María Anguiano

Universidad de Sevilla

H-index: 13

Europe-Spain

About María Anguiano

María Anguiano, With an exceptional h-index of 13 and a recent h-index of 10 (since 2020), a distinguished researcher at Universidad de Sevilla, specializes in the field of Mathematical Analysis, Partial Differential Equations.

His recent articles reflect a diverse array of research interests and contributions to the field:

Mathematical derivation of a Reynolds equation for magneto-micropolar fluid flows through a thin domain

On p-Laplacian Reaction–Diffusion Problems with Dynamical Boundary Conditions in Perforated Media

Effective models for generalized Newtonian fluids through a thin porous media following the Carreau law

Carreau law for non-Newtonian fluid flow through a thin porous media

Lower-dimensional nonlinear Brinkman's law for non-Newtonian flows in a thin porous medium

Reaction–Diffusion Equation on Thin Porous Media

Homogenization of parabolic problems with dynamical boundary conditions of reactive‐diffusive type in perforated media

Homogenization of Bingham Flow in thin porous media

María Anguiano Information

University	Universidad de Sevilla
Position	___
Citations(all)	407
Citations(since 2020)	234
Cited By	254
hIndex(all)	13
hIndex(since 2020)	10
i10Index(all)	16
i10Index(since 2020)	10
Email	Access Email
University Profile Page	Universidad de Sevilla
Google Scholar	View Google Scholar Profile

María Anguiano Skills & Research Interests

Mathematical Analysis

Partial Differential Equations

Top articles of María Anguiano

Title	Journal	Author(s)	Publication Date
Mathematical derivation of a Reynolds equation for magneto-micropolar fluid flows through a thin domain	Zeitschrift für angewandte Mathematik und Physik	María Anguiano Francisco Javier Suárez-Grau	2024/2
On p-Laplacian Reaction–Diffusion Problems with Dynamical Boundary Conditions in Perforated Media	Mediterranean Journal of Mathematics	María Anguiano	2023/2/17
Effective models for generalized Newtonian fluids through a thin porous media following the Carreau law		María Anguiano Matthieu Bonnivard Francisco J Suárez-Grau	2023/3/21
Carreau law for non-Newtonian fluid flow through a thin porous media	The Quarterly Journal of Mechanics & Applied Mathematics, 75 (1), 1-27.	María Anguiano Moreno Matthieu Bonnivard Francisco Javier Suárez Grau	2022/3/21
Lower-dimensional nonlinear Brinkman's law for non-Newtonian flows in a thin porous medium	Mediterranean Journal of Mathematics	María Anguiano Francisco J Suárez-Grau	2021/7/9
Reaction–Diffusion Equation on Thin Porous Media	Bull. Malays. Math. Sci. Soc.	María Anguiano	2021/3/13
Homogenization of parabolic problems with dynamical boundary conditions of reactive‐diffusive type in perforated media	ZAMM‐Journal of Applied Mathematics and Mechanics/Zeitschrift für Angewandte Mathematik und Mechanik	María Anguiano	2020/10
Homogenization of Bingham Flow in thin porous media	Networks and Heterogeneous Media	María Anguiano Renata Bunoiu	2020/3
Existence, uniqueness and homogenization of nonlinear parabolic problems with dynamical boundary conditions in perforated media	Mediterranean Journal of Mathematics	María Anguiano	2020/2