Can Van Hao


Department of Probability and Mathematical Statistics
Research interests: Random walk, Random graph, interacting particle systems.

Office: Room 106, Building A5
Tel: 84 024 37563474 / 106

Born in Hanoi in 1989

Education and academic degrees:

  • 2011: Bachelor in Mathematics, Hanoi University of Education.
  • 2013: Master in Mathematics, Aix-Marseille University.
  • 2016: PhD in Mathematics, Aix-Marseille University.

Research areas:  Random walk, Random graph, interacting particle systems



 List of publications in MathScinet

List of recent publications
1Can Van Hao, Shuta Nakajima, First passage time of the frog model has a sublinear variance, Electronic Journal of Probability, 24 (2019), 1-27,SCI(-E), Scopus
2Can Van Hao, Pham Viet Hung, Manh Hong Duong, Persistence probability of a random polynomial arising from evolution game theory, Journal of Applied Probability, 56 (2019), 870-890, SCI(-E), Scopus.
3Can Van Hao, Pham Viet Hung, Persistence probability of random Weyl polynomials, Journal of Statistical Physics, 176 (2019), 262-277, (SCI(-E), Scopus.
4Can Van Hao, Exponential extinction time of the contact process on rank-one inhomogeneous random graphs. Journal of Theoretical Probability 32 (2019), 106–130, (SCI(-E), Scopus).
5Can Van Hao, Annealed limit theorems for the Ising model on random regular graphs. The Annals of Applied Probability 29 (2019), 1398–1445, ( SCI(-E), Scopus).
6Can Van Hao, Super-Exponential Extinction Time of the Contact Process on Random Geometric Graphs, Combinatorics, Probability and Computing (2018) 27, 162–185,SCI(-E); Scopus.
7Can Van Hao, Pham Viet Hung, A Cramér type moderate deviation theorem for the critical Curie-Weiss model, Electronic Communications in Probability, 22 (2017), 12 pp, SCI(-E); Scopus.
8Can Van Hao, Critical behavior of the annealed Ising model on random regular graphs, Journal of Statistical Physics, 169 (2017), 480-503, SCI(-E); Scopus.
9Can Van Hao, Bruno Schapira, Metastability for the contact process on the configuration model with infinite mean degree, Electronic Journal of Probability, 20 (2015), 1—22.
10Can Van Hao, Contact process on one-dimensional long range percolation. Electronic Communications in Probability 20 (2015), no. 93, 11 pp.
1Can Van Hao, Metastability for the contact process on the preferential attachment graph, arXiv:1502.05633, to appear Internet Mathematics.