Ángel Daniel
Arós Rodríguez
Profesor Titular de Universidad
Universidade de Santiago de Compostela
Santiago de Compostela, EspañaPublicaciones en colaboración con investigadores/as de Universidade de Santiago de Compostela (25)
2022
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VISCOELASTIC ELLIPTIC MEMBRANE SHELLS ON BILATERAL FRICTIONAL CONTACT: AN ASYMPTOTIC APPROACH
Journal of Nonlinear and Variational Analysis, Vol. 6, Núm. 5, pp. 441-460
2019
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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
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On the justification of viscoelastic flexural shell equations
Computers and Mathematics with Applications, Vol. 77, Núm. 11, pp. 2933-2942
2018
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Linear viscoelastic shells: An asymptotic approach
Asymptotic Analysis, Vol. 107, Núm. 3-4, pp. 169-201
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On the Justification of Viscoelastic Elliptic Membrane Shell Equations
Journal of Elasticity, Vol. 130, Núm. 1, pp. 85-113
2017
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Mathematical justification of a viscoelastic elliptic membrane problem
Comptes Rendus - Mecanique, Vol. 345, Núm. 12, pp. 824-831
2016
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A high order model for piezoelectric rods: An asymptotic approach
International Journal of Solids and Structures, Vol. 81, pp. 294-310
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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
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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
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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
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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
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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
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Mathematical justification of Kelvin-Voigt beam models by asymptotic methods
Zeitschrift fur Angewandte Mathematik und Physik, Vol. 63, Núm. 3, pp. 529-556
2010
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Mathematical justification of viscoelastic beam models by asymptotic methods
Journal of Mathematical Analysis and Applications, Vol. 370, Núm. 2, pp. 607-634
2008
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A quasistatic contact problem with normal compliance and damage involving viscoelastic materials with long memory
Applied Numerical Mathematics, Vol. 58, Núm. 9, pp. 1274-1290
2007
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A contact problem for viscoelastic materials with long memory involving damage
Topics on Mathematics for Smart Systems - Proceedings of the European Conference
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Numerical analysis of a frictional contact problem for viscoelastic materials with long-term memory
Numerische Mathematik, Vol. 108, Núm. 2, pp. 327-358
2006
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Numerical analysis of a frictional contact problem for viscoelastic materials with long-term memory
NUMERICAL MATHEMATICS AND ADVANCED APPLICATIONS
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Numerical approximation of a viscoelastic frictional contact problem
Comptes Rendus - Mecanique, Vol. 334, Núm. 5, pp. 279-284
2005
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A class of integro-differential variational inequalities with applications to viscoelastic contact
Mathematical and Computer Modelling, Vol. 41, Núm. 11-12, pp. 1355-1369