Publications of Margaret H. Regan    :chronological  combined  bibtex listing:

Papers Published

1. Regan, M; Hauenstein, J, Adaptive strategies for solving parameterized systems using homotopy continuation, Applied Mathematics and Computation, vol. 332 (September, 2018), pp. 19-34, Elsevier [doi]
2. Hauenstein, J; Regan, M, Evaluating and differentiating a polynomial using a pseudo-witness set, Lecture Notes in Computer Science (Including Subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), vol. 12097 (2020), pp. 61-69, Springer-Verlag, ISBN 9783030521998 [doi]
3. Rotzoll, M; Regan, MH; Husty, ML; Hayes, MJD, Kinematic geometry of spatial RSSR mechanisms, Mechanism and Machine Theory, vol. 185 (July, 2023) [doi]  [abs]
4. Mills, EA; Regan, MH; Stanic, V; Collings, PJ, Large assembly formation via a two-step process in a chromonic liquid crystal., Journal of Physical Chemistry B, vol. 116 no. 45 (November, 2012), pp. 13506-13515, American Chemical Society (ACS) [doi]  [abs]
5. Bernal, EA; Hauenstein, JD; Mehta, D; Regan, MH; Tang, T, Machine learning the real discriminant locus, Journal of Symbolic Computation, vol. 115 (March, 2023), pp. 409-426 [doi]  [abs]
6. Brake, D; Hauenstein, J; Regan, M, polyTop: Software for computing topology of smooth real surfaces, Lecture Notes in Computer Science (Including Subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), vol. 10931 (2018), pp. 397-404, Springer-Verlag, ISBN 9783319964171 [doi]
7. Regan, M; Hauenstein, J, Real monodromy action, Applied Mathematics and Computation, vol. 373 (May, 2020), pp. 124983-124983, Elsevier [doi]
8. Collings, PJ; Goldstein, JN; Hamilton, EJ; Mercado, BR; Nieser, KJ; Regan, MH, The nature of the assembly process in chromonic liquid crystals, Liquid Crystals Reviews, vol. 3 no. 1 (January, 2015), pp. 1-27, Informa UK Limited [doi]
9. Fabbri, R; Duff, T; Fan, H; Regan, M; da Costa de Pinho, D; Tsigaridas, E; Wampler, C; Hauenstein, J; Giblin, P; Kimia, B; Leykin, A; Pajdla, T, TRPLP – Trifocal Relative Pose From Lines at Points, Proceedings of the Ieee/Cvf Conference on Computer Vision and Pattern Recognition (Cvpr) (June, 2020), pp. 12073-12083, IEEE [doi]