Eftekharinasab Kaveh
Publications
1. A Multiplicity Theorem for Fréchet Spaces, Reports of the Academy of Sciences of Ukraine, No. 5 (2022), 10-15. https://doi.org/10.15407/dopovidi2022.05.010.
2. Some critical point results for Fréchet manifolds, Poincare Journal of Analysis and Applications, Vol. 9, No. 1, (2022), 21-30.
3. A version of the Hadamard-Lévy Theorem for Fréchet spaces, Comptes rendus de l’Académie bulgare des Sciences, Vol.75, No. 8, (2022), 1099-1104.
4. Some applications of transversality for infinite dimensional manifolds, Proceedings of the International Geometry Center, Vol. 14, No. 21, (2021), 137-153.
doi = https://doi.org/10.15673/tmgc.v14i2.1939
5. A Lusternik-Schnirelmann Type Theorem for C 1 -Fréchet manifolds, The Journal of the Indian Mathematical Society, Vol. 88, No. 3-4, (2021), 309-322.
doi = 10.18311/jims/2021/27836 (with I. Lastivka)
6. Finslerian geodesics on Fréchet manifolds, Bulletin of the Transilvania University of Brasov, Series III: Mathematics, Informatics, Physics, Vol. 13, No. 1, (2020), 129-152.
doi = https://doi.org/10.31926/but.mif.2020.13.62.1.11 (with V. Petrusenko)
7. A Global Diffeomorphism Theorem for Fréchet spaces, Journal of Mathematical Sciences, Vol. 247, No. 2, (2020), 276-290. DOI = 10.1007/s10958-020-04802-4,
8. On the existence of a global diffeomorphism between Fréchet spaces, Methods of Functional Analysis and Topology, Vol. 26, No. 1, (2020), 68-75.
DOI = 10.31392/MFAT-npu26_1.2020.05.
9. On the generalization of the Darboux theorem, Proceedings of the International Geometry Center, Vol. 12 No. 2, (2019), 1-10. doi= 10.15673/tmgc.v12i2.1436
10. A simple proof of the short time existence and uniqueness for Ricci flow, Comptes rendus de l’Académie bulgare des Sciences, Vol.72, No. 5, (2019), 569-572. doi= 10.7546/crabs.2019.05.01
11. On applications of measure of noncompactness in Fréchet spaces, Proceedings of the National Aviation University, Vol. 79, No. 2, (2019), 71-75. doi= 10.18372/2306-1472.79.13834
(with I. Klyus)
12. A generalized Palais-Smale condition in the Frechet space setting, Proceedings of the Geom.Center, Vol. 11, No. 1, (2018), 1-11. doi= 10.15673/tmgc.v11i1.915
13. Fréchet Lie Algebroid and their cohomologies, Arm. Math. J. Vol. 8, No. 1, (2016), 77-85.
14. Trnasversality and Lipshitz-Fredholm operators, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 12, No. 6, (2015), 89-104
15. The Morse-Sard-Brown Theorem for Functionals on Bounded-Fréchet-Finsler manifolds, Communications in Mathematics, Vol. 23, No. 2, (2015), 101-112
16. Geometry of Bounded Fréchet manifolds, Rocky Mountain Journal of Mathematics, Vol.46, No. 3, (2016), 895-913. doi= 10.1216/rmj-2016-46-3-895
17. A note on Gaussian curvature of harmonic surfaces, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 7, No. 4, (2010), 146-152, Zbl: 1234.53003.e
18. Sard’s theorem for mapping between Fréchet manifolds, Ukrainian Mathematical Journal, Vol. 64, No 12, (2010), 1634 –1641. doi= 10.1007/s11253-011-0478-z
19. Curvature forms and Curvature functions for 2-manifolds with boundary, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 6, No. 2, (2009) 484-488, zbl: 1199.57009.
2. Some critical point results for Fréchet manifolds, Poincare Journal of Analysis and Applications, Vol. 9, No. 1, (2022), 21-30.
3. A version of the Hadamard-Lévy Theorem for Fréchet spaces, Comptes rendus de l’Académie bulgare des Sciences, Vol.75, No. 8, (2022), 1099-1104.
4. Some applications of transversality for infinite dimensional manifolds, Proceedings of the International Geometry Center, Vol. 14, No. 21, (2021), 137-153.
doi = https://doi.org/10.15673/tmgc.v14i2.1939
5. A Lusternik-Schnirelmann Type Theorem for C 1 -Fréchet manifolds, The Journal of the Indian Mathematical Society, Vol. 88, No. 3-4, (2021), 309-322.
doi = 10.18311/jims/2021/27836 (with I. Lastivka)
6. Finslerian geodesics on Fréchet manifolds, Bulletin of the Transilvania University of Brasov, Series III: Mathematics, Informatics, Physics, Vol. 13, No. 1, (2020), 129-152.
doi = https://doi.org/10.31926/but.mif.2020.13.62.1.11 (with V. Petrusenko)
7. A Global Diffeomorphism Theorem for Fréchet spaces, Journal of Mathematical Sciences, Vol. 247, No. 2, (2020), 276-290. DOI = 10.1007/s10958-020-04802-4,
8. On the existence of a global diffeomorphism between Fréchet spaces, Methods of Functional Analysis and Topology, Vol. 26, No. 1, (2020), 68-75.
DOI = 10.31392/MFAT-npu26_1.2020.05.
9. On the generalization of the Darboux theorem, Proceedings of the International Geometry Center, Vol. 12 No. 2, (2019), 1-10. doi= 10.15673/tmgc.v12i2.1436
10. A simple proof of the short time existence and uniqueness for Ricci flow, Comptes rendus de l’Académie bulgare des Sciences, Vol.72, No. 5, (2019), 569-572. doi= 10.7546/crabs.2019.05.01
11. On applications of measure of noncompactness in Fréchet spaces, Proceedings of the National Aviation University, Vol. 79, No. 2, (2019), 71-75. doi= 10.18372/2306-1472.79.13834
(with I. Klyus)
12. A generalized Palais-Smale condition in the Frechet space setting, Proceedings of the Geom.Center, Vol. 11, No. 1, (2018), 1-11. doi= 10.15673/tmgc.v11i1.915
13. Fréchet Lie Algebroid and their cohomologies, Arm. Math. J. Vol. 8, No. 1, (2016), 77-85.
14. Trnasversality and Lipshitz-Fredholm operators, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 12, No. 6, (2015), 89-104
15. The Morse-Sard-Brown Theorem for Functionals on Bounded-Fréchet-Finsler manifolds, Communications in Mathematics, Vol. 23, No. 2, (2015), 101-112
16. Geometry of Bounded Fréchet manifolds, Rocky Mountain Journal of Mathematics, Vol.46, No. 3, (2016), 895-913. doi= 10.1216/rmj-2016-46-3-895
17. A note on Gaussian curvature of harmonic surfaces, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 7, No. 4, (2010), 146-152, Zbl: 1234.53003.e
18. Sard’s theorem for mapping between Fréchet manifolds, Ukrainian Mathematical Journal, Vol. 64, No 12, (2010), 1634 –1641. doi= 10.1007/s11253-011-0478-z
19. Curvature forms and Curvature functions for 2-manifolds with boundary, Transactions of Institute of Mathematics of NAS of Ukraine, Vol. 6, No. 2, (2009) 484-488, zbl: 1199.57009.