AbstractThe problem of the estimating of a blow-up time for solutions of Volterra nonlinear integral equation with convolution kernel is studied. New estimates, lower and upper, are found and, moreover, the procedure for the improvement of the lower estimate is presented. Main results are illustrated by examples. The new estimates are also compared with some earlier ones related to a shear band model
For a parabolic problem with a gradient nonlinearity which was introduced by Chipot and Weissler [M....
We investigate the blow-up of the solutions to a nonlinear parabolic system with Robin boundary cond...
In this paper, we consider a viscoelastic wave equation with dynamical boundary conditions. Under ce...
In this paper we use collocation methods for detecting blow-up solutions of nonlinear homogeneous Vo...
The purpose of this investigation is to determine the possibility of a blow-up solution to a particu...
AbstractThe paper is devoted to the study of the equation u(x) = ∫x0 (x − s)α − 1g(u(s))ds (α > 0, x...
We analyze the blow-up behavior of one-parameter collocation solutions for Hammerstein-type Volterra...
AbstractThis survey paper presents some analytical tools for determining the existence of a blow-up ...
AbstractIn this paper we give necessary and sufficient conditions for blow-up of solutions for a par...
We make use of an adaptive numerical method to compute blow-up solutions for nonlinear ordinary Volt...
AbstractWe study the blowing-up behavior of solutions of a class of nonlinear integral equations of ...
Abstract. We find an estimate for the blow-up time in terms of the initial data for solutions of the...
AbstractIn this work we consider nonlinear Volterra equations of a special type. We find necessary a...
AbstractFor a parabolic problem with a gradient nonlinearity which was introduced by Chipot and Weis...
AbstractIn this survey paper, the author examines nonlinear Volterra integral equations of the secon...
For a parabolic problem with a gradient nonlinearity which was introduced by Chipot and Weissler [M....
We investigate the blow-up of the solutions to a nonlinear parabolic system with Robin boundary cond...
In this paper, we consider a viscoelastic wave equation with dynamical boundary conditions. Under ce...
In this paper we use collocation methods for detecting blow-up solutions of nonlinear homogeneous Vo...
The purpose of this investigation is to determine the possibility of a blow-up solution to a particu...
AbstractThe paper is devoted to the study of the equation u(x) = ∫x0 (x − s)α − 1g(u(s))ds (α > 0, x...
We analyze the blow-up behavior of one-parameter collocation solutions for Hammerstein-type Volterra...
AbstractThis survey paper presents some analytical tools for determining the existence of a blow-up ...
AbstractIn this paper we give necessary and sufficient conditions for blow-up of solutions for a par...
We make use of an adaptive numerical method to compute blow-up solutions for nonlinear ordinary Volt...
AbstractWe study the blowing-up behavior of solutions of a class of nonlinear integral equations of ...
Abstract. We find an estimate for the blow-up time in terms of the initial data for solutions of the...
AbstractIn this work we consider nonlinear Volterra equations of a special type. We find necessary a...
AbstractFor a parabolic problem with a gradient nonlinearity which was introduced by Chipot and Weis...
AbstractIn this survey paper, the author examines nonlinear Volterra integral equations of the secon...
For a parabolic problem with a gradient nonlinearity which was introduced by Chipot and Weissler [M....
We investigate the blow-up of the solutions to a nonlinear parabolic system with Robin boundary cond...
In this paper, we consider a viscoelastic wave equation with dynamical boundary conditions. Under ce...