III: 14, 175-189, LNM 88 (1969)
MEYER, Paul-André
Processus à accroissements indépendants et positifs (
Markov processes,
Independent increments)
This is an exposition of the theory of subordinators (Lévy processes with increasing paths), aiming at presenting Chung's conjecture that a certain identity known to hold a.e. actually holds everywhere, also equivalent to the fact that single points are polar sets for subordinators without drift
Comment: The conjecture was proved by Kesten (see
503) who actually knew of the problem through this talk. See also
502Keywords: Subordinators,
Polar setsNature: Exposition
Retrieve article from Numdam
V: 02, 17-20, LNM 191 (1971)
ASSOUAD, Patrice
Démonstration de la ``Conjecture de Chung'' par Carleson (
Markov processes,
Independent increments)
Chung conjectured that singletons are polar sets for driftless subordinators. This paper gives Carleson's (unpublished) analytic proof of it
Comment: See Chung,
C. R. Acad. Sci. ,
260, 1965, p.4665. For the statement of the problem see Meyer
314. For Kesten's earlier (contrary to a statement in the paper!) probabilistic proof see Bretagnolle
503. See also
Séminaire Bourbaki 21th year,
361, June 1969
Keywords: Subordinators,
Polar setsNature: Exposition Retrieve article from Numdam
V: 03, 21-36, LNM 191 (1971)
BRETAGNOLLE, Jean
Résultats de Kesten sur les processus à accroissements indépendants (
Markov processes,
Independent increments)
The question is to find all Lévy processes for which single points are polar. Kesten's answer (
Mem. Amer. Math. Soc.,
93, 1969) is almost complete and in particular proves Chung's conjecture. The proofs in this paper have been considerably reworked
Comment: See also
502 in the same volume
Keywords: Subordinators,
Polar setsNature: Exposition,
Original additions Retrieve article from Numdam
V: 15, 147-169, LNM 191 (1971)
MAISONNEUVE, Bernard
Ensembles régénératifs, temps locaux et subordinateurs (
General theory of processes,
Renewal theory)
New approach to the theory of regenerative sets (Kingman; Krylov-Yushkevic 1965, Hoffmann-Jørgensen,
Math. Scand.,
24, 1969), including a general definition of local time of a random set
Comment: See Meyer
412, Morando-Maisonneuve
413, later work of Maisonneuve in
813 and later
Keywords: Local times,
Subordinators,
Renewal theoryNature: Original Retrieve article from Numdam
