Mikhail Skopenkov
- Associate Professor:Faculty of Mathematics
- Mikhail Skopenkov has been at HSE University since 2014.
Education and Degrees
- 2009
Candidate of Sciences* (PhD)
- 2008
Candidate of Sciences* (PhD) in Geometry and Topology
Thesis Title: Classification of links and its applications - 2008
Doctoral programme in Geometry and topology
Lomonosov Moscow State University, mathematics - 2005
Degree
Lomonosov Moscow State University - 2005
Master's in Mathematics
Lomonosov Moscow State University, mathematics
According to the International Standard Classification of Education (ISCED) 2011, Candidate of Sciences belongs to ISCED level 8 - "doctoral or equivalent", together with PhD, DPhil, D.Lit, D.Sc, LL.D, Doctorate or similar. Candidate of Sciences allows its holders to reach the level of the Associate Professor.
![](/images/traits/tp.png)
Young Faculty Support Programme (Group of Young Academic Professionals)
Category "Future Professoriate" (2015-2016)
Courses (2021/2022)
- Calculus (Bachelor’s programme; Faculty of Mathematics; 2 year, 1-4 module)Rus
- Calculus (Bachelor’s programme; Faculty of Mathematics; 1 year, 1-4 module)Rus
- Discrete Mathematics (Bachelor’s programme; Faculty of Mathematics; 2 year, 4 module)Rus
- Geometry (Bachelor’s programme; Faculty of Mathematics; 1 year, 1-4 module)Rus
- Past Courses
Courses (2020/2021)
- Calculus (Bachelor’s programme; Faculty of Mathematics; 2 year, 1-4 module)Rus
Calculus (Bachelor’s programme; Faculty of Mathematics; field of study "01.03.01. Математика", field of study "01.03.01. Математика"; 1 year, 1-4 module)Rus
- Mathematics. Licenciatus (Bachelor’s programme; Faculty of Mathematics; 4 year, 1 module)Rus
- Геометрия (Bachelor’s programme; Faculty of Mathematics; 1 year, 1-4 module)Rus
Courses (2019/2020)
- Calculus (Bachelor’s programme; Faculty of Mathematics; 2 year, 1-4 module)Rus
- Discrete Mathematics (Bachelor’s programme; Faculty of Mathematics; 1 year, 1, 4 module)Rus
- Geometry (Bachelor’s programme; Faculty of Mathematics; 1 year, 1-4 module)Rus
- Research Seminar "Elementary Introduction to Quantum Field Theory" (Optional course (faculty); Faculty of Mathematics; 1, 2 module)Eng
- Research Seminar "Mathematics Practical Training" (Bachelor’s programme; Faculty of Mathematics; 1 year, 1-4 module)Rus
Conferences
- 2016Математика, теоретическая физика и науки о данных 2016 (Москва). Presentation: Surfaces containing two circles through each point
- КОНФЕРЕНЦИЯ ПО ВОПРОСАМ ДОПОЛНИТЕЛЬНОГО ОБРАЗОВАНИЯ ОДАРЁННЫХ ШКОЛЬНИКОВ (Киров). Presentation: Летние конференции Турнира городов
- 2014
Embedded Graphs (Сантк-Петербург). Presentation: Discrete complex analysis: convergence results
Publications21
- Article Skopenkov M., Ustinov A. Feynman checkers: lattice quantum field theory with real time // Analysis and Mathematical Physics. 2024. Vol. 14. Article 38. doi
- Article Skopenkov M. Discrete Field Theory: Symmetries and Conservation Laws // Mathematical Physics Analysis and Geometry. 2023. Vol. 26. Article 19. doi
- Book Mathematics via Problems: Part 3: Combinatorics / Пер. с рус.; сост.: M. Skopenkov, A. A. Zaslavsky. Part 3: Combinatorics. Providence : AMS, 2023.
- Preprint Скопенков М. Б., Устинов А. В. Feynman checkers: Minkowskian lattice quantum field theory / Cornell University. Серия arXiv "math". 2022. doi
- Article М. Б. Скопенков, А. В. Устинов Шашки Фейнмана: к алгоритмической квантовой теории // Успехи математических наук. 2022. Т. 77. № 3(465). С. 73-160. doi
- Book Zaslavsky A., Skopenkov M. Mathematics via problems: Part 2: Geometry / Пер. с рус. Part 2: Geometry. Providence, Rhode Island and Berkley, California: American Mathematical Society and Mathematical Sciences Research Institute , 2021.
- Article Skopenkov M., Bo P., Bartoň M., Pottmann H. Characterizing envelopes of moving rotational cones and applications in CNC machining // Computer Aided Geometric Design. 2020. Vol. 83. P. 101944. doi
- Article Skopenkov M., Krasauskas R. Surfaces containing two circles through each point // Mathematische Annalen. 2019. Vol. 373. No. 3-4. P. 1299-1327. doi
- Book Элементы математики в задачах: через олимпиады и кружки—к профессии / Под общ. ред.: А. А. Заславский, А. Б. Скопенков, М. Б. Скопенков. М. : МЦНМО, 2018.
- Article Пахарев А. А., Скопенков М.Б. Поверхности, на которых через каждую точку проходят две окружности, и разложение кватернионных матриц // Успехи математических наук. 2017. Т. 72. № 2. С. 195-196. doi
- Article Mikhail Skopenkov, Bobenko A. Discrete Riemann surfaces: linear discretization and its convergence // Journal fuer die reine und angewandte Mathematik. 2016. Vol. 2016. No. 270. P. 217-250. doi
- Article Skopenkov M. When is the set of embeddings finite up to isotopy? // International Journal of Mathematics. 2015. Vol. 26. No. 7, Article number 1550051. P. 1-28. doi
- Article Скопенков М. Б., Малиновская О. А., Дориченко С. А. Собери квадрат // Квант. 2015. № 2. С. 6-11.
- Article Crowley D., Ferry S., Skopenkov M. The rational classification of links in codimension >2 // Forum Mathematicum. 2014. Vol. 26. No. 1. P. 239-269.
- Article Пахарев А. А., Устинов А. В., Скопенков М. Б. Сквозь сеть сопротивлений // Математическое просвещение. 2014. Т. 18. С. 33-65.
- Article Nilov F., Mikhail Skopenkov. A surface containing a line and a circle through each point is a quadric // Geometriae Dedicata. 2013. Vol. 163. No. 1. P. 301-310.
- Article M. Skopenkov. The boundary value problem for discrete analytic functions // Advances in Mathematics. 2013. Vol. 240. P. 61-87.
- Article Cencelj M., Repovs D., Mikhail Skopenkov. Classification of knotted tori in 2-metastable dimension / Пер. с рус. // Sbornik Mathematics. 2012. Vol. 203. No. 11. P. 1654-1681.
- Article Pottmann H., Shi L., Mikhail Skopenkov. Darboux cyclides and webs from circles // Computer Aided Geometric Design. 2012. Vol. 29. No. 1. P. 77-97.
- Article Mikhail Skopenkov, Pottmann H., Grohs P. Ruled Laguerre minimal surfaces // Mathematische Zeitschrift. 2012. Vol. 272. P. 645-674.
- Article Скопенков М, Смыкалов В., Устинов А. В. Случайные блуждания и электрические цепи // Математическое просвещение. 2012. Т. 16. С. 25-47.