Carriers of continuous measures in a Hilbertian norm

Yasuo Umemura
1965 Publications of the Research Institute for Mathematical Sciences  
From the standpoint of the theory of measures on the dual space of a nuclear space, we discuss the carrier of Wiener measure, regarding it as a measure on (3)') ( = Schwartz's space of distributions). This may be contrasted with the usual treatment which regards it as a measure on the space of paths. It is shown that for a>-=-9 integral operator I a is nuclear on £
doi:10.2977/prims/1195196434 fatcat:aviurmxg5bfr7g27tlpibctxu4