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Comparison principle for parabolic equations in the Heisenberg group.

Bieske, Thomas (2005)

Electronic Journal of Differential Equations (EJDE) [electronic only]

Compatibility of the theta correspondence with the Whittaker functors

Vincent Lafforgue, Sergey Lysenko (2011)

Bulletin de la Société Mathématique de France

We prove that the global geometric theta-lifting functor for the dual pair $(H, G)$ is compatible with the Whittaker functors, where $(H, G)$ is one of the pairs $({S 𝕆}_{2 n}, {𝕊 p}_{2 n})$ , $({𝕊 p}_{2 n}, {S 𝕆}_{2 n + 2})$ or $({𝔾 L}_{n}, {𝔾 L}_{n + 1})$ . That is, the composition of the theta-lifting functor from $H$ to $G$ with the Whittaker functor for $G$ is isomorphic to the Whittaker functor for $H$ .

Compensated compactness and the Heisenberg group.

Loukas Grafakos, Richard Rochberg (1995)

Mathematische Annalen

Complemented ideals of group algebras

Andrew Kepert (1994)

Studia Mathematica

The existence of a projection onto an ideal I of a commutative group algebra $L^{1} (G)$ depends on its hull Z(I) ⊆ Ĝ. Existing methods for constructing a projection onto I rely on a decomposition of Z(I) into simpler hulls, which are then reassembled one at a time, resulting in a chain of projections which can be composed to give a projection onto I. These methods are refined and examples are constructed to show that this approach does not work in general. Some answers are also given to previously asked...

We present an example of a complete $ℵ_{0}$ -bounded topological group $H$ which is not $ℝ$ -factorizable. In addition, every $G_{δ}$ -set in the group $H$ is open, but $H$ is not Lindelöf.

Currently displaying 641 – 660 of 3843

Previous Page 33 Next

Displaying 641 – 660 of 3843

Comparison principle for parabolic equations in the Heisenberg group.

Compatibility of the theta correspondence with the Whittaker functors

Compensated compactness and the Heisenberg group.

Complemented ideals of group algebras

Complemented *-primitive Ideals in L1-algebras of Exponential Lie Groups and of Motion Groups.

Complemented Subspaces of L... (G), Ideals of L... (G) and Amenability.

Complemented topologies on abelian groups.

Compléments à l'article «Groupes réductifs»

Complements in the lattice of all topologies of topological groups

Complete $ℵ_{0}$ -bounded groups need not be $ℝ$ -factorizable

Complete distributivity and $α$ -convergence

Complete Homogeneous Riemannian Manifolds of Negative Sectional Curvature.

Completely bounded multipliers of the Fourier algebra of a simple Lie group of real rank one.

Completely prime ideals and idempotents in mobs

Completeness of sequential convergence groups

Completing Lie algebra actions to Lie group actions.

Complex analytic geometry of complex parallelizable manifolds

Complex geometry and the asymptotics of Harish-Chandra modules for real reductive Lie groups II.

Complex structure contained in classical groups.

Complex structure on the smooth dual of $G L (n)$ .

Currently displaying 641 – 660 of 3843