Kinjo Erina

キンジョウエリナ | Kinjo Erina

Affiliation and department：
Job title： Associate Professor

Research field (1)： Basic analysis

Research keywords (1)：複素解析,リーマン面,タイヒミュラー空間,擬等角写像,双曲幾何学

Research theme for competitive and other funds (2)：

2017 - 2022 Analysis of elliptic operators and its applications to Geometric Function Theory
2016 - 2021 Degeneration and collapsing of Kleinian groups; geometry and analysis of the compactification of their defamation spaces

Papers (5)：

Erina Kinjo. On countability of Teichmüller modular groups for analytically infinite Riemann surfaces defined by generalized Cantor sets. Proceedings of the Japan Academy, Series A, Mathematical Sciences. 2024. 100. 10
Kinjo Erina. On the length spectrums of Riemann surfaces given by generalized Cantor sets. Kodai Mathematical Journal. 2024. 47. 1. 34-51
Erina Kinjo. On the length spectrum Teichmüller spaces of Riemann surfaces of infinite type. Conformal Geometry and Dynamics of the American Mathematical Society. 2018. 22. 1. 1-14
Erina Kinjo. On the length spectrum metric in infinite dimensional Teichmüller spaces. Annales Academiae Scientiarum Fennicae Mathematica. 2014. 39. 349-360
Erina Kinjo. On Teichmüller metric and the length spectrums of topologically infinite Riemann surfaces. Kodai Mathematical Journal. 2011. 34. 2

Education (2)：

Association Membership(s) (1)：

日本数学会

※ Researcher’s information displayed in J-GLOBAL is based on the information registered in researchmap. For details, see here.

Return to Previous Page