Dr. L. (Loek) Spitz
Faculty of Social and Behavioural Sciences
Powl Docenten OWI/UPvA
Visiting address
- Nieuwe Achtergracht 127
Postal address
-
Postbus 15776
1001 NG Amsterdam
Contact details
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Publications
2021
- Bredeweg, B., Kragten, M., & Spitz, L. (2021). Learning about systems by developing interactive diagrams. In L. Gómez Chova, A. López Martínez, & I. Candel Torres (Eds.), 13th International Conference on Education and New Learning Technologies: 5th-6th July, 2021 (pp. 6119-6123). (EDULEARN conference proceedings; Vol. 21). IATED. https://doi.org/10.21125/edulearn.2021.1232 [details]
- Spitz, L., Kragten, M., & Bredeweg, B. (2021). Exploring the Working and Effectiveness of Norm-Model Feedback in Conceptual Modelling – A Preliminary Report. In I. Roll, D. McNamara, S. Sosnovsky, R. Luckin, & V. Dimitrova (Eds.), Artificial Intelligence in Education: 22nd International Conference, AIED 2021, Utrecht, The Netherlands, June 14–18, 2021 : proceedings (Vol. II, pp. 325-330). (Lecture Notes in Computer Science; Vol. 12749), (Lecture Notes in Artificial Intelligence). Springer. https://doi.org/10.1007/978-3-030-78270-2_58 [details]
2015
- Buryak, A., Shadrin, S., Spitz, L., & Zvonkine, D. (2015). Integrals of ψ-classes over double ramification cycles. American Journal of Mathematics, 137(3), 699-737. https://doi.org/10.1353/ajm.2015.0022 [details]
- Dunin-Barkowski, P., Kazarian, M., Orantin, N., Shadrin, S., & Spitz, L. (2015). Polynomiality of Hurwitz numbers, Bouchard-Mariño conjecture, and a new proof of the ELSV formula. Advances in Mathematics, 279, 67-103. https://doi.org/10.1016/j.aim.2015.03.016 [details]
- Shadrin, S., Spitz, L., & Zvonkine, D. (2015). Equivalence of ELSV and Bouchard-Mariño conjectures for r-spin Hurwitz numbers. Mathematische Annalen, 361(3-4), 611-645. Advance online publication. https://doi.org/10.1007/s00208-014-1082-y [details]
2014
- Dunin-Barkowski, P., Orantin, N., Shadrin, S., & Spitz, L. (2014). Identification of the Givental formula with the spectral curve topological recursion procedure. Communications in Mathematical Physics, 328(2), 669-700. https://doi.org/10.1007/s00220-014-1887-2 [details]
2013
- Dunin-Barkovskiy, P., Shadrin, S., & Spitz, L. (2013). Givental Graphs and Inversion Symmetry. Letters in Mathematical Physics, 103(5), 533-557. https://doi.org/10.1007/s11005-013-0606-9 [details]
- Mulase, M., Shadrin, S., & Spitz, L. (2013). The spectral curve and the Schrödinger equation of double Hurwitz numbers and higher spin structures. Communications in Number Theory and Physics, 7(1), 125-143. https://doi.org/10.4310/CNTP.2013.v7.n1.a4 [details]
2012
- Shadrin, S., Spitz, L., & Zvonkine, D. (2012). On double Hurwitz numbers with completed cycles. Journal of the London Mathematical Society-Second Series, 86(2), 407-432. https://doi.org/10.1112/jlms/jds010 [details]
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Ancillary activities
No ancillary activities
Spitz, L. (2014). Hurwitz numbers, moduli of curves, topological recursion, Givental's theory and their relations. [Thesis, fully internal, Universiteit van Amsterdam].