The following pages link to Daniel Beltiţă (Q173493):
Displaying 50 items.
- Real solvable algebraically rigid Lie algebras (Q2463450) (← links)
- Cohomogeneity two actions on flat Riemannian manifolds (Q2463798) (← links)
- Regge and Okamoto symmetries (Q2466821) (← links)
- Some properties of Dirac-Nijenhuis manifolds (Q2467646) (← links)
- Energy-momentum tensor on foliations (Q2469961) (← links)
- Circle and torus actions on equal symplectic blow-ups of \(\mathbb {CP}^2\) (Q2474590) (← links)
- On quasi-filiform Lie algebras admitting a torus of derivations (Q2476187) (← links)
- Conformal geometry of foliations (Q2481357) (← links)
- Singular cotangent bundle reduction \& spin Calogero-Moser systems (Q2482649) (← links)
- Schrödinger equation and the oscillatory semigroup for the Hermite operator (Q2484254) (← links)
- Mirror symmetry and generalized complex manifolds. I: The transform on vector bundles, spinors, and branes (Q2489562) (← links)
- The symplectic vortex equations and invariants of Hamiltonian group actions (Q2491043) (← links)
- Localization for the norm-square of the moment map and the two-dimensional Yang-Mills integral (Q2491050) (← links)
- On the Kashiwara-Vergne conjecture (Q2494168) (← links)
- On almost complex structures with Norden metrics on tangent bundles (Q2495705) (← links)
- The Ehresmann connection for foliations with singularities and the global stability of leaves (Q2501647) (← links)
- Cohomology of the Brylinski double complex of Poisson manifolds and quantum de Rham cohomology (Q2501650) (← links)
- Divergent sequences of function groups (Q2519051) (← links)
- Pointwise functional calculi (Q2563441) (← links)
- Integrability of analytic almost complex structures on Banach manifolds (Q2570838) (← links)
- Symplectic leaves in real Banach Lie-Poisson spaces (Q2571742) (← links)
- Flat translation invariant surfaces in the 3-dimensional Heisenberg group (Q2573755) (← links)
- Relative modular classes of Lie algebroids (Q2573980) (← links)
- Grassmann geometry on the 3-dimensional Heisenberg group (Q2574438) (← links)
- A splitting result for compact symplectic manifolds. (Q2581106) (← links)
- Moment maps, symplectomorphism groups and compatible complex structures (Q2642406) (← links)
- The diffusion geometry of fibre bundles: horizontal diffusion maps (Q2659718) (← links)
- Traces of \(C^\ast \)-algebras of connected solvable groups (Q2661285) (← links)
- Transference for Banach space representations of nilpotent Lie groups. II. Pedersen multipliers (Q2665615) (← links)
- Unitary group orbits versus groupoid orbits of normal operators (Q2682376) (← links)
- On stably finiteness for \(C^*\)-algebras of exponential solvable Lie groups (Q2697545) (← links)
- Effective computation of algebra of derivations of Lie algebras (Q2702003) (← links)
- Characteristically nilpotent Lie algebras (Q2702158) (← links)
- Diagonalization of certain block operator matrices and applications to Dirac operators (Q2702468) (← links)
- Wold-type decompositions and wandering subspaces for operators close to isometries (Q2703581) (← links)
- Analytic joint spectral radius in a solvable Lie algebra of operators (Q2717553) (← links)
- Quasi-constricted linear operators on Banach spaces (Q2717554) (← links)
- Some problems about nilpotent Lie algebras (Q2738445) (← links)
- ON 2-ABELIAN (n – 5)-FILIFORM LIE ALGEBRAS (Q2747141) (← links)
- SUR UNE CLASSE D'ALGEBRES DE LIE DE DIMENSION INFINIE (Q2749088) (← links)
- On the structure of spherical contractions (Q2754625) (← links)
- (Q2754626) (← links)
- (Q2754633) (← links)
- (Q2754635) (← links)
- Applications of Banach space theory to sectorial operators (Q2760119) (← links)
- Mathematica and nilpotent Lie superalgebras (Q2760196) (← links)
- Low-dimensional quasi-filiform Lie algebras with great length (Q2760213) (← links)
- A sufficient condition for the hyponormality of \(z\)-Cesàro operators (Q2762821) (← links)
- Derivations on prime rings and Banach algebras (Q2770336) (← links)
- Spectra of the difference, sum and product of idempotents (Q2773387) (← links)
