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Lugar de nacimiento / Place of birth

Rosario, Santa Fe

Fecha de nacimiento / Date of birth

10/6/1983

Contacto / Contact

sroscani@austral.edu.ar
sabrinaroscani@gmail.com
Últ. actualización: 10/08/2023

Roscani, Sabrina

Ciencias Empresariales Rosario
Investigador asistente CONICET
Matemática
El contenido de este perfil es responsabilidad exclusiva del docente investigador.

Artículos en Revistas CientíficasPapers in Scientific Journals

  1. 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
  2. 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.
  3. 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.
  4. 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.
  5. 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.
  6.  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.
  7.  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.
  8. 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)
  9. 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.
  10. 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.
  11. 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.
  12. 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.
  13. 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.
  14. S. Roscani, «Moving–Boundary Problems for the Time- Fractional Diffusion Equation’‘, Electronic Journal of Differential Equations, Vol. 2017 (2017), No. 14, pp. 1-12.
  15. 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.
  16. 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.
  17. 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.
  18. 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.
  19. 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.
  20. 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.