AWMA virtual seminar n°10

AWMA virtual Seminar n°10

The speaker, Prof. Hamidou TOURE obtained his Doctorat d’Etat, from Université de Ouagadougou, in December 1995, a PhD from Université de Franche-Comté, April 1994, and Doctorat de 3ème cycle from Université de Franche-Comté, July 1982.

His research interests include mathematics in nonlinear elliptic parabolic equations using the theory of evolution equations in Banach spaces, stabilization problem of parabolic-hyperbolic non linear type in mathematical and numerical aspects of pollutants, transport in a porus environment, analysis, functional analysis and partial differential equations.

His has served in Ouagadougou University, actually University Joseph KI Zerbo in Burkina. He has retired from the University and is currently:

  • Permanent Secretary of Burkina National Academy of Sciences, Art and Letters since 2013
  • Coordinator of the Network, PDE, Modeling and Control since 1999
  • Member of African Academy of Sciences since 2009.
  • President of African Mathematics Millennium Science Initiative (AMMSI) West African Regional Office since 2014.

 

Conference online Link

Register to atend: https://univ-lille-fr.zoom.us/webinar/register/WN_YejmfNcWTZSP7DAprnQtzQ

Meeting number (access code):  -
Meeting password: -
Date Thursday,  October 07, 2021
Time 14:00-15:00 (UTC)
Speaker Prof. Hamidou TOURE
Affiliation Université Joseph Ki-Zerbo
Domain Partial Differential Equations
Title Weighted Stepanov-like pseudo almost automorphic solutions of class r for some partial differential equations
Abstract

In this work, we study the existence and uniqueness of Stepanov-like pseudo almost automorphic solutions of class r for a neutral partial functional differential equation governed by A a linear operator on a Banach space X satisfying the Hille-Yosida condition.

We make some assumptions on the linear operator, for which the semigroup is compact on the closure of the domain of the operator.We then introuce the notion of pseudo-almost automorphic fucntions of class r. Assuming that the semigroup is hyperbolic, if the data are pseudo-almost automorphic functions of class r, then we establish that the neutral partial functional differential equation has an unique solution which is pseudo-almost automorphic functions of class r.