Publications in collaboration with researchers from Universidade de Santiago de Compostela (60)

2024

  1. Mathematical perspective on XFEM implementation for models involving contribution on interfaces

    Mathematics and Computers in Simulation, Vol. 218, pp. 266-291

2022

  1. VISCOELASTIC ELLIPTIC MEMBRANE SHELLS ON BILATERAL FRICTIONAL CONTACT: AN ASYMPTOTIC APPROACH

    Journal of Nonlinear and Variational Analysis, Vol. 6, Núm. 5, pp. 441-460

2020

  1. Determination of Young modulus by using Rayleigh waves

    Applied Mathematical Modelling, Vol. 77, pp. 439-455

2019

  1. Estimating the relative contribution of streetlights, vehicles, and residential lighting to the urban night sky brightness

    Lighting Research and Technology, Vol. 51, Núm. 7, pp. 1092-1107

  2. On the justification of viscoelastic flexural shell equations

    Computers and Mathematics with Applications, Vol. 77, Núm. 11, pp. 2933-2942

  3. Rigorous justification of the asymptotic model describing a curved-pipe flow in a time-dependent domain

    ZAMM Zeitschrift fur Angewandte Mathematik und Mechanik, Vol. 99, Núm. 1

2018

  1. Linear viscoelastic shells: An asymptotic approach

    Asymptotic Analysis, Vol. 107, Núm. 3-4, pp. 169-201

  2. Numerical analysis of a dynamic problem involving bulk-surface surfactants

    Journal of Mathematical Chemistry, Vol. 56, Núm. 1, pp. 120-139

  3. On the Justification of Viscoelastic Elliptic Membrane Shell Equations

    Journal of Elasticity, Vol. 130, Núm. 1, pp. 85-113

2017

  1. Mathematical justification of a viscoelastic elliptic membrane problem

    Comptes Rendus - Mecanique, Vol. 345, Núm. 12, pp. 824-831

2016

  1. A high order model for piezoelectric rods: An asymptotic approach

    International Journal of Solids and Structures, Vol. 81, pp. 294-310

  2. A new methodology for element partition and integration procedures for XFEM

    Finite Elements in Analysis and Design, Vol. 113, pp. 1-13

  3. Asymptotic analysis of a Newtonian fluid in a curved pipe with moving walls

    AIP Conference Proceedings

  4. Asymptotic analysis of a viscous flow in a curved pipe with elastic walls

    SEMA SIMAI Springer Series (Springer International Publishing), pp. 73-87

  5. Characterization of the Bernoulli–Navier model for a rectangular section beam as the limit of the Kirchhoff–Love model for a plate

    Zeitschrift fur Angewandte Mathematik und Physik, Vol. 67, Núm. 5

2015

  1. A bending-stretching model in adhesive contact for elastic rods obtained by using asymptotic methods

    Nonlinear Analysis: Real World Applications, Vol. 22, pp. 632-644

  2. A model for bending and stretching of piezoelectric rods obtained by asymptotic analysis

    Zeitschrift fur Angewandte Mathematik und Physik, Vol. 66, Núm. 3, pp. 1207-1232

2013

  1. Asymptotic derivation of frictionless contact models for elastic rods on a foundation with normal compliance

    Nonlinear Analysis: Real World Applications, Vol. 14, Núm. 1, pp. 852-866

  2. Asymptotic derivation of quasistatic frictional contact models with wear for elastic rods

    Journal of Mathematical Analysis and Applications, Vol. 401, Núm. 2, pp. 641-653

2012

  1. Mathematical justification of Kelvin-Voigt beam models by asymptotic methods

    Zeitschrift fur Angewandte Mathematik und Physik, Vol. 63, Núm. 3, pp. 529-556