Paul Balança scite author profile

Paul Balança

4Publications

80Citation Statements Received

230Citation Statements Given

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École Centrale Paris, École Centrale d'Électronique

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Fine regularity of Lévy processes and linear (multi)fractional stable motion

Balança

2014

Electron. J. Probab.

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International audienceIn this work, we investigate the fine regularity of Lévy processes using the 2-microlocal formalism. This framework allows us to refine the multifractal spectrum determined by Jaffard and, in addition, study the oscillating singularities of Lévy processes. The fractal structure of the latter is proved to be more complex than the classic multifractal spectrum and is determined in the case of alpha-stable processes. As a consequence of these fine results and the properties of the 2-microlocal frontier, we are also able to completely characterise the multifractal nature of the linear fractional stable motion (extension of fractional Brownian motion to α-stable measures) in the case of continuous and unbounded sample paths as well. The regularity of its multi-fractional extension is also presented, indirectly providing an example of a stochastic process with a non-homogeneous and random multifractal spectrum

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2-microlocal analysis of martingales and stochastic integrals

Balança

Herbin

2012

Stochastic Processes and their Applications

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Recently, a new approach in the fine analysis of stochastic processes sample paths has been developed to predict the evolution of the local regularity under (pseudo-)differential operators. In this paper, we study the sample paths of continuous martingales and stochastic integrals. We proved that the almost sure 2-microlocal frontier of a martingale can be obtained through the local regularity of its quadratic variation. It allows to link the H\"older regularity of a stochastic integral to the regularity of the integrand and integrator processes. These results provide a methodology to predict the local regularity of diffusions from the fine analysis of its coefficients. We illustrate our work with examples of martingales with unusual complex regularity behavior and square of Bessel processes.Comment: 40 pages, 3 figure

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An increment type set-indexed Markov property

Balança¹

2012

Preprint

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An Increment-Type Set-Indexed Markov Property

Balança

2014

J Theor Probab

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We present and study a Markov property, named C-Markov, adapted to processes indexed by a general collection of sets. This new definition fulfils one important expectation for a set-indexed Markov property: there exists a natural generalization of the concept of transition operator which leads to characterization and construction theorems of C-Markov processes. Several usual Markovian notions, including Feller and strong Markov properties, are also developed in this framework. Actually, the C-Markov property turns out to be a natural extension of the two-parameter * -Markov property to the multiparameter and the set-indexed settings. Moreover, extending a classic result of the real-parameter Markov theory, sample paths of multiparameter C-Feller processes are proved to be almost surely right-continuous. Concepts and results presented in this study are illustrated with various examples. AMS 2000 subject classifications: 60G10, 60G15, 60G60, 60J25.

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Paul Balança

Fine regularity of Lévy processes and linear (multi)fractional stable motion

2-microlocal analysis of martingales and stochastic integrals

An increment type set-indexed Markov property

An Increment-Type Set-Indexed Markov Property

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