Kopp, F, Quadros A, Volkmer G, Razeira M, Machado M, Hadjimichef D, Zen Vasconcellos CA.
2018.
{A comparative study of Compact Objects using 3 models: Walecka Model, PAL Model, and M.I.T. Bag Model}, 4. {14th International Workshop on Hadron Physics}.
Abstractn/a
Horta, E, Ziegelmann F.
2018.
Conjugate processes: Theory and application to risk forecasting. Stochastic Processes and their Applications. 128(3):727-755.
AbstractMany dynamical phenomena display a cyclic behavior, in the sense that time can be partitioned into units within which distributional aspects of a process are homogeneous. In this paper, we introduce a class of models – called conjugate processes – allowing the sequence of marginal distributions of a cyclic, continuous-time process to evolve stochastically in time. The connection between the two processes is given by a fundamental compatibility equation. Key results include Laws of Large Numbers in the presented framework. We provide a constructive example which illustrates the theory, and give a statistical implementation to risk forecasting in financial data.
Horta, E, Ziegelmann F.
2018.
Dynamics of financial returns densities: A functional approach applied to the Bovespa intraday index. International Journal of Forecasting. 34(1):75-88.
AbstractWe model the stochastic evolution of the probability density functions (PDFs) of Ibovespa intraday returns over business days, in a functional time series framework. We find evidence that the dynamic structure of the PDFs reduces to a vector process lying in a two-dimensional space. Our main contributions are as follows. First, we provide further insights into the finite-dimensional decomposition of the curve process: it is shown that its evolution can be interpreted as a dynamic dispersion-symmetry shift. Second, we provide an application to realized volatility forecasting, with a forecasting ability that is comparable to those of HAR realized volatility models in the model confidence set framework.
] 