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Author ID: ni.hao Recent zbMATH articles by "Ni, Hao"
Published as: Ni, Hao
Homepage: https://sites.google.com/site/haoni1986630/home
External Links: MGP
Documents Indexed: 17 Publications since 2014, including 1 Book and 4 Additional arXiv Preprints
Co-Authors: 30 Co-Authors with 17 Joint Publications
716 Co-Co-Authors

Publications by Year

Citations contained in zbMATH Open

10 Publications have been cited 35 times in 26 Documents Cited by Year
Uniqueness of signature for simple curves. Zbl 1294.60063
Boedihardjo, Horatio; Ni, Hao; Qian, Zhongmin
8
2014
Expected signature of Brownian motion up to the first exit time from a bounded domain. Zbl 1350.60086
Lyons, Terry; Ni, Hao
7
2015
Super-multiplicativity and a lower bound for the decay of the signature of a path of finite length. (Supermultiplicativité et une borne inférieure pour la décroissance de la signature d’un chemin de longueur finie.) Zbl 1391.60163
Chang, Jiawei; Lyons, Terry; Ni, Hao
7
2018
The expected signature of Brownian motion stopped on the boundary of a circle has finite radius of convergence. Zbl 1486.60124
Boedihardjo, Horatio; Diehl, Joscha; Mezzarobba, Marc; Ni, Hao
4
2021
Signature inversion for monotone paths. Zbl 1378.60056
Chang, Jiawei; Duffield, Nick; Ni, Hao; Xu, Weijun
3
2017
\(\epsilon\)-strong simulation of fractional Brownian motion and related stochastic differential equations. Zbl 07371743
Chen, Yi; Dong, Jing; Ni, Hao
2
2021
Corrigendum to: “Super-multiplicativity and a lower bound for the decay of the signature of a path of finite length”. Zbl 1400.60089
Chang, Jiawei; Lyons, Terry; Ni, Hao
1
2018
Concentration and exact convergence rates for expected Brownian signatures. Zbl 1307.60110
Ni, Hao; Xu, Weijun
1
2015
Expected signature of stopped Brownian motion on \(d\)-dimensional \(C^{2, \alpha }\)-domains has finite radius of convergence everywhere: \(2 \leq d \leq 8\). Zbl 1505.60092
Li, Siran; Ni, Hao
1
2022
Developing the path signature methodology and its application to landmark-based human action recognition. Zbl 1508.68380
Yang, Weixin; Lyons, Terry; Ni, Hao; Schmid, Cordelia; Jin, Lianwen
1
2022
Expected signature of stopped Brownian motion on \(d\)-dimensional \(C^{2, \alpha }\)-domains has finite radius of convergence everywhere: \(2 \leq d \leq 8\). Zbl 1505.60092
Li, Siran; Ni, Hao
1
2022
Developing the path signature methodology and its application to landmark-based human action recognition. Zbl 1508.68380
Yang, Weixin; Lyons, Terry; Ni, Hao; Schmid, Cordelia; Jin, Lianwen
1
2022
The expected signature of Brownian motion stopped on the boundary of a circle has finite radius of convergence. Zbl 1486.60124
Boedihardjo, Horatio; Diehl, Joscha; Mezzarobba, Marc; Ni, Hao
4
2021
\(\epsilon\)-strong simulation of fractional Brownian motion and related stochastic differential equations. Zbl 07371743
Chen, Yi; Dong, Jing; Ni, Hao
2
2021
Super-multiplicativity and a lower bound for the decay of the signature of a path of finite length. (Supermultiplicativité et une borne inférieure pour la décroissance de la signature d’un chemin de longueur finie.) Zbl 1391.60163
Chang, Jiawei; Lyons, Terry; Ni, Hao
7
2018
Corrigendum to: “Super-multiplicativity and a lower bound for the decay of the signature of a path of finite length”. Zbl 1400.60089
Chang, Jiawei; Lyons, Terry; Ni, Hao
1
2018
Signature inversion for monotone paths. Zbl 1378.60056
Chang, Jiawei; Duffield, Nick; Ni, Hao; Xu, Weijun
3
2017
Expected signature of Brownian motion up to the first exit time from a bounded domain. Zbl 1350.60086
Lyons, Terry; Ni, Hao
7
2015
Concentration and exact convergence rates for expected Brownian signatures. Zbl 1307.60110
Ni, Hao; Xu, Weijun
1
2015
Uniqueness of signature for simple curves. Zbl 1294.60063
Boedihardjo, Horatio; Ni, Hao; Qian, Zhongmin
8
2014

Citations by Year