Artículos en Revistas CientíficasPapers in Scientific Journals
- V. Voller, S. Roscani «A general non-Fourier Stefan problem formulation that accounts for memory effects«, International Journal of Heat and Mass Transfer, 209 (2023), 124094
- S. Roscani, K. Ryszewska and L. Venturato «A one-phase space-fractional Stefan problem with no liquid initial domain«. SIAM Journal on Mathematical Analysis, Vol. 54 No. 5 (2022), pp. 5489-5523.
- S. Roscani, L. Venturato «About Convergence and Order of Convergence of some Fractional Derivatives«, Progress in Fractional Differentiation and Applications, Vol. 8 No. 4 (2022), pp. 495-508.
- I. Cardos, S. Roscani and D. Tarzia, «About the convergence of a family of initial boundary value problems for a fractional diffusion equation of Robin type«, Applied Mathematics and Computation, Vol. 433 (2022), ID 127375.
- S. Roscani, D. Tarzia, and L. Venturato. «The similarity method and explicit solutions for the fractional space one-phase Stefan problem«. Fractional Calculus and Applied Analysis, Vol. 25 (2022), pp. 995-1021.
- M.T. Cao-Rial, G. Castiñeira, Á. Rodríguez-Arós, S. Roscani, « Mathematical and asymptotic analysis of thermoelastic shells in normal damped response contact«, Communications in Nonlinear Science and Numerical Simulation, Vol. 103(2021) , 105995.
- M.T. Cao-Rial, G. Castiñeira, Á. Rodríguez-Arós, S. Roscani, «Asymptotic Analysis of Elliptic Membrane Shells in Thermoelastodynamics«, Preprint, Journal of Elasticity, Vol. 143(2021) , pp. 385–409.
- S. Roscani, N. D. Caruso, D. A. Tarzia,»Explicit solutions to fractional Stefan-like problems for Caputo and Riemann-Liouville derivatives«, Communications in Nonlinear Science and Numerical Simulation, Vol. 90 (2020), 105361. (ver artículo)
- S. Roscani, D. A. Tarzia, L. Venturato, «Global Solution to a nonlinear Fractional Diffusion Equation for the Caputo-Fabrizio derivative», Progrress in Fractional Differentiation and Applications, Vol. 5 No. 4 (2019), pp. 1-13.
- S. Roscani, D. A. Tarzia, «An integral Relationship for a Fractional One-phase Stefan Problem», Fractional Calculus and Applied Analysis, Vol. 21 No. 4 (2018), pp. 901-918.
- S. Roscani, D. A. Tarzia, «Two different fractional Stefan problems which are convergent to the same classical Stefan problem», Mathematical Methods in the Applied Sciences (2018), pp. 1-9.
- S. Roscani, J. Bollati and D. A. Tarzia, «A new mathematical formulation for a phase change problem with a memory flux’‘, Chaos Solitons and Fractals, 116 (2018), pp. 340-347.
- S. Roscani, D. A. Tarzia, «Explicit solution for a two-phase fractional Stefan problem with a heat flux condition at the fixed face», Computational and Applied Mathematics, (2018), pp. 1-15.
- S. Roscani, «Moving–Boundary Problems for the Time- Fractional Diffusion Equation’‘, Electronic Journal of Differential Equations, Vol. 2017 (2017), No. 14, pp. 1-12.
- S. Roscani, «Hopf Lemma for the Fractional Diffusion Operator and its Application to a Fractional Free–Boundary Problem», Journal of Mathematical Analisys and Appllications, 434 (2016), pp. 125-135.
- D. Goos, G. Reyero, S. Roscani, E. Santillan Marcus, «On the Initial-Boundary-Value Problem for the Time- Fractional Diffusion Equation on the Real Positive Semi-axis», Intenational Journal of Differential Equations, Vol. 2015, Article ID 439419, 14 pages.
- L. Fusi, A. Farina, F. Rosso, S. Roscani, «Pressure driven lubrication flow of a Bingham fluid in a channel: A novel approach», Journal of Non-Newtonian Fluid Mechanics, 221 (2015), pp. 66-75.
- S. Roscani, D. A. Tarzia, «A Generalized Neumann Solution for the Two-Phase Fractional Lamé-Clapeyron-Stefan Problem» , Advances in Mathematical Sciences and Applications, Vol. 24, No 2, (2014), pp. 237-249.
- S. Roscani, E. Santillan Marcus, «A new equivalence of Stefan’s problems for the Time Fractional Diffusion Equation», Fractional Calculus and Applied Analysis, Vol. 17, No 2 (2014), pp. 371-381.
- S. Roscani, E. Santillan Marcus, «Two equivalent Stefan’s Problems for the Time Fractional Diffusion Equation», Fractional Calculus and Applied Analysis, Vol. 16, No 4 (2013), pp. 802-815.