Abstract
This paper deals with a pseudo-parabolic equation involving variable exponents under homogeneous Dirichlet boundary value condition. The authors first develop the potential well method to prove a threshold result on the existence or nonexistence of global solutions to the equation when the initial energy is less than the mountain pass level $d$. In the case of high energy initial data, a new characterization for the nonexistence of global solution is also given. These results extend and improve some recent results obtained by Di et al. [9].
Funding Statement
The second author (Le Cong Nhan) is supported by Ho Chi Minh City University of Technology and Education (HCMUTE), Vietnam. The third author (Le Xuan Truong) is supported by University of Economics Ho Chi Minh City (UEH), Vietnam.
Citation
Quach Van Chuong. Le Cong Nhan. Le Xuan Truong. "Blow-up and Decay for a Pseudo-parabolic Equation with Nonstandard Growth Conditions." Taiwanese J. Math. 28 (3) 517 - 537, June, 2024. https://doi.org/10.11650/tjm/231203
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