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Lugar de nacimiento / Place of birth

Rosario, Santa Fe

Fecha de nacimiento / Date of birth

8/5/1988

Contacto / Contact

jbollati@austral.edu.ar
julietabollati@hotmail.com
Últ. actualización: 5/09/2021

Bollati, Julieta

Ciencias Empresariales Rosario
Profesor Adjunto | Dedicación Simple
Becario posdoctoral CONICET
Matemática
El contenido de este perfil es responsabilidad exclusiva del docente investigador.

Artículos en Revistas CientíficasPapers in Scientific Journals

  • J. BOLLATI – A.C. BRIOZZO – M.S. GUTIERREZ, «Integral formulation for a Stefan problem with spherical symmetry», Zeitschrift fur angewandte Mathematik und Physik, 72  (98) (2021) 1-16.

(ver Bollati-Briozzo-Gutierrez-ZAMP-72(2021)98-1-16)

 

  • J. BOLLATI – A.C. BRIOZZO, «Stefan problems for the diffusion-convection equation with temperature- dependent thermal coefficients», Int. Journal of Non-Linear Mechanics, 134 (2021) 103732, 1-10.

(ver Bollati-Briozzo-IntJNonLinearMech-134(2021)103732-1-10)

 

  • J. BOLLATI – D.A. TARZIA, “Approximate solutions to one-phase Stefan-like problems with a space-dependent latent heat”, European Journal of Applied Mathematics, 32 (2021), 337-369.

(ver Bollati-Tarzia-EuroJnlApplMath-32(2021)337-369)

 

  •  M. SOFONEA – J. BOLLATI – D.A. TARZIA, “Convergence and optimal control problems for differential quasivariational inequalities in contact mechanics”, Journal of Mathematical Analysis and Applications, 493 No. 124567 (2021), 1-23.

(ver  Sofonea-Bollati-Tarzia-JMathAnalAppl-493No124567(2021)1-23)

 

  • J. BOLLATI – J.A. SEMITIEL– M.F. NATALE – D.A. TARZIA, “Existence and uniqueness of the p-generalized modified error function”, Electronic Journal of Differential Equations, 2020 No 35 (2020), 1-11.

(ver https://ejde.math.txstate.edu/Volumes/2020/35/bollati.pdf )

 

  •  J. BOLLATI – C. M. GARIBOLDI – D.A. TARZIA, “Explicit solutions for distributed, boundary and distributed-boundary elliptic optimal control problems”, Journal of Applied Mathematics and Computing, 64 (2020), 283-311.

(ver Gariboldi-Tarzia-JApplMathComputing(2020)-DOI-10.1007_s12190-020-01355-2)

 

  • J. BOLLATI – M.F. NATALE – J.A. SEMITIEL – D.A. TARZIA, “Existence and uniqueness of solution for two one-phase Stefan problems with variable thermal coefficients”, Nonlinear Analysis, Real World and Applications, 51 No. 103001 (2020), 1-11.

(ver Bollati-Natale-Semitiel-Tarzia-NonlinearAnalRealWorldAppl-51Art ID 103001(2020)1-11)

 

  •  J. BOLLATI – M.F. NATALE – J.A. SEMITIEL – D.A. TARZIA, “Integral balance methods applied to non-classical Stefan problems”, Thermal Science, 24 No. 2B (2020), 1-13.

(ver Bollati-Natale-Semitiel-Tarzia-ThermalSci-24 No. 2B (2020)1229-1241 )

 

  • J. BOLLATI – D.A. TARZIA, “Exact solutions for a two-phase Stefan problem with variable latent heat and a convective boundary conditions at the fixed face”, Zeitschrift fûr Angewandte Mathematik und Physik – ZAMP, 69 No. 38 (2018), 1-15.

(ver Bollati-Tarzia-ZAMP-69No38(2018)1-15)

 

  • J. BOLLATI – J.A. SEMITIEL – D.A. TARZIA, “Heat balance integral methods applied to the one-phase Stefan problem with a convective boundary condition at the fixed face”, Applied Mathematics and Computation, 331 (2018), 1-19.

(ver Bollati-Semitiel-Tarzia-ApplMathComput-331(2018)1-19)

 

  • A. CERETANI – J. BOLLATI – L. FUSI – F. ROSSO, «Mathematical model for acid water neutralization with anomalous and fast diffusion», Nonlinear Analysis: Real World Applications, 41 (2018) 509-528.

(ver Ceretani-Bollati-Fusi-Rosso-NonlinAnalRealWorldAppl-41(2018)509-528)

 

  • J. BOLLATI – D.A. TARZIA, “Explicit solution for the one-phase Stefan problem with latent heat depending on the position and a convective boundary condition at the fixed face”, Communications in Applied Analysis, 22 No.2 (2018), 309-332.

(ver Bollati-Tarzia-CommApplAnal-22No2(2018)309-332)

 

  • J. BOLLATI – D.A. TARZIA, “One-phase Stefan problem with a latent heat depending on the position of the free boundary and its rate of change”, Electronic Journal of Differential Equations, 2018 No. 10 (2018), 1-12.

(ver https://ejde.math.txstate.edu/Volumes/2018/10/bollati.pdf )

 

  • J. BOLLATI – D.A. TARZIA, “One-phase Stefan-like problems with a latent heat depending on the position and velocity of the free boundary, and with Neumann or Robin boundary conditions at the fixed face”, Mathematical Problems in Engineering, 2018 Article ID 4960391 (2018), 1-11.

(ver http://downloads.hindawi.com/journals/mpe/2018/4960391.pdf)

 

  • S.D. ROSCANI – J. BOLLATI – D.A. TARZIA, “A new mathematical formulation for a phase change problem with a memory flux”, Chaos, Solitons and Fractals, 116 (2018), 340-347.

(ver Roscani-Bollati-Tarzia-ChaosSolitonsFractals-116(2018)340-347)