Events and Invitations

Events

2021
27 May
Seminar “Epidemic progression in a distributed heterogeneous population”
In this lecture we will discuss compartmental epidemiological models of infection progression in a space-distributed multi-patch population with a communication between the patches due to the movement of individuals.
2021
25 May
Seminar “Some remarks on the Sobolev inequality in Riemannian manifolds”
We investigate Sobolev and Hardy inequalities, specifically weighted Minerbe’s type estimates, in non compact completeconnected Riemannian manifolds whose geometry is described by an isoperimetric profile. In particular, we assume that the manifold satisfies the p-hyperbolicity property, stated in terms of a necessary integral Dini condition on the isoperimetric profile.
2021
25 May
Scientific seminar “Large and very singular solutions of semi-linear elliptic equations”
There will be done a review of results about nonnegative solutions of semi-linear equations of diffusion-nonlinear degenerate absorption, which take infinite value on some subsets or all boundary of the domain under consideration: so called very singular and large solutions.
2021
24 May
At the Faculty of Ecology, a workshop on American history
The main purpose of the workshop – The main purpose of the workshop is to introduce students to the history of the American presidency, its roots and development over first decades.
2021
20 May
Seminar “Natural hazards in the South of Russia: events, observations and perspective tasks. Part 2”
In the period 2007-2014, a number of events related to natural hazards, which caused significant damage, occurred in the South of Russia.
2021
18 May
Seminar “ Solution of one boundary value problem on the semi-axis for the diffusion equation with a growing coefficient”
In [1] a similar problem has been solved by probabilistic methods. In my talk, I will speak about an approach to solving this problem based on the non-oscillating WKB method. The difficulty arising in this case is that the representation of the Dirac delta-function in the form of a non-oscillating WKB function is little (let's say) known.
2021
18 May
Scientific seminar “Mathematical modeling of viral infection and immune response”
This lecture will provide an overview of recent work on mathematical modeling of viral infection and immune response, carried out at the Research Center for Mathematical Modeling in Biomedicine (Nikol'skii Mathematical Institute, RUDN University). The current work and prospects for the development of this scientific direction will also be discussed.
2021
14 May
Open lecture “Mathematical modelling in Biomedicine”
The interdisciplinary research center "Mathematical Modeling in Biomedicine" was established three years ago at the S. M. Nikol’skii Mathematical Institute, RUDN University. The main research areas of this center include modeling of the cardiovascular system and diseases, infectious diseases and immune response, modeling of cancer diseases, as well as mathematical analysis of models that arise in biomedicine.
2021
13 May
Scientific seminar “Lanthanide‐based Silsesquioxane: Synthesis, Structure, and Properties”
We report here the synthesis, structure, luminescence and magnetic properties of new cage-like tetranuclear silsesquioxanes Tb3+, Eu3+, Dy3+. They present an unusual prism-like topology of cage architectures and lanthanide-characteristic emission, which makes them the first luminescent cage-like lanthanide silsesquioxanes.
Direction: Science
Event format: Seminar
2021
11 May
Seminar “On qualitative properties of solutions of equations and inequalities with KPZ-nonlinearities”
For quasilinear partial differential equations and inequalities containing nonlinearities of the Kardar–Parisi–Zhang type (i.e., the scalar square of the gradient and its generalizations), we present a summary of (old and recent) results regarding the stabilization of solutions (for the parabolic and elliptic cases), the blow-up of solutions, and specific phenomena (e.g., the extinction of solutions). Descriptive examples demonstrating the Bitsadze approach (the technique of monotone maps) applied in this research area are provided.