This paper deals with a 4th-order quasilinear hyperbolic equation involving strong damping and superlinear source, uₓₓ-₌u+^2u-ₑuₓ=|u|^p-2u, (x, t) (0, T_), subject to homogeneous Navier boundary condition, where is an open bounded domain in R^n (n>2) ; p>m r 2 ; ₌u: =div (| u|^m-2 u) ; and ₑuₓ: =div (| uₓ|^r-2 uₓ). For the positive initial energy case, we obtain the existence of global solutions, where the decay estimates are divided into five kinds for all the exponent regions. When the initial energy is negative, we arrive at the upper and lower bounds of blow-up time. The L^2 inner product (u₁, u₀) >0 of the initial data is not a necessary condition on the existence of blow-up solutions in the region \p>m>2=r\.
Dou et al. (Thu,) studied this question.