# Coloquios 23-24

**Dario Bambusi (U. Milano)**

Jueves, 26 de octubre, 13:00h, UCM | |

Cartel | |

The problem of existence and qualitative behavior of solutions of evolution equations is a classiacal one in the theory of PDEs. In this seminar I will focus on the use of Birkhoff normal form for the proof of the so called almost global existence results in Hamiltonian PDEs. such results deal with perturbation of linear hyperbolic equation (for example the wave equation) and ensure that solutions corresponding to smooth and small intitial data remain small and smooth for times of order

Nowadays there exists a well established theory for semilinear equations in space dimension 1, but the theory for quasilinear equations and for equations in higher dimensional domains is only at the beginning. Furthermore some remarkable applications to physical relevant models like the water wave equations have been very recently obtained.

In this Colloquium, I will review the classical theory presenting the main ideas and then I will present some of the most recetn results in the domain trying to put into evidence the main tools that have been developed in order to deal with the problem.

\[\varepsilon^{-r},\, \forall r\]

. Here \[\varepsilon\]

is the size of the initial datum.Nowadays there exists a well established theory for semilinear equations in space dimension 1, but the theory for quasilinear equations and for equations in higher dimensional domains is only at the beginning. Furthermore some remarkable applications to physical relevant models like the water wave equations have been very recently obtained.

In this Colloquium, I will review the classical theory presenting the main ideas and then I will present some of the most recetn results in the domain trying to put into evidence the main tools that have been developed in order to deal with the problem.

#### Suppression of chemotactic blow-up by active advection

**Yao Yao (University of Singapore)**

Viernes, 29 de septiembre, 12:00h, ICMAT | |

Enlace streaming | |

Cartel |

Chemotactic blow up in the context of the Keller-Segel equation is an extensively studied phenomenon. In recent years, it has been shown that when the Keller-Segel equation is coupled with passive advection, blow-up can be prevented if the flow possesses mixing or diffusion-enhancing properties, and its amplitude is sufficiently strong. In this talk, we consider the Keller-Segel equation coupled with an active advection, which is an incompressible flow obeying Darcy's law for incompressible porous media equation and driven by buoyancy force. We prove that in contrast with passive advection, this active advection coupling is capable of suppressing chemotactic blow up at arbitrary small coupling strength: namely, the system always has globally regular solutions. (Joint work with Zhongtian Hu and Alexander Kiselev).