#### Non-isothermal fluid flow through a thin pipe, Mathematical Colloquium

*,*Osijek, Croatia (2008)#### Rigorous derivation of new mathematical models for non-isothermal flow of a viscous fluid in a thin pipe,

*Scientific Colloquium of Split Mathematical Society*, Split, Croatia (2011)#### Brinkman-type models in fluid film lubrication,

*Symposium on Differential Equations and Difference Equations SDEDE 2012*, Novacella, Italy (2012)- On the micropolar fluid flow through a pipe,
*11th CAMTP Christmas Symposium of Physicists*, Maribor, Slovenia (2012)

#### Asymptotic analysis of micropolar fluid flow in pipe-like domains,

*Symposium on Differential Equations and Difference Equations SDEDE 2013*, Bayrischzell, Germany (2013)#### Effects of strong convection on the cooling process for a long or thin pipe,

*The 10th AIMS Conference on Dynamical Systems, Differential Equations and Applications,*in*Special Session 29: Stochastic and deterministic dynamical systems and applications,*Madrid, Spain (2014)#### Asymptotic behavior of micropolar fluid flow in thin domains,

*Seminario del Departamento de Ecuaciones Diferenciales y Analisis Numerico*, Universidad de Sevilla, Spain (2014)#### Asymptotic modelling of the fluid flow with a pressure-dependent viscosity,

*Partial Differential Equations Seminar,*Mathematical Institute, University of Oxford, UK (2014)#### Asymptotic analysis of the fluid flow with a pressure-dependent viscosity,

*Asymptotic Problems: Elliptic and Parabolic Issues*in*Special Session: Asymptotic and Numerical Methods for Viscous and Elastic Media,*Vilnius, Lithuania (2015)#### On the lubrication problem in a rough thin domain filled with micropolar fluid,

*Seminar Katedra Matematiky*, Faculty of Civil Engineering, Czech Technical University in Prague, Czech Republic (2015)#### Effects of small boundary perturbation on the porous medium flow,

*Partial Differential Equations Seminar,*Mathematical Institute, University of Oxford, UK (2017)#### Higher-order models in fluid film lubrication,

*Summer Seminars on Differential Equations,*Departamento de Matematica Aplicada, Instituto de Matematica e Estatistica, Universidade de Sao Paulo,#### On the effects of small boundary perturbation on the fluid flow,

*ICMC Summer Meeting on Differential Equations 2019*in*Special Session: Boundary Perturbations of Domains for PDEs and Applications,*Sao Carlos, Brazil (2019)#### Mathematical analysis of micropolar fluid flow in thin domains: rigorous derivation of new models,

*Seminar on geometry, education and visualization with applications,*Faculty of Mathematics, University of Belgrade, Serbia (2019)#### Effects of rough boundary and boundary conditions on the lubrication process with micropolar fluid,

*Multiscale Modeling in Fluid Mechanics and Fluid-Structure Interaction**,*Vilnius, Lithuania (2019)#### Rigorous derivation of the effective boundary condition on a porous wall,

*IFIP TC7 Conference on System Modelling and Optimization*in*Minisymposyum: Navier-Stokes equations with mixed boundary conditions and related problems*, Quito, Ecuador (2021)#### The effective boundary condition on a porous wall,

*Fudan International Seminar on Analysis, PDEs and Fluid Mechanics*(2022)#### Asymptotic analysis of the nonsteady micropolar fluid flow through a thin pipe ,

*ICMC Summer Meeting on Differential Equations 2022*in*Special Session: Nonlinear Dynamical Systems,*Sao Carlos, Brazil (2022)#### The effective boundary condition on a porous wall,

*7th Croatian Mathematical Congress,*Split, Croatia (2022)#### Inertia and roughness-induced effects on the fluid flow through a corrugated domain,

*International Workshop Multiscale Modeling & Methods**,*Vilnius, Lithuania (2022)#### The effective boundary condition on a porous wall,

*Seminar of Mathematical Physics Equations Group**,*Faculty of Mathematics, Informatics and Mechanics, University of Warsaw, Poland (2022)#### The Darcy-type boundary condition on a porous wall,

*International Workshop Biomathematics and Mechanics in Cardiovascular Medicine**,*Saint-Etienne, France (2022)