Maximum principle for heat equation on infinite domain - MathOverflow most recent 30 from http://mathoverflow.net 2013-05-23T08:51:35Z http://mathoverflow.net/feeds/question/89120 http://www.creativecommons.org/licenses/by-nc/2.5/rdf http://mathoverflow.net/questions/89120/maximum-principle-for-heat-equation-on-infinite-domain Maximum principle for heat equation on infinite domain Chong Luo 2012-02-21T16:55:10Z 2012-02-22T12:59:51Z <p>Let $u(x, t)$ be a solution of $u_t=u_{xx}$ in the domain $x>0, t>0$. We also have the initial condition $u(x,0)=g(x)$ and the boundary condition $u(0,t)=h(t)$. Do we have maximum principle in this case? Can we conclude that $u(x,t)$ is bounded if we assume both $g$ and $h$ are bounded? If not, what additional condition shall we impose? Thanks!</p> http://mathoverflow.net/questions/89120/maximum-principle-for-heat-equation-on-infinite-domain/89123#89123 Answer by Denis Serre for Maximum principle for heat equation on infinite domain Denis Serre 2012-02-21T17:49:47Z 2012-02-22T12:59:51Z <p>You need essentially the same condition as in the case of the domain $x\in\mathbb R$. That is, $$u(x,t)=o(e^{\epsilon|x|^2})$$ for every $\epsilon>0$.</p> <p><strong>Edit</strong>. Tikhonov provided an example of a non-trivial solution of the heat equation on the domain $\mathbb R$, with zero data. Take either its odd part, or the derivative of its even part with respect to $x$. It is a non-trivial solution of the heat equation in the domain $(0,+\infty)$ with zero Dirichlet boundary condition and zero initial data. If such a principle as the one considered by the MO author existed, this solution would be trivial.</p>