Zvanje: | naslovni docent |
Funkcija: | izvanredni profesor u polju matematika (u zvanju znanstvenog savjetnika, matematika i znanstvenog suradnika, fizika) |
E-mail: | |
Osobna stranica na Webu: | https://ncatlab.org/zoranskoda/show/career+page |
Zavod/služba: | Fizički odsjek |
Godina diplomiranja: | 1993. |
Godina magistriranja: | 1998. |
Godina doktoriranja: | 2002. |
Napomena: Ove radove održava Knjižnica Instituta Ruđer Bošković koja vodi projekt Hrvatske znanstvene bibliografije CROSBI. Ovim linkom možete vidjeti sve podatke o radovima koje su autori unijeli u bazu podataka.
1. Localizations for construction of quantum coset spaces, in “Noncommutative geometry and Quantum groups”, W.Pusz, P.M. Hajac, eds. Banach Center Publications 61, 265–298, Warszawa 2003, math.QA/0301090
2. Coherent states for Hopf algebras, Letters in Mathematical Physics 81, N.1, pp. 1-17, July 2007. (earlier arXiv version: math.QA/0303357).
3. Every quantum minor generates an Ore set, International Math. Res. Notices 2008, rnn063-8; pdf math.QA/0604610
4. Some equivariant constructions in noncommutative algebraic geometry, Georgian Mathematical Journal 16 (2009), No. 1, 183–202, arXiv:0811.4770
5. N. Durov, S. Meljanac, A. Samsarov, Z. Škoda, A universal formula for representing Lie algebra generators as formal power series with coefficients in the Weyl algebra, Journal of Algebra 309:1, 318-359 (2007) math.RT/0604096, MPIM2006-62
6. S. Meljanac, Z. Škoda, M. Stojić, Lie algebra type noncommutative phase spaces are Hopf algebroids, Lett. Math. Phys. 107:3, 475–503 (2017) arXiv:1409.8188
7. S. Meljanac, Z. Škoda, Hopf algebroid twists for deformation quantization of linear Poisson structures, SIGMA 14 (2018) 026; 23 pages arxiv/1605.01376
8. Noncommutative localization in noncommutative geometry, London Math. Society Lecture Note Series 330, ed. A. Ranicki; pp. 220–313, math.QA/0403276