On fractional derivatives of the local time of a symmetric stable
process as a doubly indexed process

Ouahra, M. Ait; Kissami, Abdelghani; Ouahhabi, Hanae

doi:10.1515/rose-2014-0011

Cited by 2 publications

(1 citation statement)

References 16 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The study of Hölder continuity of local times had been initiated by Trotter [22, inequalities (2.1) and (2.3)], in which the almost-sure Hölder-continuity of the Brownian local time {l(t, x) : t 0, x ∈ R} in time-space variable (t, x) was proved (see also Boufoussi-Roynette [6]). There are a lot of such studies (see, e.g., Liang [15], Ait Ouahra-Kissami-Ouahhabi [3], Shuwen-Cheng [19] and references therein). Theorem 1.2 implies immediately the following.…”

Section: Introductionmentioning

confidence: 99%

Distributional Itô’s Formula and Regularization of Generalized Wiener Functionals

Amaba¹,

Ryu²

2018

ALEA

View full text Add to dashboard Cite

We investigate Bochner integrabilities of generalized Wiener functionals. We further formulate an Itô formula for a diffusion in a distributional setting, and apply it to investigate differentiability-index s and integrabilityindex p 2 for which the Bochner integral belongs to D s p .T 0 δ y (X t )dt as a Bochner integral in the space of generalized Wiener functional. We remark here the Bochner integrability seems nontrivial when y = X 0 , since δ y (X t ) no longer makes sense at t = 0. On the other hand, the local time is usually formulated as a classical Wiener functional. Hence, once the Bochner integrability is proved, a "smoothing effect" should occur in the Bochner integral T 0 δ y (X t )dt, i.e., the differentiability-index for T 0 δ y (X t )dt, should be greater than that of δ y (X t ).

show abstract

Section: Introductionmentioning

confidence: 99%