Blow-Up of Solutions to the Fourth-Order Equation with Variable-Exponent Nonlinear Weak Damping

In this note, we investigate again the blow-up phenomenon of weak solutions to the following initial-boundary value problem of the fourth-order equation with variable-exponent nonlinearityu(tt) + ?(2)u - M(|| ?u ||(2))?u - ?u(t) + |ut|(m(x)-2)ut = |u|(p(x)-2)u.Our investigations reveal that the blow-up phenomenon will happen for arbitrarily high initial energy under m- := ess infx?O m(x) > 2. It is worthy to point out that an upper bound of the blow-up time is also shown. These results answer the earlier unsolved question in our previous paper (Liao and Tan in Sci China Math 66, 285-302 (2023).