Simultaneous shape and mesh quality optimization using pre-shape calculus

Alnaes, M.S., Blechta, J., Hake, J., Johansson, A., Kehlet, B., Logg, A., Richardson, C., Ring, J., Rognes, M.E. and Wells, G.N. (2015) The FEniCS project version 1.5. Archive of Numerical Software, 3(100). Search in Google Scholar

Cao, W., Huang, W. and Russell, R.D. (1999) A Study of Monitor Functions for Two-Dimensional Adaptive Mesh Generation. SIAM Journal on Scientific Computing, 20(6): 1978–1994.10.1137/S1064827597327656 Search in Google Scholar

Dacorogna, B. and Moser, J. (1990) On a Partial Differential Equation Involving the Jacobian Determinant. In: Annales de l’Institut Henri Poincaré (C) Non Linear Analysis, 7, 1–26. Elsevier.10.1016/s0294-1449(16)30307-9 Search in Google Scholar

Deckelnick, K., Herbert, P.J. and Hinze, M. (2021) A Novel W1;1 Approach to Shape Optimisation with Lipschitz Domains. arXiv preprint arXiv:2103.13857.10.1051/cocv/2021108 Search in Google Scholar

Etling, T., Herzog, R., Loayza, E. and Wachsmuth, G. (2018) First and second order shape optimization based on restricted mesh deformations. arXiv preprint arXiv:1810.10313. Search in Google Scholar

Friederich, J., Leugering, G. and Steinmann, P. (2014) Adaptive Finite Elements based on Sensitivities for Topological Mesh Changes. Control and Cybernetics, 43(2); 279–306. Search in Google Scholar

Geuzaine, C. and Remacle, J.-F. (2009) Gmsh: A 3D Finite Element Mesh Generator with Built-In Pre-and Post-Processing Facilities. International Journal for Numerical methods in Engineering, 70(11): 1309–1331.10.1002/nme.2579 Search in Google Scholar

Guillemin, V. and Pollack, A. (2010) Differential Topology, 370. American Mathematical Society.10.1090/chel/370 Search in Google Scholar

Haubner, J., Siebenborn, M. and Ulbrich, M. (2020) A Continuous Perspective on Modeling of Shape Optimal Design Problems. arXiv preprint arXiv:2004.06942. Search in Google Scholar

Herzog, R. and Loayza-Romero, E. (2020) A Manifold of Planar Triangular Meshes with Complete Riemannian Metric. arXiv preprint arXiv:2012. 05624. Search in Google Scholar

Lee, J.M. (2009) Manifolds and Differential Geometry. Graduate Studies in Mathematics 107. American Mathematical Society.10.1090/gsm/107 Search in Google Scholar

Logg, A., Mardal, K.-A., Wells, G.N., et al. (2012) Automated Solution of Differential Equations by the Finite Element Method. Springer.10.1007/978-3-642-23099-8 Search in Google Scholar

Luft, D. and Schulz, V. (2021) Pre-Shape Calculus: Foundations and Application to Mesh Quality Optimization. Control and Cybernetics, 50(3); 263–301.10.2478/candc-2021-0019 Search in Google Scholar

Müller, P.M., Kühl, N., Siebenborn, M., Deckelnick, K., Hinze, M. and Rung, T. (2021) A novel p-harmonic descent approach applied to fluid dynamic shape optimization. arXiv preprint arXiv:2103.14735.10.1007/s00158-021-03030-x Search in Google Scholar

Onyshkevych, S. and Siebenborn, M. (2020) Mesh Quality Preserving Shape Optimization using Nonlinear Extension Operators. arXiv preprint arXiv:2006.04420.10.1007/s10957-021-01837-8 Search in Google Scholar

Savard, G. and Gauvin, J. (1994) The Steepest Descent Direction for the Nonlinear Bilevel Programming Problem. Operations Research Letters, 15(5): 265–272.10.1016/0167-6377(94)90086-8 Search in Google Scholar

Schmidt, S. (2014) A Two Stage CVT/Eikonal Convection Mesh Deformation Approach for Large Nodal Deformations. arXiv preprint arXiv:1411.7663. Search in Google Scholar

Schulz, V. and Siebenborn, M. (2016) Computational Comparison of Surface Metrics for PDE Constrained Shape Optimization. Computational Methods in Applied Mathematics, 16(3): 485–496.10.1515/cmam-2016-0009 Search in Google Scholar

Schulz, V., Siebenborn, M. and Welker, K. (2016) Efficient PDE Constrained Shape Optimization based on Steklov-Poincaré Type Metrics. SIAM Journal on Optimization, 26(4): 2800–2819.10.1137/15M1029369 Search in Google Scholar

Shewchuk, J.R. (2002) What is a Good Linear Element? Interpolation, Conditioning, Anisotropy, and Quality Measures. Technical Report. University of California at Berkeley, Department of Electrical Engineering and Computer Science. Berkeley, CA. Search in Google Scholar

Smolentsev, N.K. (2007) Diffeomorphism groups of compact manifolds. Journal of Mathematical Sciences, 146(6): 6213–6312.10.1007/s10958-007-0471-0 Search in Google Scholar