Smooth homogeneous structures in operator theory D Beltita Chapman et Hall/CRC, Boca Raton, FL 137, 320, 2006 | 98 | 2006 |
The restricted Grassmannian, Banach Lie–Poisson spaces, and coadjoint orbits D Beltiţă, TS Ratiu, AB Tumpach Journal of Functional Analysis 247 (1), 138-168, 2007 | 46 | 2007 |
Lie algebras of bounded operators D Beltita, M Sabac Birkhäuser 120, 219, 2001 | 45 | 2001 |
Symplectic leaves in real Banach Lie–Poisson spaces D Beltiţă, TS Ratiu Geometric & Functional Analysis GAFA 15 (4), 753-779, 2005 | 36 | 2005 |
Modulation spaces of symbols for representations of nilpotent Lie groups I Beltiţă, D Beltiţă Journal of Fourier Analysis and Applications 17, 290-319, 2011 | 31 | 2011 |
Magnetic pseudo-differential Weyl calculus on nilpotent Lie groups I Beltiţă, D Beltiţă Annals of Global Analysis and Geometry 36, 293-322, 2009 | 28 | 2009 |
Continuity of magnetic Weyl calculus I Beltiţă, D Beltiţă Journal of Functional Analysis 260 (7), 1944-1968, 2011 | 24 | 2011 |
Fourier transforms of -algebras of nilpotent Lie groups I Beltita, D Beltita, J Ludwig International Mathematics Research Notices IMRN, 2014 | 22* | 2014 |
Geometric representation theory for unitary groups of operator algebras D Beltiţă, TS Ratiu Advances in Mathematics 208 (1), 299-317, 2007 | 22 | 2007 |
Holomorphic geometric models for representations of C∗-algebras D Beltiţă, JE Gale Journal of Functional Analysis 255 (10), 2888-2932, 2008 | 21 | 2008 |
Amenability, completely bounded projections, dynamical systems and smooth orbits D Beltiţă, B Prunaru Integral Equations and Operator Theory 57, 1-17, 2007 | 21 | 2007 |
Schur–Weyl Theory for C*‐algebras D Beltiţă, KH Neeb Mathematische Nachrichten 285 (10), 1170-1198, 2012 | 19 | 2012 |
On complex infinite-dimensional Grassmann manifolds D Beltita, JE Galé Complex Analysis and Operator Theory 3 (4), 739-758, 2009 | 19 | 2009 |
Quasidiagonality of -Algebras of Solvable Lie Groups I Beltiţă, D Beltiţă Integral Equations and Operator Theory 90 (1), 5, 2018 | 18 | 2018 |
Spectrum for a solvable Lie algebra of operators D Beltiţă Studia Mathematica 2 (135), 163-178, 1999 | 18 | 1999 |
Iwasawa decompositions of some infinite-dimensional Lie groups D Beltiţă Transactions of the American Mathematical Society 361 (12), 6613-6644, 2009 | 17 | 2009 |
Inverse-closed algebras of integral operators on locally compact groups I Beltiţă, D Beltiţă Annales Henri Poincaré 16, 1283-1306, 2015 | 15 | 2015 |
Integrability of analytic almost complex structures on Banach manifolds D Beltita Annals of Global Analysis and Geometry 28 (1), 59-73, 2005 | 15 | 2005 |
Algebras of symbols associated with the Weyl calculus for Lie group representations I Beltiţă, D Beltiţă Monatshefte für Mathematik 167, 13-33, 2012 | 14 | 2012 |
Lie theoretic significance of the measure topologies associated with a finite trace D Beltiţă Walter de Gruyter GmbH & Co. KG 22 (2), 241-253, 2010 | 14 | 2010 |