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Cuesta Carlota  WPI, OMP 1, Seminar Room 08.135  Mon, 19. Jun 17, 15:00 
Analysis of travelling waves in a nonlocal Kortewegde VriesBurgers equation arising in a twolayer shallowwater model  
We study travelling wave solutions of a Kortewegde VriesBurgers equation with a nonlocal diffusion term. This model equation arises in the analysis of a shallow water flow by performing formal asymptotic expansions associated to the tripledeck regularisation (which is an extension of classical boundary layer theory). The resulting nonlocal operator is of fractional differential type with order between 1 and 2. Travelling wave solutions are typically analysed in relation to shock formation in the full shallow water problem. We show rigorously the existence of these waves in the case of a quadratic nonlinearity. The travelling wave problem for the classical KdVBurgers equation is usually analysed via a phaseplane analysis, which is not applicable here due to the presence of the nonlocal diffusion operator. Instead, we apply fractional calculus results available in the literature and a Lyapunov functional. In addition we discuss the monotonicity of the waves in terms of a control parameter and prove their dynamic stability in case they are monotone. We also discuss some partial results concerning the existence of travelling waves in the case of a cubic nonlinearity. This existence problem and the monotonicity of the waves in the quadratic case for a small dispersion term in relation with the diffusive one are still open problems, for this reason we have also developed numerical schemes in order to support our conjectures. We will discuss in a second part of the talk, a pseudospectral method that approximates the initial value problem. The basic idea is, using an algebraic map, to transform the whole real line into a bounded interval where we can apply a Fourier expansion. Special attention is given to the correct computation of the fractional derivative in this setting. Interestingly, there is a connection of the mapping method to fractional calculus, that we will also mention.  

Tournus Magali (École Centrale de Marseille)  OskarMorgensternPlatz 1, Hörsaal 2, ground floor.  Thu, 23. Nov 17, 14:15 
Scalar conservation laws with heterogeneous flux in the BV framework  
We consider a scalar conservation law with a flux containing spatial heterogeneities of bounded variation, where the number of discontinuities may be infinite. We address the question of existence of an adapted entropy solution in the BV framework. A sufficient key condition guaranteeing existence is identified and new BV estimates are given. This provides the most general BV theory available. Moreover, we show with a counterexample that if this hypothesis is violated, the problem may be illposed in the BV framework.  

Franca Hoffmann (University of Cambridge)  WPI, OMP 1, Seminar Room 08.135  Fri, 12. May 17, 11:30 
Homogeneous functionals in the faircompetition regime  
We study interacting particles behaving according to a reactiondiffusion equation with nonlinear diffusion and nonlocal attractive interaction. This class of equations has a very nice gradient flow structure that allows us to make links to homogeneous functionals and variations of wellknown functional inequalities (HardyLittlewoodSobolev inequality, logarithmic Sobolev inequality). Depending on the nonlinearity of the diffusion, the choice of interaction potential and the dimensionality, we obtain different regimes. Our goal is to understand better the asymptotic behaviour of solutions in each of these regimes, starting with the faircompetition regime where attractive and repulsive forces are in balance. This is joint work with José A. Carrillo and Vincent Calvez.  

Sabine Hittmeir (Universität Wien)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 16:15 
Cross diffusion models in chemotaxis and pedestrian dynamics  
The main feature of the twodimensional KellerSegel model is the blowup behaviour of solutions for supercritical masses. We introduce a regularisation of the fully parabolic system by adding a crossdiffusion term to the equation for the chemical substance. This regularisation provides another helpful entropy dissipation term allowing to prove global existence of weak solutions for any initial mass. For the proof we first analyse an approximate problem obtained from a semidiscretisation and a carefully chosen regularisation by adding higher order derivatives. Compactness arguments are used to carry out the limit to the original system. A similar approach can be used to analyse a pedestrian dynamics model for two groups moving in opposite direction. The evolutionary equations are driven by cohesion and aversion and are formally derived from a 2d lattice based approach. Also numerical simulations illustrating lane formation will be presented. These methods are extended to a crossing pedestrian model, where we additionally analyse the stability of stationary states in the corresponding 1d model.  

Delphine Salort (UPMC Paris 6)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 14:45 
Turing instabilities in reactiondiffusion with fast reaction  
In this talk, we consider some specific reactiondiffusion equations in order to understand the equivalence between asymptotic Turing instability of a steady state and backwardness of some parabolic equations or crossdiffusion equations in the formal limit of fat reaction terms. We will see that the structure of the studied equations involves some Lyapunov functions which leads to a priori estimates allowing to pass rigorously for the fast reaction terms in the case without Turing instabilities.  

Andrea Bondesan (Université Paris Descartes)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 14:00 
A numerical scheme for the multispecies Boltzmann equation in the diffusion limit: wellposedness and main properties  
We consider the onedimensional multispecies Boltzmann system of equations [2] in the diffusive scaling. Suppose that the Mach and the Knudsen numbers are of the same order of magnitude epsilon > 0 small enough. For each species i of the mixture, we define the macroscopic quantity of matter and flux as the moments 0 and 1 in velocity of the distribution functions f_i, solutions of the Boltzmann system associated to the scaling parameter epsilon. Using the moment method [4], we introduce a proper ansatz for each distribution function f_i in order to recover a MaxwellStefan diffusion limittype as in [1]. In this way we build a suitable numerical scheme for the evolution of these macroscopic quantities in different regimes of the parameter epsilon. We prove some a priori estimates (mass conservation and nonnegativity) and wellposedness of the discrete problem. We also present numerical examples where we observe that the scheme shows an asymptotic preserving property similar to the one presented in [3]. This is a joint work with L. Boudin and B. Grec. References [1] L. Boudin, B. Grec and V. Pavan, The MaxwellStefan diffusion limit for a kinetic model of mixtures with general cross sections, Nonlinear Analysis: Theory, Methods and Applications, 2017. [2] L. Desvillettes, R. Monaco and F. Salvarani, A kinetic model allowing to obtain the energy law of polytropic gases in the presence of chemical reactions, Eur. J. Mech. B Fluids, 24(2005), 219236. [3] S. Jin and Q. Li, A BGKpenalizationbased asymptoticpreserving scheme for the multispecies Boltzmann equation, Numer. Methods Partial Differential Equations, 29(3), pp. 10561080, 2013. [4] C. D. Levermore, Moment closure hierarchies for kinetic theories, J. Statist. Phys., 83(56):10211065, 1996  

Athmane Bakhta (École Nationale des Ponts et Chaussées)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 11:30 
Crossdiffusion equations in a moving domain  
We show globalintime existence of bounded weak solutions to systems of crossdiffusion equations in a one dimensional moving domain. These equations stem from the modelization of the evolution of the concentration of chemical species composing a crystalline solid during a physical vapor deposition process. To this aim, we use the so called boundednessbyentropy technique developed in [1], [2] and [3] based on the formal gradient flow structure of the system. Moreover, we are interested in controlling the fluxes of the different atomic species during the process in order to reach a certain desired final profile of concentrations. This problem is formulated as an optimal control problem to which the existence of a solution is proven. In addition, an investigation of the long time behavior is presented in the case of constant positive external fluxes. Finally, some numerical results and comparison with actual experiments are presented. The material of this talk is a joint work with Virginie Ehrlacher. References [1] M.Burger, M.Di Francesco, JF. Pietschmann and B. Schalke. Non linear cross diffusion with size exclusion. SIAM J. Math Anal 42 (2010). [2] A. Jüngel and Nicola Zamponi boundedness of weak solutions to crossdiffusion systems from population dynamics. arxiv:1404.6054v1 (2014). [3] A. Jüngel. The boundednessbyentropy method for crossdiffusion systems. To appear in Nonlinearity, http://www.asc.tuwien.ac.at/ juengel/ (2015).  

Esther Daus (Université Paris 7  Denis Diderot)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 10:15 
Crossdiffusion systems and fastreaction limit  
We investigate the rigorous fastreaction limit from a reactioncrossdiffusion system with known entropy to a new class of crossdiffusion systems using entropy and duality estimates. Performing the fastreaction limit leads to a limiting entropy of the limiting crossdiffusion system. In this way, we are able to obtain new entropies for new classes of crossdiffusion systems. This is a joint work with L. Desvillettes and A. Juengel.  

Thomas Lepoutre (INRIA)  WPI, OMP 1, Seminar Room 08.135  Thu, 11. May 17, 9:30 
Entropy, duality and crossdiffusion  
In this talk, we will describe how to mix entropy structure and duality estimates in order to build global weak solutions to a class of crossdiffusion systems.  

Nicola Zamponi (TU Wien)  WPI, OMP 1, Seminar Room 08.135  Wed, 10. May 17, 16:15 
Analysis of degenerate crossdiffusion population models with volume filling  
A class of parabolic crossdiffusion systems modeling the interaction of an arbitrary number of population species is analyzed in a bounded domain with noflux boundary conditions. The equations are formally derived from a randomwalk lattice model in the diffusion limit. Compared to previous results in the literature, the novelty is the combination of general degenerate diffusion and volumefilling effects. Conditions on the nonlinear diffusion coefficients are identified, which yield a formal gradientflow or entropy structure. This structure allows for the proof of globalintime existence of bounded weak solutions and the exponential convergence of the solutions to the constant steady state. The existence proof is based on an approximation argument, the entropy inequality, and new nonlinear AubinLions compactness lemmas. The proof of the largetime behavior employs the entropy estimate and convex Sobolev inequalities. Moreover, under simplifying assumptions on the nonlinearities, the uniqueness of weak solutions is shown by using the H^{1} method, the Emonotonicity technique of Gajewski, and the subadditivity of the Fisher information.  

Gianni Pagnini (BCAM)  WPI, OMP 1, Seminar Room 08.135  Wed, 10. May 17, 14:45 
Stochastic processes for fractional kinetics with application to anomalous diffusion in living cells  
Fractional kinetics is derived from Gaussian processes when the medium where the diffusion takes place is characterized by a population of lengthscales [1]. This approach is analogous to the generalized grey Brownian motion [2], and it can be used for modeling anomalous diffusion in complex media. In particular, the resulting stochastic process can show subdiffusion with a behavior in qualitative agreement with singleparticle tracking experiments in living cells, such as the ergodicity breaking, p variation, and aging. Moreover, for a proper distribution of the lengthscales, a single parameter controls the ergodictononergodic transition and, remarkably, also drives the transition of the diffusion equation of the process from nonfractional to fractional, thus demonstrating that fractional kinetics emerges from ergodicity breaking [3]. References: [1] Pagnini G. and Paradisi P., A stochastic solution with Gaussian stationary increments of the symmetric spacetime fractional diffusion equation. Fract. Cacl. Appl. Anal. 19, 408–440 (2016) [2] Mura A. and Pagnini G., Characterizations and simulations of a class of stochastic processes to model anomalous diffusion. J. Phys. A: Math. Theor. 41, 285003 (2008) [3] Molina–García D., Pham T. Minh, Paradisi P., Manzo C. and Pagnini G., Fractional kinetics emerging from ergodicity breaking in random media. Phys. Rev. E. 94, 052147 (2016)  

María José Cáceres (Universidad de Granada)  WPI, OMP 1, Seminar Room 08.135  Wed, 10. May 17, 14:00 
Mesoscopic models for neural networks  
In this talk we present some PDE models which describe the activity of neural networks by means of the membrane potential. We focus on models based on nonlinear PDEs of FokkerPlanck type. We study the wide range of phenomena that appear in this kind of models: blowup, asynchronous/synchronous solutions, instability/stability of the steady states ...  

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