B
Bruno Toaldo
Researcher at Sapienza University of Rome
Publications - 34
Citations - 575
Bruno Toaldo is an academic researcher from Sapienza University of Rome. The author has contributed to research in topics: Brownian motion & Fractional calculus. The author has an hindex of 12, co-authored 32 publications receiving 474 citations. Previous affiliations of Bruno Toaldo include Catholic University of the Sacred Heart & University of Naples Federico II.
Papers
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Convolution-Type Derivatives, Hitting-Times of Subordinators and Time-Changed C 0 -semigroups
TL;DR: In this article, the authors take under consideration subordinators and their inverse processes (hitting-times) and present the governing equations of such processes by means of convolution-type integro-differential operators similar to the fractional derivatives.
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Time-Changed Processes Governed by Space-Time Fractional Telegraph Equations
TL;DR: In this article, the authors construct compositions of vector processes of the form, t > 0,, β ∈ (0, 1),, whose distribution is related to space-time fractional n-dimensional telegraph equations.
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Relaxation patterns and semi-Markov dynamics
Mark M. Meerschaert,Bruno Toaldo +1 more
TL;DR: In this paper, a method based on Bernstein functions was proposed to unify three different approaches in the literature, including power law relaxation, semi-Markov process and semi-Maximax relaxation.
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Counting processes with Bernštein intertimes and random jumps
Enzo Orsingher,Bruno Toaldo +1 more
TL;DR: In this paper, the authors considered point processes Nf(t), t > 0, with independent increments and integer-valued jumps whose distribution is expressed in terms of Bernstein functions f with Levy measure ν.
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Convolution-type derivatives, hitting-times of subordinators and time-changed $C_0$-semigroups
TL;DR: In this paper, the authors take under consideration subordinators and their inverse processes (hitting-times) and present the governing equations of such processes by means of convolution-type integro-differential operators similar to the fractional derivatives.