Alfredo Canelas

Alfredo


 Lo que yo me exigía a mí mismo era que, ya fuera como persona o como profesor, tenía que vivir con honradez, con responsabilidad y con dignidad.
Liu Xiaobo
Premio Nobel de la Paz 2010

Universidad de la República Universidad de la República
Facultad de Ingeniería Facultad de Ingeniería
IET Instituto de Estructuras y Transporte Prof. Julio Ricaldoni
ANII Agencia Nacional de Investigación e Innovación
CSIC Comisión Sectorial de Investigación Científica


    Trabajos de tesis

  1. PDF A. CANELAS; Um Algoritmo de Newton de Ponto Interior e Aplicações na Fundição Eletromagnética de Metais. Universidade Federal do Rio de Janeiro, COPPE, Programa de Engenharia Mecânica. 2009.
  2. PDF A. CANELAS; Técnicas de Ponto Interior para Sistemas de Equações e Otimização Não Linear. Universidade Federal do Rio de Janeiro, COPPE, Programa de Engenharia Mecânica. 2005.

    Artículos completos en revistas

  1. DOI A. CANELAS; M. CARRASCO; J. LÓPEZ; Topology optimization of truss structures under failure probability using the Bernstein approximation. Computers & Structures, v. 296, p. 107295, 2024.
  2. DOI A. CANELAS; J. R. ROCHE; J. P. BRANCHER; Melting interfaces in induction heated bodies. Computers and Mathematics with Applications, v. 153, p. 213-224, 2024.
  3. DOI A. CANELAS; A. I. ABREU; J. R. ROCHE; Detection of scatterers using an XFEM-BEM level set solver based on the topological derivative. Inverse Problems, v. 40 n. 1, p. 015007, 2024.
  4. DOI P. CASTRILLO; A. CANELAS; E. SCHILLACHI; J. RIGOLA; A. OLIVA; High-order finite volume method for linear elasticity on unstructured meshes. Computers & Structures, v. 268, p. 106829, 2022.
  5. DOI A. CANELAS; J. R. ROCHE; Shape and topology optimal design problems in electromagnetic casting. Engineering Computations, v. 39 n. 1, p. 147-171, 2022.
  6. DOI A. CANELAS; J. R. ROCHE; Solution to a three-dimensional axisymmetric inverse electromagnetic casting problem. Inverse Problems in Science and Engineering, v. 27 n. 10, p. 1451-1467, 2019.
  7. DOI A. CANELAS; A. PEREIRA; J. R. ROCHE; J. P. BRANCHER; Solution of the equilibrium problem in electromagnetic casting considering a solid inclusion in the melt. Mathematics and Computers in Simulation, v. 160, p. 126-137, 2019.
  8. DOI A. CANELAS; M. CARRASCO; J. LÓPEZ; A new method for reliability analysis and reliability-based design optimization. Structural and Multidisciplinary Optimization, v. 59 n. 5, p. 1655-1671, 2019.
  9. DOI A. CANELAS; M. CARRASCO; J. LÓPEZ; A feasible direction algorithm for nonlinear second-order cone programs. Optimization Methods and Software, v. 34 n. 6, p. 1322-1341 , 2019.
  10. DOI T. J. MACHADO; A. CANELAS; A. A. NOVOTNY; J. R. ROCHE; Fast solution of the inverse electromagnetic casting problem. Structural and Multidisciplinary Optimization, v. 57 n. 6, p. 2447-2455, 2018.
  11. DOI A. CANELAS; M. CARRASCO; J. LÓPEZ; Application of the sequential parametric convex approximation method to the design of robust trusses. Journal of Global Optimization, v. 68 n. 1, p. 169-187, 2017.
  12. DOI J. M. PÉREZ ZERPA; A. CANELAS; Efficient formulations of the material identification problem using full-field measurements. Computational Mechanics, v. 58 n. 2, p. 235-255, 2016.
  13. DOI J. M. PÉREZ ZERPA; P. CASTRILLO; X. OTEGUI; A. CANELAS; IETFEM: Una herramienta de código abierto aplicada a la enseñanza del Método de Elementos Finitos en Ingeniería. Revista Argentina de Enseñanza de la Ingeniería, v. 8, p. 51-58, 2015.
  14. DOI J. M. PÉREZ ZERPA; A. CANELAS; B. SENSALE; D. BIA SANTANA; R. L. ARMENTANO; Modeling the arterial wall mechanics using a novel high-order viscoelastic fractional element. Applied Mathematical Modelling, v. 39 n. 16, p. 4767-4780, 2015.
  15. DOI A. CANELAS; A. LAURAIN; A. A. NOVOTNY; A new reconstruction method for the inverse source problem from partial boundary measurements. Inverse Problems, v. 31 n. 7, p. 075009-075032, 2015.
  16. DOI A. CANELAS; A. LAURAIN; A. A. NOVOTNY; A new reconstruction method for the inverse potential problem. Journal of Computational Physics, v. 268, p. 417-431, 2014.
  17. DOI A. CANELAS; A. A. NOVOTNY; J. R. ROCHE; Topology design of inductors in electromagnetic casting using level-sets and second order topological derivatives. Structural and Multidisciplinary Optimization, v. 50 n. 6, p. 419-435, 2014.
  18. DOI A. CANELAS; J. R. ROCHE; Topology optimization in electromagnetic casting via quadratic programming. Inverse Problems in Science and Engineering, v. 22 n. 3, p. 419-435, 2014.
  19. DOI A. I. ABREU; A. CANELAS; W. J. MANSUR; A CQM-based BEM for transient heat conduction problems in homogeneous materials and FGMs. Applied Mathematical Modelling, v. 37 n. 3, p. 776-792, 2013.
  20. DOI A. I. ABREU; A. CANELAS; B. SENSALE; W. J. MANSUR; CQM-based BEM formulation for uncoupled transient quasistatic thermoelasticity analysis. Engineering Analysis with Boundary Elements, v. 36 n. 4, p. 568-578, 2012.
  21. DOI J. R. ROCHE; A. CANELAS; J. HERSKOVITS; Shape optimization for inverse electromagnetic casting problems. Inverse Problems in Science and Engineering, v. 20 n. 7, p. 951-972, 2012.
  22. DOI A. CANELAS; A. A. NOVOTNY; J. R. ROCHE; A new method for inverse electromagnetic casting problems based on the topological derivative. Journal of Computational Physics, v. 230 n. 9, p. 3570-3588, 2011.
  23. DOI J. HERSKOVITS; W. P. FREIRE; M. TANAKA FO; A. CANELAS; A feasible directions method for nonsmooth convex optimization. Structural and Multidisciplinary Optimization, v. 44 n. 3, p. 363-377, 2011.
  24. DOI A. CANELAS; B. SENSALE; A boundary knot method for harmonic elastic and viscoelastic problems using single-domain approach. Engineering Analysis with Boundary Elements, v. 34 n. 10, p. 845-855, 2010.
  25. DOI A. I. ABREU; W. J. MANSUR; A. CANELAS; Computation of time and space derivatives in a CQM based BEM formulation. Engineering Analysis with Boundary Elements, v. 33 n. 3, p. 314-321, 2009.
  26. DOI A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Inductor shape optimization for electromagnetic casting. Structural and Multidisciplinary Optimization, v. 39 n. 6, p. 589-606, 2009.
  27. DOI A. CANELAS; J. R. ROCHE; J. HERSKOVITS; The inverse electromagnetic shaping problem. Structural and Multidisciplinary Optimization, v. 38 n. 4, p. 389-403, 2009.
  28. DOI A. CANELAS; J. HERSKOVITS; J.C.F. TELLES; Shape Optimization using the Boundary Element Method and a SAND Interior Point Algorithm for constrained optimization. Computers & Structures, v. 86 n. 13-14, p. 1517-1526, 2008.

    Libros editados

  1. J. A. MORQUIO; A. CANELAS; L. SEGURA-CASTILLO; Memorias, XXXVI Jornadas Sudamericas de Ingeniería Estructural. 2014, v. 1, p. 233, ISBN: 9789974011687.
  2. J. HERSKOVITS; A. CANELAS; H. CORTÉS; M. AROZTEGUI; Engopt 2008 Internacional Conference on Engineering Optimization: Book of Abstracts and CD-ROM Proceedings. Ed. 1, Rio de Janeiro, E-PAPERS, 2008, v. 1, p. 188, ISBN: 8576501527.
  3. J. HERSKOVITS; S. R. MAZORCHE; A. CANELAS; 6th World Congress on Structural and Multidisciplinary Optimization - Book of Abstracts and CD-ROM Proceedings. Ed. 1, Rio de Janeiro, COPPE - UFRJ, 2005, v. 1, p. 153, ISBN: 8528500705.

    Trabajos en anales de eventos

  1. S. DELGADO; A. CANELAS; Optimización estructural usando la derivada topológica y el método de los elementos finitos extendido (XFEM). In: XXXIX Congreso Argentino de Mecánica Computacional, I Congreso Argentino Uruguayo de Mecánica Computacional MECOM 2023, 2023, Concordia-Salto.
  2. A. I. ABREU; A. CANELAS; J. R. ROCHE; On the use of medium frequencies in the solution of the inverse scattering problem. In: 2nd International Conference on Construction, Energy, Environment & Sustainability CEES 2023, 2023, Funchal.
  3. A. I. ABREU; A. CANELAS; J. R. ROCHE; Detection of inclusions using the topological derivative and a coupled XFEM-BEM method. In: 2nd International Conference on Construction, Energy, Environment & Sustainability CEES 2023, 2023, Funchal.
  4. J. M. PÉREZ ZERPA; A. CANELAS; Convex programming formulations of the material identication problem with total variation regularization. In: 5th International Conference on Computational and Mathematical Biomedical Engineering CMBE 2017, 2017, Pittsburgh.
  5. S. SENSALE; A. CANELAS; B. SENSALE; Un método de colocación sin malla, obtenido a partir de la ecuación integral de contorno indirecta, y su aplicación a problemas de Laplace y Helmholtz. In: Congresso de Métodos Numéricos em Engenharia 2015, 2015, Lisboa.
  6. G. D. MASO TALOU; J. M. PÉREZ ZERPA; P. J. BLANCO; A. CANELAS; R. A. FEIJÓO; Ivus image conditioning for in-vivo characterization of arterial tissue. In: VI International Conference on Computational Bioengineering ICCB 2015, 2015, Barcelona.
  7. J. M. PÉREZ ZERPA; A. CANELAS; B. SENSALE; D. BIA SANTANA; R. L. ARMENTANO; A high-order viscoelastic fractional element applied to modeling ovine arterial wall behavior. In: 11th World Congress on Computational Mechanics (WCCM XI), 2014, Barcelona.
  8. J. M. PÉREZ ZERPA; A. CANELAS; B. SENSALE; D. BIA SANTANA; R. L. ARMENTANO; Modelado de tejido arterial utilizando un elemento fraccional viscoelástico de orden superior. In: ENIEF 2014 - XXI Congreso sobre Métodos Numéricos y sus Aplicaciones, 2014, Bariloche.
  9. P. CASTRILLO; J. M. PÉREZ ZERPA; F. MONDINO; A. CANELAS; Desarrollo y extensión de una herramienta numérica de elementos finitos para el dictado de cursos de grado y de posgrado. In: ENIEF 2014 - XXI Congreso sobre Métodos Numéricos y sus Aplicaciones, 2014, Bariloche.
  10. M. CARRASCO; ALFREDO CANELAS; JULIO LÓPEZ; Diseño de reticulados robustos usando el método de aproximaciones convexas sucesivas. In: XXXVI Jornadas Sudamericas de Ingeniería Estructural, 2014, Montevideo.
  11. ALFREDO CANELAS; J. R. ROCHE; Inductors optimal design in three-dimensional electromagnetic shaping problems. In: 4th International Conference on Engineering Optimization - EngOpt 2014, 2014, Lisboa.
  12. S. ROBLE; A. CANELAS; B. SENSALE; Una nueva formulación del MEF para el análisis de estructuras de hormigón considerando los efectos de las deformaciones diferidas. In: Congreso de Métodos Numéricos en Ingeniería, 2013, Bilbao.
  13. A. A. NOVOTNY; A. CANELAS; A. LAURAIN; A new method for the inverse potential problem based on the topological derivative. In: XXXIV Iberian Latin-American Congress on Computational Methods in Engineering - CILAMCE XXXIV, 2013, Pirenópolis.
  14. S. ROBLE; A. CANELAS; B. SENSALE; Aplicación del método de la cuadratura de convolución en el análisis de estructuras de hormigón considerando los efectos de las deformaciones diferidas. In: XXXV Jornadas Sul Americanas de Engenharia Estrutural, 2012, Rio de Janeiro.
  15. A. CANELAS; A. A. NOVOTNY; J. R. ROCHE; Topological derivatives and a level set approach for an inverse electromagnetic casting problem. In: WCCM 2012 - 10th World Congress on Computational Mechanics, 2012, São Paulo.
  16. A. CANELAS; J. HERSKOVITS; J. R. ROCHE; Interior point methods for shape optimization in electromagnetic casting. In: EngOpt 2012 - International Conference on Engineering Optimization, 2012, Rio de Janeiro.
  17. A. I. ABREU; A. CANELAS; B. SENSALE; W. J. MANSUR; Solution of thermoelasticity problems using a boundary element method based on the convolution quadrature method. In: Congresso de Métodos Numéricos em Engenharia 2011, 2011, Coimbra.
  18. A. CANELAS; A. A. NOVOTNY; J. R. ROCHE; Design of inductors in electromagnetic casting using topological derivatives. In: The 14th International ESAFORM Conference on Material Forming, AIP Conf. Proc. 1353, 17-22. 2011, Belfast.
  19. M. TANAKA FO; M. AROZTEGUI; A. CANELAS; J. HERSKOVITS; Solving robust truss topology design problems with two feasible direction interior point techniques. In: COBEM 2011 - 21st International Congress of Mechanical Engineering, 2011, Natal.
  20. M. AROZTEGUI; J. C. A. COSTA JR; A. CANELAS; J. HERSKOVITS; Maximizing the fundamental frequency of truss structures. In: COBEM 2011 - 21st International Congress of Mechanical Engineering, 2011, Natal.
  21. A. CANELAS; B. SENSALE; A boundary elements method for harmonic viscoelastic problems. In: XXXIV Jornadas Sudamericanas de Ingeniería Estructural, 2010, San Juan.
  22. B. SENSALE; A. CANELAS; A boundary knot method for three-dimensional harmonic viscoelastic problems. In: BETEQ - International Conference on Boundary Element and Meshless Techniques, 2010, Berlin.
  23. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Shape optimization for inverse electromagnetic casting problems. In: IPDO2010 - Inverse Problems, Design and Optimization Symposium, 2010, João Pessoa.
  24. M. TANAKA FO; J. HERSKOVITS; A. CANELAS; A new algorithm based on feasible directions and cutting planes for nonsmooth convex inequality constrained optimization problems. In: EngOpt 2010 - 2nd International Conference on Engineering Optimization, 2010, Lisboa.
  25. A. I. ABREU; W. J. MANSUR; A. CANELAS; Transient heat conduction analysis using a boundary element method based on the convolution quadrature method. In: MECOM 2010 - CILAMCE 2010 - XXXI Iberian Latin American Congress on Computational Methods in Engineering, 2010, Buenos Aires.
  26. A. PELUFFO; P. EZZATTI; A. CANELAS; Técnicas de regularización para análisis de estructuras viscoelásticas usando un método de funciones de influencia. In: MECOM 2010 - CILAMCE 2010 - XXXI Iberian Latin American Congress on Computational Methods in Engineering, 2010, Buenos Aires.
  27. A. CANELAS; B. SENSALE; On the completeness of the set of radial trefftz functions used by the BKM in the solution of viscoelasticity problems. In: MECOM 2010 - CILAMCE 2010 - XXXI Iberian Latin American Congress on Computational Methods in Engineering, 2010, Buenos Aires.
  28. A. I. ABREU; A. CANELAS; W. J. MANSUR; C. A. R. VERA-TUDELA; A CQM-based BEM formulation applied to heat conduction problems. In: XIII Encontro de modelagem Computacional, 2010, Nova Friburgo.
  29. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Inductor design in electromagnetic casting. In: WCSMO 8 - 8th World Congress on Structural and Multidisciplinary Optimization, 2009, Lisboa.
  30. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Inductor design in electromagnetic casting. In: IFIP 2009 - 24th TC7 Conference in System Modelling and Optimization, 2009, Buenos Aires.
  31. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Large Scale PDE Optimization with FAIPA, the Feasible Arc Interior Point Algorithm. In: IFIP 2009 - 24th TC7 Conference in System Modelling and Optimization, 2009, Buenos Aires.
  32. A. I. ABREU; W. J. MANSUR; A. CANELAS; Estudo da eficiência computacional do método da quadratura de convolução baseado no método dos elementos de contorno. In: XXIX CILAMCE - Iberian Latin American Congress on Computational Methods in Engineering, 2008, Maceió.
  33. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; Electromagnetic Casting Inverse Problem. In: EngOpt 2008 - International Conference on Engineering Optimization, 2008, Rio de Janeiro.
  34. J. HERSKOVITS; S. R. MAZORCHE; A. CANELAS; G. M. GUERRA; A numerical algorithm for mixed nonlinear complementarity problems and applications to contact stress analysis. In: 8th World Congress on Computational Mechanics - WCCM 2008, 2008, Rio de Janeiro.
  35. A. CANELAS; S. R. MAZORCHE; J. HERSKOVITS; An Interior-point Algorithm for Mixed Complementarity Problems. In: EngOpt 2008 - International Conference on Engineering Optimization, 2008, Rio de Janeiro.
  36. V. CARRERA; M. CERROLAZA; A. CANELAS; Desarrollo de uma herramienta computacional para el análisis del comportamiento poroelástico de tejido biológico mediante el método de elementos de contorno. In: CIMENICS 2008 - IX Congreso Internacional de Métodos Numéricos en Ingeniería y Ciencias Aplicadas, 2008, Isla de Margarita.
  37. A. CANELAS; J. HERSKOVITS; S. R. MAZORCHE; Algoritmos baseados no método de Newton para problemas de otimização não lineares. In: XXIX CILAMCE - Iberian Latin American Congress on Computational Methods in Engineering, 2008, Maceió.
  38. A. CANELAS; J. R. ROCHE; J. HERSKOVITS; An Inverse Problem of Electromagnetic Shaping of Liquid Metals. In: ENUMATH 2007, 2007, Graz.
  39. J. HERSKOVITS; M. AROZTEGUI; V. DUBEUX; A. CANELAS; E. GOULART; A Large Scale Structural Optimization Algorithm with Very Small Memory Requirements Based on FAIPA. In: WCSMO7, 7th World Congress on Structural and Multidisciplinary Optimization, 2007, Seoul.
  40. S. R. MAZORCHE; J. HERSKOVITS; A. CANELAS; G. M. GUERRA; Solution of contact problems in linear elasticity using a feasible interior point algorithm for nonlinear complementarity problems. In: WCSMO7, 7th World Congress on Structural and Multidisciplinary Optimization, 2007, Seoul.
  41. S. R. MAZORCHE; J. HERSKOVITS; A. CANELAS; G. M. GUERRA; Application of a feasible interior point algorithm for nonlinear complementarity on contact problems in 3D linear elasticity. In: COBEM 2007, 19th International Congress of Mechanical Engineering, 2007, Brasilia.
  42. A. CANELAS; J.C.F. TELLES; J. HERSKOVITS; Shape optimization using the BEM and SAND formulations. In: COBEM 2007, 19th International Congress of Mechanical Engineering, 2007, Brasilia.
  43. A. CANELAS; J. HERSKOVITS; J.C.F. TELLES; Shape Optimization using the Boundary Element Method and a SAND Interior Point Algorithm for constrained optimization. In: III ECCM, European Conference on Computational Mechanics Solids, Structures and Coupled Problems in Engineering, 2006, Lisboa.
  44. S. R. MAZORCHE; A. CANELAS; J. HERSKOVITS; Algoritmos de Complementaridade para problemas de elasticidade linear com contato sem atrito. In: XXVII CILAMCE, Iberian Latin American Congress on Computational Methods, 2006, Belém.
  45. G. M. GUERRA; A. CANELAS; J. HERSKOVITS; S. R. MAZORCHE; Desenvolvimento e implementação de interface entre um pacote comercial de (MEF) e um algoritmo de complementaridade aplicado a problemas de contato. In: XXVII CILAMCE, Iberian Latin American Congress on Computational Methods, 2006, Belém.
  46. V. DUBEUX; A. CANELAS; P. MAPPA; J. HERSKOVITS; Large Scale Nonlinear Optimization with FAIPA Feasible Arc Interior Point Algorithm. In: WCSMO6, 6º World Congress on Structural and Multidisciplinary Optimization, 2005, Rio de Janeiro.
  47. A. CANELAS; B. SENSALE; Aplicación del Método de Trefftz en problemas de fractura de piezas torsionadas. In: XXXI Jornadas Sudamericanas de Ingeniería Estructural, 2004, Mendoza.
  48. J. HERSKOVITS; A. CANELAS; Robust truss topologic design by a new interior-point algorithm for non-smooth convex programming. In: XXV CILAMCE, Iberian Latin American Congress on Computational Methods, 2004, Recife.
  49. V. DUBEUX; J. HERSKOVITS; A. CANELAS; Aplicação do Método do Gradiente Conjugado Precondicionado pela matriz quase-Newton de Memória Limitada no FAIPA. In: XXV CILAMCE, Iberian Latin American Congress on Computational Methods, 2004, Recife.
  50. B. SENSALE; A. CANELAS; I. ITURRIOZ; Análisis de vibraciones libres de sólidos mediante el método de los elementos de contorno. In: XXX Jornadas Sul-Americanas de Engenharia Estrutural, 2002, Brasilia.

    Presentaciones en eventos

  1. PDF Optimización topológica de estructuras reticuladas robustas. In: Seminario Proyecto STIC-AMSUD, 2023, Santiago.
  2. PDF Shape and topology optimal design problems in electromagnetic casting. In: Journées d’Analyse Numérique, IECL, 2022, Nancy.
  3. PDF A quadratic programming model for topology optimization in electromagnetic casting. In: Partial differential equations, optimal design and numerics, 2013, Benasque.
  4. PDF Topological derivatives and a level set approach for an inverse electromagnetic casting problem. In: WCCM 2012 - 10th World Congress on Computational Mechanics, 2012, São Paulo.
  5. PDF On the completeness of the set of radial trefftz functions used by the BKM in the solution of viscoelasticity problems. In: MECOM 2010 - CILAMCE 2010 - XXXI Iberian Latin American Congress on Computational Methods in Engineering, 2010, Buenos Aires.
  6. PDF Un método de elementos de contorno para problemas de viscoelasticidad armónicos; XXXIV Jornadas Sudamericanas de Ingeniería Estructural. 2010.
  7. PDF Uma Ferramenta para otimização em Engenharia Mecânica e aplicações na Fundição Eletromagnética de Metais; STIC-AMSUD. 2009.
  8. PDF Un Algoritmo de Newton de Punto Interior y Aplicaciones en la Fundición Electromagnética de Metales; Primer Encuentro Uruguayo sobre Mecánica de Fluidos. 2009.
  9. PDF Large Scale PDE Optimization with FAIPA, the Feasible Arc Interior Point Algorithm; IFIP 2009 - 24th TC7 on System Modelling and Optimization. 2009.
  10. PDF Inductor design in electromagnetic casting; IFIP 2009 - 24th TC7 on System Modelling and Optimization. 2009.
  11. PDF Algoritmos baseados no método de Newton para problemas de otimização não lineares; XXIX CILAMCE - Iberian Latin American Congress on Computational Methods in Engineering. 2008.
  12. PDF Shape Optimization using the Boundary Element Method and a SAND Interior Point Algorithm for constrained optimization; III ECCM, European Conference on Computational Mechanics Solids, Structures and Coupled Problems in Engineering. 2006.
  13. PDF Robust truss topologic design by a new interior-point algorithm for non-smooth convex programming. XXV CILAMCE, Iberian Latin American Congress on Computational Methods. 2004.