Îñâ³òà: Ëüâ³âñüêèé äåðæàâíèé óí³âåðñèòåò iìåí³ ²âàíà Ôðàíêà (ñïåö³àëüí³ñòü - ìàòåìàòèêà, 1995 ð.), àñï³ðàíòóðà Ëüâ³âñüêîãî äåðæàâíîãî óí³âåðñèòåòó iìåí³ ²âàíà Ôðàíêà (1995–1998 ð.)

Ïîñàäà: Ïðîâ³äíèé ìàòåìàòèê

Îáëàñòü íàóêîâèõ ³íòåðåñ³â:

• Ãåîìåòð³ÿ áàíàõîâèõ ïðîñòîð³â
• Õàðàêòåðèçàö³ÿ ðåôëåêñèâíîñò³
• Îïåðàòîðè ïðîäîâæåííÿ ôóíêö³é òà ìåòðèê

Îñíîâí³ ïóáëiêàöi¿:

1. Banakh, I., Banakh, T., Kolinko, M., & Ravsky, A. Metric characterizations of some subsets of the real line. Matematychni Studii, 59(2), 2023, 205-214. https://doi.org/10.30970/ms.59.2.205-214
2. Banakh I., Banakh T., On the asymptotic dimension of products of coarse spaces // Topology and its Applications, Volume 311, 2022, https://doi.org/10.1016/j.topol.2021.107953.
3. T. Banakh, I. Banakh, E. Jablonska, Products of K-analytic sets in locally compact groups and Kuczma–Ger classes Axioms 2022, 11(2), 65; https://doi.org/10.3390/axioms11020065
4. I. Banakh, T. Banakh, O. Hryniv, Ya. Stelmakh, The connected countable spaces of Bing and Ritter are topologically homogeneous, Topology Proc. 57 (2021), 149–158,\\ http://topology.nipissingu.ca/tp/reprints/v57/.
5. I. Banakh, T. Banakh, S. Bardyla, A semigroup is finite if and only if it is chain-finite and antichain-finite, Axioms 10:1 (2021) 9 p., https://doi.org/10.3390/axioms10010009/.
6. I. Banakh, T. Banakh, J. Garbulinska-W?grzyn, The completion of the hyperspace of finite subsets, endowed with the $\ell^1$-metric Colloquium Mathematicum 166 (2021), DOI: 10.4064/cm8226-11-2020
7. I. Banakh, T. Banakh, The continuity of Darboux injections between manifolds, Topology Appl. 275 (2020), 107031, https://doi.org/10.1016/j.topol.2019.107031.
8. Banakh I., Banakh T., Vovk M. An example of a non-Borel locally-connected finite-dimensional topological group // Êàðïàò. ìàò. ïóáë³êàö³¿. – 2017. – 9, ¹ 1. – P. 3–5. – https://doi.org/10.15330/cmp.9.1.3-5.
9. Áàíàõ ². ß., Áàíàõ Ò. Î. Ñèëüíî $\sigma$-ìåòðèçîâí³ ïðîñòîðè º ñóïåð $\sigma$-ìåòðèçîâíèìè // Áóêîâèí. ìàòåì. æóðíàë. – 2017. – 5, ¹ 1–2. – Ñ. 16–17. – http://bmj.fmi.org.ua/index.php/adm/article/view/229.
10. Banakh I., Banakh T., Vovk M., Trisch P. Toehold purchase problem: a comparative analysis of two strategies // Econtechmod. – 2015. – 4, No. 1. – P. 3–10.
11. Banakh I., Banakh T., Koshino K. Topological structure of non-separable sigma-locally compact convex sets // Bull. Polish Acad. Sci. Math. – 2013. – 61. – P. 149–153. doi:10.4064/ba61-2-8
12. Banakh I., Banakh T., Plichko A., Prykarpatsky A. On local convexity of nonlinear mappings between Banach spaces. – Cent. Eur. J. Math. – 2012. – 10 (6). – P. 2264–2271. doi: 10.2478/s11533-012-0101-z
13. Banakh I., Banakh T. Constructing non-compact operators into $c_0$ // Studia Math. – 2010. – 201. – P. 65-67.
14. Banakh I., Banakh T., Riss E. On r-reflexive Banach spaces // Comment. Math. Univ. Carolin. – 2009. – 50, No. 1. – P. 61-74.
15. Banakh I., Banakh T., Yamazaki K. Extenders for vector-valued functions // Studia Math. – 2009. – 191. – P. 123–150.
16. Banakh I. Ya. On Banach spaces possessing an $\epsilon$-net without weak limit points // Ìàò. ìåòîäè òà ô³ç.-ìåõ. ïîëÿ. – 2000. – 43, ¹ 3. – Ñ. 40–43.

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