J
Jorge Milhazes Freitas
Researcher at University of Madeira
Publications - 80
Citations - 2023
Jorge Milhazes Freitas is an academic researcher from University of Madeira. The author has contributed to research in topics: Dynamical systems theory & Extreme value theory. The author has an hindex of 24, co-authored 77 publications receiving 1789 citations. Previous affiliations of Jorge Milhazes Freitas include University of Porto.
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A Systematic AQbD Approach for Optimization of the Most Influential Experimental Parameters on Analysis of Fish Spoilage-Related Volatile Amines
TL;DR: A systematic analytical duality-by-design approach was used as a powerful strategy to optimize the most important experimental parameters of headspace solid-phase microextraction (HS-SPME) and gas chromatography-mass spectrometry (GC-MS) conditions for the quantification of TMA and DMA in Sparus aurata.
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Extreme Value Theory for Piecewise Contracting Maps with Randomly Applied Stochastic Perturbations
TL;DR: In this article, the authors consider globally invertible and piecewise contracting maps in higher dimensions and perturb them with a particular kind of noise introduced by Lasota and Mackey.
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Clustering indices and decay of correlations in non-Markovian models.
TL;DR: In this article, the authors consider a general regenerative process that includes Smith's model and show that it is important to consider finite time quantities instead of asymptotic ones and compare their different behaviours in relation to the cluster size.
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Large deviations for dynamical systems with stretched exponential decay of correlations
TL;DR: In this article, the authors obtained large deviations estimates for systems with stretched exponential decay of correlations, which improved the ones obtained in AFLV11, and obtained better large deviation estimates for Viana maps and for a class of intermittent maps with a stretched exponential loss of memory.
Posted Content
Extreme Value Theory for Piecewise Contracting Maps with Randomly Applied Stochastic Perturbations
TL;DR: In this article, the authors consider globally invertible and piecewise contracting maps in higher dimensions and perturb them with a particular kind of noise introduced by Lasota and Mackey.