UNIVERSITY
OF WROCŁAW
 
Main Page
Contents
Online First
General Information
Instructions for authors


VOLUMES
43.1 42.2 42.1 41.2 41.1 40.2 40.1
39.2 39.1 38.2 38.1 37.2 37.1 36.2
36.1 35.2 35.1 34.2 34.1 33.2 33.1
32.2 32.1 31.2 31.1 30.2 30.1 29.2
29.1 28.2 28.1 27.2 27.1 26.2 26.1
25.2 25.1 24.2 24.1 23.2 23.1 22.2
22.1 21.2 21.1 20.2 20.1 19.2 19.1
18.2 18.1 17.2 17.1 16.2 16.1 15
14.2 14.1 13.2 13.1 12.2 12.1 11.2
11.1 10.2 10.1 9.2 9.1 8 7.2
7.1 6.2 6.1 5.2 5.1 4.2 4.1
3.2 3.1 2.2 2.1 1.2 1.1
 
 
WROCŁAW UNIVERSITY
OF SCIENCE AND
TECHNOLOGY

Contents of PMS, Vol. 34, Fasc. 2,
pages 279 - 291
 

BARGMANN MEASURES FOR t -DEFORMED PROBABILITY

Anna Dorota Krystek
Łukasz Jan Wojakowski

Abstract: It is shown that the Bargmann representation of a t -deformed probability measure can be obtained by taking away some t -dependent amount of mass at zero of the Bargmann representation of the original measure and scaling of the remaining part. This allows us to formulate conditions on existence of the Bargmann representation of a t -deformed probability measure and to study some prominent examples.

2000 AMS Mathematics Subject Classification: Primary: 30E10; Secondary: 60E10.

Keywords and phrases: Bargmann representation, deformation, complex moment problem.

Download:    Abstract    Full text   Abstract + References