some conditions under which the positive solution for semidiscretizations of the semilinea...
Using the test function technique, we obtain sufficient conditions for the blow-up of solutions to...
The equation u t =Δu+u p with homogeneous Dirichlet boundary conditions has solutions with blow-up i...
Time dependent nonlinear partial differential equations, like for example reaction diffusion equatio...
AbstractThis paper deals with the blow-up rate of positive solution to semilinear reaction diffusion...