84 research outputs found
Analysis of a heterogeneous kinetic model for traffic flow
In this work we extend a recent kinetic traffic model to the case of more
than one class of vehicles, each of which is characterized by few different
microscopic features. We consider a Boltzmann-like framework with only binary
interactions, which take place among vehicles belonging to the various classes.
Our approach differs from the multi-population kinetic model based on a lattice
of speeds because here we assume continuous velocity spaces and we introduce a
parameter describing the physical velocity jump performed by a vehicle that
increases its speed after an interaction. The model is discretized in order to
investigate numerically the structure of the resulting fundamental diagrams and
the system of equations is analyzed by studying well posedness. Moreover, we
compute the equilibria of the discretized model and we show that the exact
asymptotic kinetic distributions can be obtained with a small number of
velocities in the grid. Finally, we introduce a new probability law in order to
attenuate the sharp capacity drop occurring in the diagrams of traffic.Comment: 31 page
Preconditioned fully implicit PDE solvers for monument conservation
Mathematical models for the description, in a quantitative way, of the
damages induced on the monuments by the action of specific pollutants are often
systems of nonlinear, possibly degenerate, parabolic equations. Although some
the asymptotic properties of the solutions are known, for a short window of
time, one needs a numerical approximation scheme in order to have a
quantitative forecast at any time of interest. In this paper a fully implicit
numerical method is proposed, analyzed and numerically tested for parabolic
equations of porous media type and on a systems of two PDEs that models the
sulfation of marble in monuments. Due to the nonlinear nature of the underlying
mathematical model, the use of a fixed point scheme is required and every step
implies the solution of large, locally structured, linear systems. A special
effort is devoted to the spectral analysis of the relevant matrices and to the
design of appropriate iterative or multi-iterative solvers, with special
attention to preconditioned Krylov methods and to multigrid procedures.
Numerical experiments for the validation of the analysis complement this
contribution.Comment: 26 pages, 13 figure
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