Statistical inference for branching processes with immigration
Joint project between Bolyai Institute, University of Szeged and Mathematics Department, Faculty of Science, University of Zagreb (financed jointly by the governments of Hungary and Republic of Croatia)
Collaborators: - Gyula Pap, Mátyás Barczy, Péter Kevei, Zsuzsanna Bősze, Fanni Nedényi (Szeged)
- Bojan Basrak, Miljenko Huzak, Snježana Lubura, Hrvoje Planinić (Zagreb)
Articles/reports - Zsuzsanna Bősze, Gyula Pap: Regularly varying nonstationary second-order Galton–Watson processes with immigration, Stochastic Models, 2019, vol.35, no. 2, 132–147
- Mátyás Barczy, Zsuzsanna Bősze, Gyula Pap: Regularly varying nonstationary Galton–Watson processes with immigration, Statistics & Probability Letters, Volume 140, September 2018, Pages 106-114
- Mátyás Barczy, Bojan Basrak, Peter Kevei, Gyula Pap, Hrvoje Planinić, 2019: Statistical inference of subcritical strongly stationary Galton–Watson processes with regularly varying immigration, to appear in Stochastic Processes and their Applications.
Supported activities
Lectures - Bojan Basrak, On stationary regularly varying sequences and arrays, ISSPSM 2017, University of Debrecen, August 2017.
- H. Planinić, A compound Poisson approximation for local sequence alignment, IWAP 2018, Budapest
- Mátyás Barczy, On aggregation of subcritical Galton--Watson branching
processes with regularly varying immigration, EVA 2019, Zagreb
- Peter Kevei, Darling-Erdős theorem for Lévy processes at zero, EVA 2019, Zagreb
- Gyula Pap, Statistical inference of subcritical strongly stationary Galton–Watson processes with regularly varying immigration, EVA 2019, Zagreb
Workshop, on 5th and 12th of January 2018, at Mathematics Department, University of Zagreb - Gyula Pap, On aggregation of Galton-Watson branching processes with regularly varying immigration
- Mátyás Barczy, Asymptotic properties of MLE for the growth rate of an alpha-stable CIR process,
- Péter Kevei, Regularly log-periodic functions and some applications,
- Zsuzsanna BÅ‘sze, Regularly varying non-stationary Galton-Watson processes with immigration
- Snježana Lubura, A stochastic model of eye lens growth
- Hrvoje Planinić, Compound Poisson approximation and local sequence alignment
G.Pap in Zagreb
M.Barczy in Zagreb
P.Kevei in Zagreb
Z.BÅ‘sze in Zagreb
The first visit to Szeged
The second visit to Szeged
G.Pap presents our work at the Extreme Value Analysis 2019 conference
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