a) Trabajos publicados en revistas internacionales con referato.
1) A. C. Briozzo – M. F. Natale – D. A. Tarzia, «Determination of unknown thermal coefficients through a free boundary problem for a nonlinear heat conduction equation with a convective term», Int. Comm. Heat Mass Transfer, 24 No6 (1997) 857-868. 1997-Briozzo-Natale-Tarzia-IntCommHeatMassTransfer-24(1997)857-868 (1)
2) A. C. Briozzo – D. A. Tarzia, » The explicit solution of a free boundary problem for a nonlinear absorption model of mixed saturated-unsaturated flow», Advances in Water Resources, 21, No.8, (1998) 713-721.1998-Briozzo-Tarzia-AdvWaterResour-21(1998)713-721
3) A. C. Briozzo – M. F. Natale – D. A. Tarzia, «Determination of unknown thermal coefficients for Storm’s type materials through a phase-change process», International Journal of Non-linear Mechanics, 34 (1999) 329-340.1999-Briozzo-Natale-Tarzia-IntJNonLinearMech-34(1999)329-340
4) A. C. Briozzo – D. A. Tarzia, «An Explicit Solution for an Instantaneous Two Phase Stefan Problem with Nonlinear Thermal Coefficients», IMA J. Applied Mathematics, 67, Nº 3 (2002), 249-261.2002-Briozzo-Tarzia-IMAJApplMath-67(2002)249-261
5) A. C. Briozzo – D. A. Tarzia, » Existence and Uniqueness for a One-Phase Stefan Problem of Non-classical Heat Equation with Temperature Boundary Condition at a Fixed Face”, Electronic Journal of Differential Equations, Nº 21 2006(2006), 1-16. 2006-Briozzo-Tarzia-ElectronicJDiffEq-2006(2006)-No21-pp1-16
6) A. C. Briozzo – D. A. Tarzia, » A one-phase Stefan problem for a non-classical heat equation with heat equation with heat flux condition on the fixed face”, Applied Mathematics and Computation 182 (2006), 809-819.2006-Briozzo-Tarzia-ApplMathComp-182(2006)809-819 (2)
7) A. C. Briozzo – M. F. Natale – D. A. Tarzia, “Explicit Solutions for a Two-Phase Unidimensional Lamé-Clapeyron-Stefan Problem with Source Terms in Both Phases”, Journal of Mathematical Analysis and Applications 329 (2007), 145-162. 2007-Briozo-Nzatale-Tarzia-JMathAnalAppl-329(2007)145-162-
8) E. A. Santillan Marcus – A. C. Briozzo, » On freezing of a finite humid porous medium with the heat flux condition”, Nonlinear Analysis Serie A: Theory, Methods and Applications, 67, Issue 6 (2007), 1919-1937.
9) A. C. Briozzo – M. F. Natale – D. A. Tarzia, «Existence of an exact solution for a one phase Stefan problem with nonlinear thermal coefficients from Tirskii’s method», Nonlinear Analysis: Theory, Methods and Applications, 67 (2007), 1989-1998.
10) A. C. Briozzo – M. F. Natale – D. A. Tarzia, “The Stefan problem with temperature dependent thermal conductivity and a convective term with a convective condition at the fixed face”, Communications on Pure and Applied Analysis, Volume 9 Number 5 (2010), 1209-1220. 2010-Briozzo-Natale-Tarzia-CommPureApplAnal-9(2010)1209-1220
11) A. C. Briozzo – D. A. Tarzia, “Exact Solutions for Nonclassical Stefan Problems”, International Journal of Differential Equations Volume 2010 (2010), Article ID 868059, 19 pages.
12) A. C. Briozzo – D. A. Tarzia, “A Stefan problem for a non-classical heat equation with a convective condition”, Applied Mathematics and Computation 217 (2010), 4051-4060.
13) A. C. Briozzo – D. A. Tarzia, “Convergence of the solution of the one-phase Stefan problem when the heat transfer coefficient goes to zero”, Journal of Mathematical Analysis and Applications 389 (2012), 138-146.
14) A. C. Briozzo – M. F. Natale, “On a nonlinear moving boundary problem for a diffusion-convection equation”, International Journal of Non-Linear Mechanics 47 (2012), 712718. 2012-Briozzo-Natale-IntJNonLinarMech-47(2012)712-718 (1)
15) A. C. Briozzo – M. F. Natale, “One Dimensional Nonlinear Stefan Problems in Storm’s Materials”, Mathematics 2 (2014), pp. 1-11; doi: 10.3390/math2010001. 2014-Briozzo-Natale-Mathematics 2 (2014). 1-11
16) A. C. Briozzo – M. F. Natale, “Two Stefan problems for a non-classical heat equation with nonlinear thermal coefficients”, Differential and Integral Equations Volume 27, Numbers 11-12 (2014), 1187-1202. 2014-Briozzo-Natale-Diff Int equations 27 11-12 (2014). 1187-1202.
17) A. C. Briozzo – M. F. Natale, “One-phase Stefan problem with temperature-dependent thermal conductivity and a boundary condition of Robin type”, Journal of Applied Analysis, 21, Issue 2 (2015), 89–97. doi: 10.1515/jaa-2015-0009. 2015 Briozzo- Natale jaa-2015-0009_2
18) A. C. Briozzo – M. F. Natale, «Nonlinear Stefan problem with convective boundary condition in Storm’s materials», Zeitschrift fuer Angewandte Mathematik und Physik (ZAMP, 67(2) (2016), 1-11. Doi: 10.1007/s00033-015-0615-x 2016-Briozzo_Natale-_ZAMP_67_2___2016__1-11 (1)
19) A. C. Briozzo – M. F. Natale; “An explicit solution for an instantaneous two phases Stefan problem with nonlinear thermal coefficients”, Z. Angew. Math. Phys. (ZAMP) (2017) 68: 46. doi:10.1007/s00033-017-0788- 2017-Briozzo Natale-ZAMP, 68 46(2017)
20) A. C. Briozzo, “Determination of unknown thermal coefficients in a Stefan problem for Storm’s type materials”, Computational and Applied Mathematics 37 No.4 (2018), 4499-4517. doi: 10.1007/s40314-017-0524-z 2018- Briozzo COAM DOI 10.1007_s40314-017-0524-z
21) A. C. Briozzo – M. F. Natale,” Non-classical Stefan problem with nonlinear thermal coefficients and a Robin boundary condition”, Nonlinear Analysis: Real World Applications 49 (2019), 159-168. 2019-Briozzo Natale-NOWRA, 159-168 (2019)
22) AC. Briozzo – D. A. Tarzia, “On the paper D. Burini- S. De Lillo- G. Fioriti, Acta Mech., 229 No. 10 (2018), pp. 4215-4228”, Acta Mechanica, 231, Issue 1 (2019), pp 391–393. https://doi.org/10.1007/s00707-019-02516-6.2019-BriozzoTarzia ACME-(2019)
23) A. C. Briozzo – M. F. Natale, “On a two-phase Stefan problem with convective boundary condition including a density jump at the free boundary” Math Meth Appl Sci. 43 No 6 (2020); 3744-3753. https://doi.org/10.1002/mma.6152 2020-Briozzo_ Natale MMA (2020)
24) A. C. Briozzo- D. A. Tarzia, “A free boundary problem for a diffusion-convection equation”, International Journal Nonlinear Mechanics, 120 No. 103394 (2020), 1-9. https://doi.org/10.1016/j.ijnonlinmec.2019.103394 2020- Briozzo-Tarzia NLM (2020)
25) A. C. Briozzo, “Supercooled Stefan problem with variable thermal diffusivity and a Neumann-type boundary condition”, Electron. J. Differential Equations, Vol. 2020 (2020), No. 49, pp. 1-14. 2020-Briozzo. EJDE Vol. 2020 (2020), No 49,pp 1-14
26) A. C. Briozzo – M. F. Natale, “Two-phase Stefan problem with nonlinear thermal coefficients and a convective boundary condition”, Nonlinear Analysis: Real World Applications Volumen 58 , abril de 2021, 103204.
27) J. Bollati – A. C. Briozzo, » Stefan problems for the diffusion-convection equation with temperature-dependent thermal coefficients», Int. J. of Non-Linear Mechanics (2021) en prensa. https://doi.org/10.1016/j.ijnonlinmec.2021.103732
28) Bollati, J., Briozzo, A.C. & Gutierrez, M.S. «Integral formulation for a Stefan problem with spherical symmetry». Z. Angew. Math. Phys. 72, 98 (2021). https://doi.org/10.1007/s00033-021-01527-5
29) J. Bollati – A. C. Briozzo- M. F. Natale, » Determination of unknown thermal coefficients in a non-classical Stefan problem», Nonlinear Analysis: Real World Applications , Volume 67, October 2022, 103591. https://doi.org/10.1016/j.nonrwa.2022.103591
30) A. C. Briozzo – C. Rogers – D.A. Tarzia “A Class of Moving Boundary Problems with a Source Term. Application of a Reciprocal Transformation”, aceptado para su publicación en Acta Mechanics el 12 de diciembre de 2022. Publicado online el 17 de enero de 2023.https://doi.org/10.1007/s00707-023-03477-7
31) J. Bollati – A. C. Briozzo – M. F. Natale “Analytical solution for a cylinder glaciation model with variable latent heat and thermal”, Int. J. of Non-Linear Mechanics Volume 150, April 2023, 104362, ( 2023)
https://doi.org/10.1016/j.ijnonlinmec.2023.104362
32) T. Nauryz – A. C. Briozzo, “Two phase Stefan problem for generalized heat equation with nonlinear thermal coefficients”, Nonlinear Analysis: Real Word Applications Volume 74, December 2023, 103944
https://doi.org/10.1016/j.nonrwa.2023.103944
33) J. Bollati – A. C. Briozzo – S. N. Kharin – T. A. Nauryz, “Mathematical model of thermal phenomena of closure electrical contact with Joule heat source and nonlinear thermal coefficients”, International Journal of Non-Linear Mechanics, Volume 158, January 2024, 104568
https://doi.org/10.1016/j.ijnonlinmec.2023.104568
34) J. Bollati – A. C. Briozzo, » Non-classical two-phase Stefan problem with variable thermal coefficients”, Journal of Mathematical Analysis and Applications, 534 (2024) 128094.
https://doi.org/10.1016/j.jmaa.2024.128094
b) Trabajos publicados en revistas nacionales con referato.
1) A. C. Briozzo – D. A. Tarzia, » Convergence of the solution of the one-phase Stefan problem with respect two parameters”, MAT, Serie A, Nº20 (2015), 31-38.