In these notes we consider a semilinear heat equation in a bounded domain of R~d, with control on a subdomain and homogeneous Dirichlet boundary conditions. We consider nonlinearities for which, in the absence of control, blow up arises. We prove that when the nonlinearity grows at infinity fast enough, due to the local (in space) nature of the blow up phenomena, the control may not avoid the blow up to occur for suitable initial data. This is done by means of localized energy estimates. However, we also show that when the nonlinearity is weak enough, and provided the system admits a globally denned solution (for some initial data and control), the choice of a suitable control guarantees the global existence of solutions and moreover that the solution may be driven in any finite time to the globally denned solution. In order for this to be true we require the nonlinearity f to satisfy at infinity the growth condition (f(s))/(|s| log ~(3/2)(1+|s|)) 0 as |s| → ∞. This is done by means of a fixed point argument and a careful analysis of the control of linearized heat equations relying on global Carleman estimates. The problem of controlling the blow up in this sense remains open for nonlinearities growing at infinity like f(s) ~ |s|log~p(1 + |s|) with 3/2 ≤ p ≤ 2.
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机译:在这些说明中,我们考虑R〜D的有界域中的半线性热方程,对亚域和均匀的Dirichlet边界条件进行控制。我们考虑在没有控制的情况下,爆炸出现的非线性。我们证明,当非线性在无限的情况下快速增长时,由于爆炸现象的本地(空间中)性质,控制可能无法避免为合适的初始数据发生爆炸。这是通过局部能量估计完成的。但是,我们还表明,当非线性足够弱时,并且提供了系统承认全局划分的解决方案(对于某些初始数据和控制),合适的控制选择保证了全局解决方案的存在,而且解决方案可能是在全球欺骗解决方案的任何有限时间内驱动。为了真实,我们需要非线性F以无限远高度增长(F(S))/(| S | log〜(3/2)(1+ | S |))0. →∞。这是通过一个固定点论证完成的,并仔细分析了依赖于全球Carleman估计的线性化热方程的控制。在这种意义上控制爆炸的问题仍然是在Infinity中生长的非线性,如F(S)〜“(1 + |)的非线性,具有3/2≤p≤2。
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