Weak type (1,1) jump inequalities in a nonsymmetric Gaussian setting
Artikel i vetenskaplig tidskrift, 2026
We prove that the jump quasi-seminorm of order ϱ = 2 for a general
Ornstein–Uhlenbeck semigroup (Ht)_t>0 in R^n defines an operator of weak type (1, 1)
with respect to the invariant measure. This provides an example of a weak-type
jump inequality for a nonsymmetric semigroup in a nondoubling measure space.
Our result may be seen as an endpoint refinement of the weak type (1, 1) in-
equality for the ϱ-th order variation seminorm of (Ht)_t>0, recently proved by the
authors when ϱ > 2, and disproved for ϱ = 2
Ornstein–Uhlenbeck semigroup (Ht)_t>0 in R^n defines an operator of weak type (1, 1)
with respect to the invariant measure. This provides an example of a weak-type
jump inequality for a nonsymmetric semigroup in a nondoubling measure space.
Our result may be seen as an endpoint refinement of the weak type (1, 1) in-
equality for the ϱ-th order variation seminorm of (Ht)_t>0, recently proved by the
authors when ϱ > 2, and disproved for ϱ = 2
Ornstein–Uhlenbeck semigroup
jump inequalites
Författare
Peter Sjögren
Chalmers, Matematiska vetenskaper
Valentina Casarino
Università di Padova
Paolo Ciatti
Università di Padova
Transactions of the American Mathematical Society
0002-9947 (ISSN) 1088-6850 (eISSN)
Ämneskategorier (SSIF 2025)
Matematik
Matematisk analys