[PDF] Top 20 Blow-up of solution for an integro-differential equation with arbitrary positive initial energy

... a blow-up result for solutions with negative initial energy if p > m ≥  and a global result for  ≤ p ≤ ...with positive initial ...a blow-up result for ... See full document

... wave equation subject to nonlinear boundary damp- ing has been investigated by the authors Cavalcanti et ...to blow up of the solutions of equations with nonlinear damping and source terms acting in ... See full document

... nonpositive, positive bounded, or arbitrary high initial energy that blow up in finite time and also derived the life span estimates of these solu- ...an equation similar ... See full document

... the initial data and the relaxation function g , we obtain a blow-up result for the solution with negative initial energy and some positive initial energy if ... See full document

... years, blow-up theory for solutions of the initial boundary value problem of parabolic equations with local or nonlocal term has been rapidly developed, and there have been many delicate ...between ... See full document

... this equation are given in the case of a periodic contact rate: f (t + ω, x) = f (t, x) , ∀t ∈ R ...the solution in ...a positive, continuous solution of the following initial value ... See full document

... the solution of (.) blows up in finite time provided that p – >  and the initial data is large ...some positive initial energy, Wu et al. [] gave a blow-up ... See full document

... The energy decay and blow-up of a solution for a Kirchhoff equation with dynamic boundary condition are ...the energy decay of the solution is ...of blow-up ... See full document

... existence, blow-up, and asymptotic behavior of solutions to the Dirichlet initial boundary value problem with arbitrary initial energy by using the potential well ...negative ... See full document

... mechanical energy [–]. The main feature of the equation in () is that it contains an integro-differential operator, usually called memory term or viscoelastic term, which can be used to represent ... See full document

... the blow-up of solutions for the quasilinear viscoelastic wave equa- tion with strong damping and boundary nonlinear ...wave equation with nonlinear boundary damp- ...no blow-up result ... See full document

... the blow-up result of solution for a quasilinear von Karman equation of memory type with nonpositive initial energy as well as positive initial ...time ... See full document

... of positive solutions for the fractional integro-differential equation with the integral boundary value ...of positive solutions are ... See full document

... The outline of the paper is as follows: In Section , the properties of the problem (.), (.) are given. In Section , the difference scheme constructed on the non-uniform mesh for the numerical solution (.), ... See full document

... which implies w =  by Gronwall’s inequality. Thus, we complete the proof of Theorem .. Remark . As is well known, the difficult for Kirchhoff equations is proving the approxi- mate solutions converge to the desired ... See full document

... integral equation is a functional equation in which the unknown function appears under one or several integral signs; if, in addition, the equation contains a derivative of this function, we call the ... See full document

... 1. Novikov, V: Generalizations of the Camassa-Holm equation. J. Phys. A, Math. Theor. 42, 342002 (2009) 2. Tiglay, F: The periodic Cauchy problem for Novikov’s equation. Int. Math. Res. Not. 20, 4633-4648 ... See full document

... Local in time existence of positive classical solutions of (1.1) can be obtained by using fixed point theorem [21], the representation formula and the contraction map- ping principle as in [13]. By the above ... See full document

... by differentiation [Dickson and Hipp (1998), Jun Cai (2004) in the classical risk model without perturbation] and [Dufresne and Gerber (1991), Furrer and Schmidli (1994), Gerber and Landry (1998), Wang and Wu (2000), Li ... See full document

... beam equation is a class of fourth-order partial differential equations ap- pearing in different physical settings (see [26, 27] for a review), and it models the weak interactions of dispersive waves in [1] and the ... See full document