Book
M.Crainic, R.L.Fernandes, I.Mărcuț, Lectures on Poisson Geometry, Graduate Studies in Mathematics, 217. American Mathematical Society, Providence, RI, 2021, pp. 479, ISBN: 978–1–4704–6430–1.
Preprints
I.Mărcuț, A.Schüßler, The Serre spectral sequence of a Lie subalgebroid, arxiv:2405.00419.
I.Mărcuț, F.Zeiser, The Poisson linearization problem for sl(2,C). Part II: The Nash-Moser method, arXiv:2212.07520.
I.Mărcuț, F.Zeiser, The Poisson linearization problem for sl(2,C). Part I: Poisson cohomology, arXiv:2212.07512.
Published papers
G.R.Cavalcanti, I.Mărcuț, Poisson structures with compact support, International Mathematics Research Notices. IMRN (to appear), arXiv:2209.14016.
R.L.Fernandes, I.Mărcuț, Poisson geometry around Poisson submanifolds, Journal of the European Mathematical Society (to appear), arXiv:2205.11457.
P.Frejlich, I.Mărcuț, Normal forms for principal Poisson Hamiltonian spaces, Indagationes Mathematicae (N.S.) 35 (2024), no. 2, 288–316, arXiv:2302.02062.
R.L.Fernandes, I.Mărcuț, Multiplicative Ehresmann connections, Advances in Mathematics 427 (2023), Paper No. 109124, arXiv:2204.08507.
I.Mărcuț, F.Zeiser, The Poisson cohomology of sl(2,R), Journal of Symplectic Geometry 21 (2023), no. 3, 603–652, arXiv:1911.11732.
A.Cabrera, I.Mărcuț, M.A.Salazar, Local formulas for multiplicative forms, Transformation Groups 27 (2022), no. 2, 371–401, arXiv:1809.01546.
D.Joksimović, I.Mărcuț, Non-degeneracy of the Hofer norm for Poisson structures, Journal of Symplectic Geometry 19 (2021), no. 5, 1095–1100, arXiv:1809.10722.
I.Mărcuț, Poisson structures whose Poisson diffeomorphism group is not locally path-connected, Annales Henri Lebesgue 4 (2021), 1521–1529, arXiv:2001.00644.
P.Frejlich, I.Mărcuț, The homology class of a Poisson transversal, International Mathematics Research Notices. IMRN (2020), no. 10, 2952–2976, arXiv:1704.04724.
A.Cabrera, I.Mărcuț, M.A.Salazar, On local integration of Lie brackets, Journal für die Reine und Angewandte Mathematik 760 (2020), 267–293, arXiv:1703.04411.
P.Frejlich, I.Mărcuț, On dual pairs in Dirac geometry, Mathematische Zeitschrift 289 (2018), no. 1-2, 171–200, arXiv:1602.02700.
P.Frejlich, I.Mărcuț, Normal forms for Poisson maps and symplectic groupoids around Poisson transversals, Letters in Mathematical Physics 108 (2018), no. 3, 711–735, arXiv:1508.05670.
P.Frejlich, I.Mărcuț, The normal form theorem around Poisson transversals, Pacific Journal of Mathematics 287 (2017), no. 2, 371–391, arXiv:1306.6055.
M.Crainic, I.Mărcuț, Reeb-Thurston stability for symplectic foliations, Mathematische Annalen 363 (2015), no. 1-2, 217–235, arXiv:1307.4363.
I.Mărcuț, B.Osorno Torres, Deformations of log-symplectic structures, Journal London Mathematical Society (2) 90 (2014), no. 1, 197–212, arXiv:1307.3277.
I.Mărcuț, B.Osorno Torres, On cohomological obstructions for log-symplectic structures, Journal of Symplectic Geometry 12 (2014), no. 4, 863–866, arXiv:1303.6246.
I.Mărcuț, Deformations of the Lie-Poisson sphere of a compact semisimple Lie algebra, Compositio Mathematica 150 (2014), no. 4, 568–578, arXiv:1208.2298.
I.Mărcuț, Rigidity around Poisson submanifolds, Acta Mathematica 213 (2014), no. 1, 137–198, arXiv:1208.2297.
I.Mărcuț, Formal equivalence of Poisson structures around Poisson submanifolds, Pacific Journal of Mathematics 255 (2012), no. 2, 439–461, arXiv:1011.5998.
M.Crainic, I.Mărcuț, A normal form theorem around symplectic leaves, Journal of Differential Geometry 92 (2012), no. 3, 417–461, arXiv:1009.2090.
M.Crainic, I.Mărcuț, On the existence of symplectic realizations, Journal of Symplectic Geometry 9 (2011), no. 4, 435–444, arXiv:1009.2085.
PhD thesis
Normal forms in Poisson Geometry, PhD thesis, 2013, Utrecht University, The Netherlands, arXiv:1301.4571.