The Almost Periodic Measures on a Compact Abelian Group.
The amalgamation basis of the category of compact groups.
The asymptotic behavior of holomorphic representations
The Aubert involution and R-groups
The automorphism group of the Lebesgue measure has no non-trivial subgroups of index
We show that the automorphism group Aut([0,1],λ) of the Lebesgue measure has no non-trivial subgroups of index .
The Baire Set Fixing Property and Uniform Continuity in Topological Groups.
The Baire Set Fixing Property in Topological Groups.
The bicommutator of the injective hull of a nonsingular semigroup.
The Bohr compactification, modulo a metrizable subgroup
The authors prove the following result, which generalizes a well-known theorem of I. Glicksberg [G]: If G is a locally compact Abelian group with Bohr compactification bG, and if N is a closed metrizable subgroup of bG, then every A ⊆ G satisfies: A·(N ∩ G) is compact in G if and only if {aN:a ∈ A} is compact in bG/N. Examples are given to show: (a) the asserted equivalence can fail in the absence of the metrizability hypothesis, even when N ∩ G = {1}; (b) the asserted equivalence can hold for suitable...
The Bohr compactification of a dense ideal in a topological semigroup.
The Burnside Ring of a Compact Lie Group. I.
The Burnside Ring of a Cyclic Extension of a Torus.
The Campbell-Hausdorff Formula and Invariant Hyperfunctions.
The CAP representations of GSp (4, ...).
The Capelli identity and unitary representations
The Cauchy extension of an ordered abelian group realized by -valuations
The Cauchy Harish-Chandra Integral, for the pair
For the dual pair considered, the Cauchy Harish-Chandra Integral, as a distribution on the Lie algebra, is the limit of the holomorphic extension of the reciprocal of the determinant. We compute that limit explicitly in terms of the Harish-Chandra orbital integrals.
The centralizing theorem for left normal groups of units in compact monoids.
The characteristic cycles of holonomic systems on a flag manifold.
The Characters of Discrete Series as Orbital Integrals.