Ilmari Kangasniemi

Ilmari Kangasniemi

Asst Professor - Visiting

French Hall

A&S Math Visitors - 0025

Professional Summary

I am a researcher in the field of non-smooth geometric analysis, with my main specialization being in geometric function theory. I completed my PhD in 2020 at the University of Helsinki, Finland. Prior to starting at Cincinnati, I spent 3 years as a postdoctoral fellow at Syracuse University, NY, USA.

I maintain a (relatively minimal) website on my mathematical research at https://sites.google.com/view/ilmari-kangasniemi-math

Education

PhD: University of Helsinki Helsinki, Finland, 2020 (Mathematics)

MSc: University of Helsinki Helsinki, Finland, 2016 (Mathematics)

BSc: University of Helsinki Helsinki, Finland, 2015 (Mathematics)

Research and Practice Interests

My research is in non-smooth analysis, but with a more geometric and topological flair. In particular, a large portion of my work is on geometric function theory, a field which studies various generalizations of holomorphic maps to spaces of n real dimensions. Besides the standard tools of analysis, my work also often involves ideas from differential geometry and algebraic topology, with a notable example being the use of Sobolev versions of de Rham cohomology.

Positions and Work Experience

06-2016 -12-2016 Research Assistant, University of Helsinki, Helsinki, Finland

01-2017 -08-2020 Doctoral Student, University of Helsinki, Helsinki, Finland

08-2020 -05-2023 Postdoctoral Fellow, Syracuse University, Syracuse, NY, USA

06-2023 -08-2023 Asst. Prof -Adjunct, University of Cincinnati, Cincinnati, OH, USA

08-2023 -08-2024 Visiting Asst. Prof., University of Cincinnati, Cincinnati, OH, USA

Research Support

Grant: #DMS-2247469 06-15-2023 -05-31-2026 National Science Foundation Topological Consequences of Distortion-type Estimates Role:PI 85503.00 Awarded Level:Federal

Grant: #DMS-2247469 06-15-2023 -05-31-2026 National Science Foundation Topological Consequences of Distortion-type Estimates Role:PI 85503.00 Awarded Level:Federal