Statistical study of nanosecond electric breakdowns in n-hexane

Methods for analyzing statistical distributions of the breakdown delay time are generalized. A statistical approach is used to study electric breakdown in n-hexane in a 2.1-MV/cm quasi-uniform electric field at a pulse duration of ∼5×10⁻⁸ s. Two different mechanisms for the anode breakdown are shown to coexist and compete with each other. One of them incorporates the “bubble” stage, whereas the other one is related to ionization in the liquid itself. It is found that the weaker influence of the external pressure on the pulsed electric strength of liquids in the nanosecond range is caused by a transition to the ionization mechanism for the anode breakdown at elevated pressures.     

Measures with values in topological groups

This paper is devoted to the study of properties of vector-valued measures defined on a-ring, with values in a topological group. In particular, a necessary and sufficient condition is established in order that the pointwise B-boundedness of a sequence of vector-valued measures on the elements of a ring should imply the uniform B-boundedness of the sequence on the generated-ring.Translated from Matematicheskie Zametki, Vol. 17, No. 5, pp. 789–796, May, 1975.     

A Nikodym theorem for triangular set functions

Siberian Mathematical Journal -     

Uniform Continuity of a Family of Weakly Regular Set Functions on Topological Spaces

Conditions for the uniform continuity of a family of weakly regular set functions defined on an algebra of subsets of a -topological space (T,) and taking values in an arbitrary topological space are found.     

On the Pointwise Limit of Vector Charges with the Saks Property

The well-known theorem about the density of the space of probability charges with the Saks property in the space of all probability charges in the pointwise topology is proved in the vector case. New features are the uniform Saks property for the family of charges and sufficient conditions for the pointwise limit of a sequence of charges to have the Saks property.     

Condition for a regular set function in a topological space to be exhaustive

Translated from Matematicheskie Zametki, Vol. 50, No. 5, pp. 43–47, November, 1991.     

Convergence of a sequence of weakly regular set functions

The present paper is devoted to generalizations of the Dieudonné theorem claiming that the convergence of sequences of regular Borelian measures is preserved under the passage from a system of open subsets of a compact metric space to the class of all Borelian subsets of this space. The Dieudonné theorem is proved in the case for which the set functions are weakly regular, nonadditive, defined on an algebra of sets that contains the class of open subsets of an arbitrary σ-topological space, and take values in a uniform space. Translated fromMatematicheskie Zametki, Vol. 62, No. 1, pp. 103–110, July, 1997. Translated by O. V. Sipacheva