A free-boundary problem for concrete carbonation: Front nucleation and rigorous justification of the -law of propagation T Aiki, A Muntean Interfaces and Free Boundaries 15 (2), 167-180, 2013 | 41 | 2013 |
A prey-predator model with hysteresis effect T Aiki, E Minchev SIAM journal on mathematical analysis 36 (6), 2020-2032, 2005 | 37 | 2005 |
Large time behavior of solutions to a moving-interface problem modeling concrete carbonation T Aiki, A Muntean Communications on Pure and Applied Analysis 9 (5), 1117-1129, 2010 | 35 | 2010 |
Existence and uniqueness of solutions to a mathematical model predicting service life of concrete structures T Aiki < em> Adv. Math. Sci. Appl. 19, 109, 2009 | 31 | 2009 |
Weak solutions for Falk's model of shape memory alloys T Aiki Mathematical methods in the applied sciences 23 (4), 299-319, 2000 | 29 | 2000 |
Mathematical model for hysteresis phenomenon in moisture transport of concrete carbonation process T Aiki, K Kumazaki Physica B: Condensed Matter 407 (9), 1424-1426, 2012 | 27 | 2012 |
Multi-dimensional Stefan problems with dynamic boundary conditions A Toyohiko Applicable Analysis 56 (1-2), 71-94, 1995 | 26 | 1995 |
One-dimensional shape memory alloy problems including a hysteresis operator T Aiki Funkcialaj Ekvacioj 46 (3), 441-469, 2003 | 23 | 2003 |
Homogenization of a thermo-diffusion system with Smoluchowski interactions O Krehel, T Aiki, A Muntean Networks and Heterogeneous Media 9 (4), 739-762, 2014 | 22 | 2014 |
Well-posedness of a mathematical model for moisture transport appearing in concrete carbonation process T Aiki < em> Adv. Math. Sci. Appl. 21, 361, 2011 | 20 | 2011 |
Behavior of free boundaries of blow-up solutions to one-phase Stefan problems T Aiki Nonlinear Analysis: Theory, Methods & Applications 26 (4), 707-723, 1996 | 20 | 1996 |
Large-time asymptotics of moving-reaction interfaces involving nonlinear Henry’s law and time-dependent Dirichlet data T Aiki, A Muntean Nonlinear Analysis: Theory, Methods & Applications 93, 3-14, 2013 | 16 | 2013 |
A mathematical model for bacterial growth described by a hysteresis operator T Aiki, J Kopfová Recent advances in nonlinear analysis, 1-10, 2008 | 16 | 2008 |
Some models for shape memory alloys T Aiki Mathematical Aspects of Modeling Structure Formation Phenomena, 2001 | 15 | 2001 |
Phase field equations with constraints under nonlinear dynamic boundary conditions N Sato, T Aiki Communications in Applied Analysis 5 (2), 215-234, 2001 | 15 | 2001 |
Global existence of solutions to one-phase Stefan problems for semilinear parabolic equations T Aiki, H Imai Annali di Matematica pura ed applicata 175, 327-337, 1998 | 15 | 1998 |
Mathematical modeling of concrete carbonation process with hysteresis effect (Analysis on non-equilibria and nonlinear phenomena: from the evolution equations point of view) T Aiki, K Kumazaki 数理解析研究所講究録 1792, 99-107, 2012 | 13 | 2012 |
Two-phase Stefan problems with dynamic boundary conditions T Aiki Adv. Math. Sci. Appl 2 (2), 253-270, 1993 | 13 | 1993 |
A one dimensional free boundary problem for adsorption phenomena N Sato, T Aiki, Y Murase, K Shirakawa Networks and Heterogeneous Media 9 (4), 655-668, 2014 | 12 | 2014 |
Behavior of solutions to two-phase Stefan problems for nonlinear parabolic equations T Aiki, N Kenmochi Bull. Fac. Ed. Chiba Univ 39, 15-62, 1991 | 12 | 1991 |