Research Interest:

Kinetic Theory: Linear Boltzmann equation, Boltzmann equation, Povzner equation;

Kac model, Lorentz model, Random walks;

Dynamics in presence of obstacles; Monte Carlo methods; Agent-based modeling.

       

Papers and other products:

 

[6]   A. Ciallella, E.N.M. Cirillo.

       Conditional expectation of the duration of the classical gambler problem with defects,

       In publication in Eur. Phys. J. Special Topics, 2019. arXiv:1808.07919

 

 

[5]   A. Ciallella, E.N.M. Cirillo,  P.L. Curşeu, A. Muntean.

       Free to move or trapped in your group: Mathematical modeling of information overload and coordination in crowded populations,

       Mathematical Models and Methods in Applied Sciences 28, 1831–1856, 2018.

 

[4]   A. Ciallella, E.N.M. Cirillo, J. Sohier.

       Residence time of symmetric random walkers in a strip with large reflective obstacles,

       Physical Review E 97, 052116, 2018.

 

[3]   A. Ciallella, E.N.M. Cirillo.

       Linear Boltzmann dynamics in a strip with large reflective obstacles: stationary state and residence time,

       Kinetic & Related Models 11, 1475–1501, 2018.

 

[2]   A. Ciallella.

       On the linear Boltzmann transport equation: a Monte Carlo algorithm for stationary solutions and residence times in presence of obstacles,

       AIMETA 2017, Proceedings of the 23th Conference of the Italian Assoc. Theor. Appl. Mech., Salerno,  952960, 2017.

 

[1]   A. Ciallella.

       Particle-based modeling of dynamics in presence of obstacles,

       PhD Thesis, 2018.

 

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