T. Shirai, K. Suzaki. A limit theorem for persistence diagrams of random filtered complexes built over marked point processes. Mod. Stoch. Theory Appl. 2022. 1-18
須崎 清剛. A limit theorem for persistence diagrams of random filtered complexes built over marked point processes (共同研究者:白井朋之). 数理解析研究所講究録2116確率論シンポジウム. 2019. 136-143
須崎 清剛. An SDE approach to leafwise diffusions on foliated spaces and its applications. 数理解析研究所講究録1903確率論シンポジウム. 2014. 186-192
講演・口頭発表等 (48件):
Stochastic flows on foliated spaces
(RIMS共同研究集会「ランダム力学系・非自励力学系研究の展望:理論と応用」 2022)
Stochastic flows and rough differential equations on foliated spaces(共同研究者:稲濱 譲(九州大学))
(確率論シンポジウム 2019)
A limit theorem for persistence diagrams of random filtered complexes built over marked point processes
(Japanese-German Open Conference on Stochastic Analysis 2019 2019)
A limit theorem for persistence diagrams of random filtered complexes built over marked point processes
(Japan Netherlands Workshop Probabilistic Methods in Statistical Mechanics of Random Media 2019)