Optimal prediction problems and the last zero of spectrally negative Lévy processes
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Optimal prediction problems and the last zero of spectrally negative Lévy processes
Summary
Optimal prediction problems and the last zero of spectrally negative Lévy processes is a doctoral thesis[1].
Key Facts
- Optimal prediction problems and the last zero of spectrally negative Lévy processes authored José Manuel Pedraza Ramírez[2].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's instance of is recorded as doctoral thesis[3].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's language of work or name is recorded as English[4].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes was published on 2021[5].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's work available at URL is recorded as https://researchonline.lse.ac.uk/id/eprint/135168/[6].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's number of pages is recorded as {'unit': '1', 'amount': '+258'}[7].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's title is recorded as Optimal prediction problems and the last zero of spectrally negative Lévy processes[8].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's thesis submitted to is recorded as London School of Economics and Political Science[9].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's on focus list of Wikimedia project is recorded as LSEThesisProject[10].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's copyright status is recorded as copyrighted[11].
- Optimal prediction problems and the last zero of spectrally negative Lévy processes's online access status is recorded as open access[12].
Body
Designation and Status
Optimal prediction problems and the last zero of spectrally negative Lévy processes's instance of is recorded as doctoral thesis[3].