Non-global solution for visco-elastic dynamical system with nonlinear source term in control problem

In this paper, we study the initial boundary value problem of the visco-elastic dynamical system with the nonlinear source term in control system. By variational arguments and an improved convexity method, we prove the global nonexistence of solution, and we also give a sharp condition for global existence and nonexistence.

[1]  George E. Andrews,et al.  On the existence of solutions to the equation , 1980 .

[2]  Mingyou Zhang,et al.  Sharp conditions of global existence for nonlinear Schrödinger equation with a harmonic potential , 2019, Advances in Nonlinear Analysis.

[3]  Chaoxia Yang,et al.  Finite time blow-up for a wave equation with dynamic boundary condition at critical and high energy levels in control systems , 2020, Electronic Research Archive.

[4]  P. Davis A quasilinear hyperbolic and related third-order equations , 1975 .

[5]  Runzhang Xu,et al.  Global existence and finite time blowup for a nonlocal semilinear pseudo-parabolic equation , 2020, Advances in Nonlinear Analysis.

[6]  J. Clements,et al.  EXISTENCE THEOREMS FOR A QUASILINEAR EVOLUTION EQUATION , 1974 .

[7]  C. Dafermos The mixed initial-boundary value problem for the equations of nonlinear one-dimensional viscoelasticity , 1969 .

[8]  Gongwei Liu The existence, general decay and blow-up for a plate equation with nonlinear damping and a logarithmic source term , 2020, Electronic Research Archive.

[9]  J. Clements On the Existence and Uniqueness of Solutions of the Equation , 1975, Canadian Mathematical Bulletin.

[10]  W. Lian,et al.  Global existence and blow up of solution for semi-linear hyperbolic equation with the product of logarithmic and power-type nonlinearity , 2020 .

[11]  Zhao Junsheng,et al.  Multidimensional viscoelasticity equations with nonlinear damping and source terms , 2004 .

[12]  J. Ball,et al.  Asymptotic behaviour and changes of phase in one-dimensional nonlinear viscoelasticity , 1982 .

[13]  Dang Dinh Ang,et al.  Strong solutions of a quasilinear wave equation with nonlinear damping , 1988 .

[14]  J. Greenberg,et al.  On the exponential stability of solutions of E(ux) uxx + λuxtx = ϱutt , 1970 .

[15]  Jorge A. Esquivel-avil Blow-up in damped abstract nonlinear equations , 2020, Electronic Research Archive.

[16]  Runzhang Xu,et al.  Global existence and finite time blow-up for a class of semilinear pseudo-parabolic equations , 2013 .

[17]  W. Lian,et al.  Global well-posedness of nonlinear wave equation with weak and strong damping terms and logarithmic source term , 2019, Advances in Nonlinear Analysis.

[18]  Xu Runzhang,et al.  Global well-posedness of coupled parabolic systems , 2020 .

[19]  Howard A. Levine,et al.  Instability and Nonexistence of Global Solutions to Nonlinear Wave Equations , 1974 .

[20]  Wenke Li,et al.  Finite time blow-up and global existence of solutions for semilinear parabolic equations with nonlinear dynamical boundary condition , 2020, Electronic Research Archive.

[21]  Howard A. Levine,et al.  Some Additional Remarks on the Nonexistence of Global Solutions to Nonlinear Wave Equations , 1974 .

[22]  Wenke Li,et al.  A family of potential wells for a wave equation , 2020, Electronic Research Archive.