In measure theory, a radonifying function (ultimately named after Johann Radon) between measurable spaces is one that takes a cylinder set measure (CSM)...
3 KB (430 words) - 04:50, 2 February 2023
known as strong convergence, as contrasted with weak convergence. Radonifying function Vague topology Folland 1999, p. 212 Bourbaki 2004a Bogachev 2007...
20 KB (2,777 words) - 00:15, 23 March 2025
not γ-radonifying. Let G and H be two Hilbert spaces and let T : G → H be a bounded operator from G to H. Recall that T is said to be γ-radonifying if the...
2 KB (308 words) - 11:10, 18 January 2025
to make use of the so-called Radon–Riesz property. Radon spaces Radonifying function Brigitte Bukovics: Biography of Johann Radon, in: 75 Years of Radon...
6 KB (568 words) - 01:26, 21 October 2024
construction relating to infinite-dimensional spaces Cylindrical σ-algebra Radonifying function Structure theorem for Gaussian measures – Mathematical theorem Bogachev...
14 KB (2,188 words) - 21:43, 11 June 2025
which gives a well-defined meaning to objects such as the Dirac delta function. He was awarded the Fields Medal in 1950 for his work on the theory of...
17 KB (2,004 words) - 04:38, 1 January 2025
{\displaystyle T:E\to G} is called a ( q , p ) {\displaystyle (q,p)} -radonifying operator, if for a cylindrical measure μ {\displaystyle \mu } of order...
11 KB (1,622 words) - 16:44, 25 June 2025