| 1 |
On defects of Taylor series approximation in heat conduction models
Li SN, Cao BY
International Journal of Heat and Mass Transfer, 98, 824, 2016 |
| 2 |
Accurate numerical method for solving dual-phase-lagging equation with temperature jump boundary condition in nano heat conduction
Dai WZ, Han F, Sun ZZ
International Journal of Heat and Mass Transfer, 64, 966, 2013 |
| 3 |
Numerical studies on dispersion of thermal waves
Zhang MK, Cao BY, Guo YC
International Journal of Heat and Mass Transfer, 67, 1072, 2013 |
| 4 |
The modeling of nanoscale heat conduction by Boltzmann transport equation
Xu MT, Li XF
International Journal of Heat and Mass Transfer, 55(7-8), 1905, 2012 |
| 5 |
A generalized relation between the local values of temperature and the corresponding heat flux in a one-dimensional semi-infinite domain with the moving boundary
Kulish V, Poletkin KV
International Journal of Heat and Mass Transfer, 55(23-24), 6595, 2012 |
| 6 |
A general bioheat model at macroscale
Fan J, Wang LQ
International Journal of Heat and Mass Transfer, 54(1-3), 722, 2011 |
| 7 |
Thermal lagging in living biological tissue based on nonequilibrium heat transfer between tissue, arterial and venous bloods
Afrin N, Zhang YW, Chen JK
International Journal of Heat and Mass Transfer, 54(11-12), 2419, 2011 |
| 8 |
From Boltzmann transport equation to single-phase-lagging heat conduction
Cheng L, Xu MT, Wang LQ
International Journal of Heat and Mass Transfer, 51(25-26), 6018, 2008 |
| 9 |
Lack of oscillations in Dual-Phase-Lagging heat conduction for a porous slab subject to imposed heat flux and temperature
Vadasz P
International Journal of Heat and Mass Transfer, 48(14), 2822, 2005 |
| 10 |
Explicit conditions for local thermal equilibrium in porous media heat conduction
Vadasz P
Transport in Porous Media, 59(3), 341, 2005 |
