References
- [1] M. S. ElTobgy and M. A. Elbestawi, “Finite Element Modeling of Erosive Wear,” International Journal of Machine Tools and Manufacture, vol. 45, no. 11, pp. 1337-1346, Sep. 2005. https://doi.org/10.1016/j.ijmachtools.2005.01.00710.1016/j.ijmachtools.2005.01.007
- [2] F. Casesnoves, M. Antonov, and P. Kulu, “Mathematical Models for Erosion and Corrosion in Power Plants. A Review of Applicable Modelling Optimization Techniques,” in 2016 57th International Scientific Conference on Power and Electrical Engineering of Riga Technical University (RTUCON), Oct. 2016. https://doi.org/10.1109/rtucon.2016.7763117 ISBN 978-1-5090-3732-2. USB ISBN 978-1-5090-3730-8. ISBN 978-1-5090-3722-2.
- [3] J. Y. Shin, Y. J. Jeon, D. J. Maeng, J. S. Kim, and S. T. Ro, “Analysis of the Dynamic Characteristics of a Combined-Cycle Power Plant,” Energy, vol. 2, pp. 1085-1098, Dec. 2002. https://doi.org/10.1016/s0360-5442(02)00087-710.1016/s0360-5442(02)00087-7
- [4] F. Casesnoves and A. Surzhenkov, “Mathematical Models in Mechanical and Biomedical Tribology With Computational Simulations/Optimization Methods,” International Journal of Scientific Research in Computer Science, Engineering and Information Technology, vol. 2, issue 1, 2017. ISSN 2456-3307.
- [5] F. Casesnoves, “Erosion Wear Mathematical Model for WC-Co Reinforcement Hardness Distribution in Fe-Based Alloy Matrix With Evoluted Algorithms,” International Journal of Scientific Research in Science, Engineering and Technology, vol. 3, issue 5, pp. 336-344, 2017. Print ISSN 2395-1990. Online ISSN 2394-4099.
- [6] F. Casesnoves, “2D Computational-Numerical Hardness Comparison Between Fe-Based Hardfaces With WC-Co Reinforcements for Integral- Differential Modelling,” in Proc. Materials Science and Applied Chemistry 58th International Conference, 2017, Trans Tech Publications, Switzerland.10.4028/www.scientific.net/KEM.762.330
- [7] F. Casesnoves and A. Surzhenkov, “Inverse Methods for Computational Simulations and Optimization of Erosion Models in Power Plants: A Numerical-Sufactal Nonlinear Optimization of Modelling,” in Proc. 2017 IEEE 58th International Scientific Conference on Power and Electrical Engineering of Riga Technical University (RTUCON), Oct. 2017, paper 139. https://doi.org/10.1109/rtucon.2017.812563010.1109/rtucon.2017.8125630
- [8] F. Casesnoves, “2D Computational-Numerical Hardness Comparison Between Fe-Based Hardfaces With WC-Co Reinforcements for Integral- Differential Modelling,” Key Engineering Materials, vol. 762, pp 330- 338, Feb. 2018. https://doi.org/10.4028/www.scientific.net/kem.762.33010.4028/www.scientific.net/KEM.762.330
- [9] L. Crocker, A Review of Current Methods for Modeling Erosive Wear. NPL Report, 2011.
- [10] M. Abramowitz and I. Stegun, Handbook of Mathematical Functions. Applied Mathematics Series, 55, 1972.
- [11] F. Casesnoves, “A Monte-Carlo Optimization Method in Numerical Reuleaux Method for the Movement Analysis of Pseudo-Rigid Bodies,” in Proc. 10th SIAM Conference in Geometric Design and Computing joint to Approximation Theory Conference, Texas, San Antonio, USA, 2007, pp. 4-5.
- [12] G. Luenberger, Linear and Nonlinear Programming, 4th ed. Springer, 2008.10.1007/978-0-387-74503-9
- [13] A. Ots, Oil Shale Combustion. Tallinn, Estonia: TUT Press, 2004.10.3176/oil.2004.2.06
- [14] K. Holmberg and A. Erdemir, “Influence of Tribology on Global Energy Consumption, Costs, and Emissions,” Friction, vol. 5, issue 3, pp. 263-284, Sept. 2017.10.1007/s40544-017-0183-5
- [15] F. Casesnoves, “3D Improved Mathematical Model for Lumbar Intervertebral Ligaments (LILs),” in Proc. SIAM Life Sciences Conference joint to SIAM Annual Conference San Diego, 2012, pp. 25-27.
- [16] B. G. Mellor, Surface Coatings for Protection Against Wear. CRC Press. Woodhead Publishing in Materials, 2006.10.1533/9781845691561
- [17] I. Hutchings, “A Model for the Erosion of Metals With Spherical Particles at Normal Incidence,” Wear, vol. 70, issue 3, pp. 269-281, Aug. 1981. https://doi.org/10.1016/0043-1648(81)90347-110.1016/0043-1648(81)90347-1
- [18] G. Sheldon, I. Finnie, “The Mechanism of Material Removal in the Erosive Cutting of Brittle Materials,” J. Eng. Ind., vol. 88, issue 4, pp. 393-400. https://doi.org/10.1115/1.367266710.1115/1.3672667
- [19] I. Kleis and P. Kulu, Solid Particle Erosion. Springer. 2008. https://doi.org/10.1007/978-1-84800-029-210.1007/978-1-84800-029-2
- [20] F. Casesnoves, “An Optimization Method for Static Wedge-Radiation Filters in Radiation Therapy,” Master Thesis in Physics, Eastern Finland University, 2001.
- [21] K. Balamanikandasuthan, K. Arun, and S. Palam, “Design and Fabrication of Erosion Protection Shield for Boiler Tubes and Its Analysis,” International Journal of Mechanical and Materials Engineering, vol. 1, issue 1, pp. 39-52, 2015.
- [22] D. Bertsekas, Nonlinear Programming, 2nd ed. Athena Scientific, 2003.
- [23] J. Borwein, Convex Analysis and Nonlinear Optimization, 2nd ed. CMS Books in Mathematics. Springer, 2000.10.1007/978-1-4757-9859-3
- [24] F. Casesnoves, “Large-Scale Multiobjective Matlab Optimization Toolbox (mot) Computing Methods in Radiotherapy Inverse Treatment Planning,” in High Performance Computing Conference, 2007, Nottingham University.
- [25] F. Casesnoves, “Geometrical/Computational Dynamics Approximations for Helicopter-Rotor Instantaneous Rotation Center in Turbulence With Numerical Reuleaux Method,” International Journal of Engineering and Innovative Technology, vol. 4, issue 3, pp. 175-184, 2014.
- [26] F. Casesnoves, “Geometrical Algorithms for Civil Helicopter (CH) Rotor Blades Instantaneous Rotation Center (IRC) Determination in Deformable/Turbulence Conditions Using the Numerical Reuleaux Method (NRM): A Nonlinear Optimization Method in Aerospace Engineering Dynamics,” in Proc. SIAM Conference on Applied Algebraic Geometry Fort Collins. 2013, pp. 112-114.
- [27] F. Hildebrand, Introduction to Numerical Analysis, 2nd ed. Dover Publications, Inc., 1987.
- [28] L. Fausett, Applied Numerical Analysis Using Matlab. Pearson International, 2008.
- [29] S. Kajda, S. Harvey, and E. Wilusz Eds., Encyclopedia of Tribology. Elsevier, 1990.
- [30] H. Liao, B. Normand, and C. Coddet, “Influence of Coating Microstructure on the Abrasive Wear Resistance of WC/Co Cermet Coatings,” Surface and Coatings Technology, vol. 124, issue 2-3, pp. 235-242, 2000. https://doi.org/10.1016/s0257-8972(99)00653-210.1016/s0257-8972(99)00653-2
- [31] S. Basu, Freemat v4.0 Documentation. 2009.
- [32] S. Basu, Freemat v4.2 Documentation. 2012.
- [33] C. Moler, Numerical Computing With Matlab. SIAM, 2004. https://doi.org/10.1137/1.978089871795210.1137/1.9780898717952
- [34] S. Gherpade, Introduction to Algebraic Geometry. Department of Mathematics Publications. Indian Institute of Technology Bombay, 2014.
- [35] W. Cheney and W. Light, A Course in Approximation Theory: Graduate Studies in Mathematics. Am. Math. Soc., vol. 101, 2000.
- [36] A. Crowell and J. Slesnicks, Calculus With Analytic Geometry. Version 3.03. GNU Free Documentation License. Free Software Foundation. 2008.
- [37] W. Strauss, Partial Differential Equations, 2nd ed. Wiley, 2008.
- [38] Q. Chen, D. Li, “Computer Simulation of Solid-Particle Erosion of Composite Materials,” Wear, vol. 255, issue 1-6, pp. 78-84, Aug.-Sept. 2003. https://doi.org/10.1016/s0043-1648(03)00065-610.1016/s0043-1648(03)00065-6
- [39] F. Casesnoves, “Experimental Simulations of the Numerical Reuleaux Method (NRM) for Lumbar Artificial Disk Implants IRC Determination,” in Proc. SIAM Conference in Computational Science and Engineering, 2009, PP1 Section, pp. 1-2.
- [40] F. Casesnoves, “Theory and Primary Computational Simulations of the Numerical Reuleaux Method (NRM),” International Journal of Mathematics and Computation, vol. 13, no. D11, pp. 90-110, 2011.
- [41] F. Casesnoves, “Applied Inverse Methods for Deformable Solid Dynamics/Kinematics in Numerical Reuleaux Method (NRM),” International Journal of Numerical Methods and Applications, vol. 9, no. 2, pp. 109-131, 2013.
- [42] F. Casesnoves, “Applied Inverse Methods for Optimal Geometrical- Mechanical Deformation of Lumbar Artificial Disks/Implants With Numerical Reuleaux Method. 2D Comparative Simulations and Formulation,” Ethan Publishing Computer Science Applications, vol. 2, no. 4, pp. 1-10, 2015.
- [43] Casesnoves, F. “Computational simulations of vertebral body for optimal instrumentation design,” Journal of Medical Devices, vol. 6, issue 2, pp. 14-25, 2012. https://doi.org/10.1115/1.400667010.1115/1.4006670
- [44] F. Casesnoves, “Computational Simulations of Anterior Vertebral Body for Optimal Surgical Instrumentation Design,” Journal of Medical Devices, vol. 4, issue 2, pp. 25-26, 2010.10.1115/1.3439667
- [45] V. Camomilla and A. Cereatti, “An Optimized Protocol for Hip Joint Centre Determination Using the Functional Method,” Journal of Biomechanics, vol. 39, issue 6, pp. 1096-1106, 2006. https://doi.org/10.1016/j.jbiomech.2005.02.00810.1016/j.jbiomech.2005.02.00816549099
- [46] L. Li and D. Li, “Simulation of Corrosion-Erosion of Passive Metals Using a Micro-Scale Dynamical Model,” Wear, vol. 271, pp. 1404-1410, 2011. https://doi.org/10.1016/j.wear.2010.12.05610.1016/j.wear.2010.12.056
- [47] F. Casesnoves, “Spinal Biomechanics Mathematical Model for Lumbar Intervertebral Ligaments,” in Proc. SIAM Conference on Computational Science and Engineering, 2011, pp. 227-229.
- [48] European Commission, European Textbook on Ethics in Research. EUR 24452 EN, 2010.
- [49] Notes, References, and Lectures. CEE SIMP Conference. Raw Materials and Circular Economy. Institute of Geology, Tallinn University of Technology, Mektory Technology Innovation Center, 2017.
- [50] The European Code of Conduct for Research Integrity. Revised Edition. ALLEA, 2017.