• 论文 •

### CONFORMAL RESTRICTION MEASURES ON LOOPS SURROUNDING AN INTERIOR POINT

1. 1. College of Mathematics and Statistics, Shenzhen University, Shenzhen 518060, China;
2. Institute of Mathematics, Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100190, China
• 收稿日期:2021-03-09 修回日期:2021-07-10 出版日期:2021-12-25 发布日期:2021-12-27
• 通讯作者: Yuefei WANG,E-mail:wangyf@math.ac.cn E-mail:wangyf@math.ac.cn
• 作者简介:Yong HAN,E-mail:hanyong@szu.edu.cn
• 基金资助:
The authors were supported by NSFC (11688101).

### CONFORMAL RESTRICTION MEASURES ON LOOPS SURROUNDING AN INTERIOR POINT

Yong HAN1, Yuefei WANG1,2

1. 1. College of Mathematics and Statistics, Shenzhen University, Shenzhen 518060, China;
2. Institute of Mathematics, Academy of Mathematics and Systems Sciences, Chinese Academy of Sciences, Beijing 100190, China
• Received:2021-03-09 Revised:2021-07-10 Online:2021-12-25 Published:2021-12-27
• Supported by:
The authors were supported by NSFC (11688101).

Abstract: A conformal restriction measure is a probability measure which is used to describe the law of a random connected subset in a simply connected domain that satisfies a certain conformal restriction property. Usually there are three kinds of conformal restriction measures:one (called the chordal restriction measure) has two given boundary points of the random set, the second (called the radial restriction measure) has one boundary point and one interior point in the random set, and the third (called the tri-chordal restriction measure) has three boundary points in the random set. In this article, we will define a new probability measure such that the random set associated to it contains one given interior point and does not intersect with the boundary. Furthermore, we will show that this measure can be characterized by one parameter; we will also construct this one-parameter family of measures in two ways and obtain several properties.

• 60J67