变量空间中具有记忆项和对数非线性的半线性伪抛物方程爆破解的界

Pub Date : 2022-12-04 DOI:10.7146/math.scand.a-133418
R. Abita
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引用次数: 0

摘要

本文研究了具有Dirichlet边界条件的线性记忆项和对数非线性源项\[ u_{t}-\Delta u_{t}+\int _{0}^{t}g( t-s) \Delta u( x,s) \mathrm {d}s-\Delta u\]\[=|u|^{p(\cdot ) -2}u\ln (|u|), \]影响下的伪抛物方程的初边值问题。在适当假设松弛函数$g$、初始数据$u_{0}$和函数指数$p$的情况下,我们不仅设定了解在发生爆破时爆破时间的下界,而且在假设初始能量为负的情况下,给出了解的爆破判据和爆破时间的上界。
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Bounds for blow-up solutions of a semilinear pseudo-parabolic equation with a memory term and logarithmic nonlinearity in variable space
In this article, we investigate the initial boundary value problem for a pseudo-parabolic equation under the influence of a linear memory term and a logarithmic nonlinear source term \[ u_{t}-\Delta u_{t}+\int _{0}^{t}g( t-s) \Delta u( x,s) \mathrm {d}s-\Delta u\]\[=|u|^{p(\cdot ) -2}u\ln (|u|), \]with a Dirichlet boundary condition. Under appropriate assumptions about the relaxation function $g$, the initial data $u_{0}$ and the function exponent $p$, we not only set the lower bounds for the blow-up time of the solution when blow-up occurs, but also by assuming that the initial energy is negative, we give a new blow-up criterion and an upper bound for the blow-up time of the solution.
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