Measure Theory, Oberwolfach 1981

Inhaltsverzeichnis

• Tight set functions and essential measure.
• Some new results on measure extension.
• On pointwise-compact sets of measurable functions.
• On a generalization of the Ionescu Tulcea construction of a measure by transition kernels.
• Measure-fine uniform spaces II.
• The regularity of borel measures.
• Symmetric ?-fields of sets and universal null sets.
• On simultaneous preimage measures on Hausdorff spaces.
• The outer regularization of finitely-additive measures over normal topological spaces.
• Realization of maps.
• A survey of homeomorphic measures.
• Measurable and continuous linear functionals on spaces of uniformly continuous functions.
• Disintegration of a measure with respect to a correspondence.
• Strong liftings for certain classes of compact spaces.
• Liftings and Daniell integrals.
• Essential variations.
• Differentiation of measures on Hilbert spaces.
• A non-commutative Pettis theorem.
• Weak compactness criteria in function spaces over a locally compact group.
• A general system of polar coordinates with applications.
• Bilinear maps from C(X)×M(X) to M(X).
• Diagonal measure of a positive definite bimeasure.
• The conical measure associated with a commutative C*-algebra.
• The retraction property, CCC property, and Dunford-Pettis-Phillips property for Banach spaces.
• Some remarks about the definition of an Orlicz space.
• Orthogonally scattered dilation of Hilbert space valued set functions.
• Extension of a tight set function with values in a uniform semigroup.
• On the space of lattice semigroup-valued set functions.
• Domination problem for vector measures and applications to nonstationary processes.
• Gaussian plane and spherical means in separable Hilbert spaces.
• A Kuratowski approach to Wiener measure.
• A superadditive version of Brunel's maximal ergodic lemma.
• On sub-and superpramarts with values in a banach lattice.
• Ergodic theory on homogeneous measure algebras.
• Slicing measures and capacities by planes.
• Problem section.
• Measurable selections and measure-additive coverings.
• “Some comments on the maximal inequality in martingale theory” in Measure Theory, Oberwolfach 1979.