Global Existence, Blowup, and Asymptotic Behavior for a Kirchhoff-Type Parabolic Problem Involving the Fractional Laplacian with Logarithmic Term

In this paper, we studied a class of semilinear pseudo-parabolic equations of the Kirchhoff type involving the fractional Laplacian with logarithmic nonlinearity: u t + M ( [ u ] s 2 ) ( − Δ ) s u + ( − Δ ) s u t = | u | p − 2 u ln | u | , in Ω × ( 0 , T ) , u ( x , 0 ) = u 0 ( x ) , in Ω , u ( x , t ) = 0 , on ∂ Ω × ( 0 , T ) , , where [ u ] s is the Gagliardo semi-norm of u , ( − Δ ) s is the fractional Laplacian, s ∈ ( 0 , 1 ) , 2 λ < p < 2 s * = 2 N / ( N − 2 s ) , Ω ∈ R N is a bounded domain with N > 2 s , and u 0 is the initial function. To start with, we combined the potential well theory and Galerkin method to prove the existence of global solutions. Finally, we introduced the concavity method and some special inequalities to discuss the blowup and asymptotic properties of the above problem and obtained the upper and lower bounds on the blowup at the sublevel and initial level.