Novel hybrid lattice Boltzmann technique with TVD characteristics for simulation of heat transfer and entropy generations of MHD and natural convection in a cavity

ABSTRACT

In the present study, a novel FD_LBM hybrid numerical method with total variation diminishing (TVD) characteristics is proposed to solve the famous problems of MagnetoHydroDynamics (MHD) and natural convection in a closed cavity. Here, the momentum and energy equations are carried out via lattice Boltzmann method (LBM) and FD techniques, respectively. To enhance the stability and performance of the finite difference scheme for higher Ra numbers, two renowned Superbee and Minmod flux limiter functions were used. The results for heat transfer and entropy generation features for a wide range of Rayleigh and Hartman numbers of and are presented. In addition for comparison purposes, two multiple relaxation time (MRT) and single relaxation time (SRT) algorithms presented in the open literature, were applied in the same case definitions. Not only the tests revealed an excellent agreement between the TVD method results and the published data, but they also proved that this new technique is numerically much more efficient and stable than the SRT and MRT methods, and hence one can assume the present method as a fantastic tool in the numerical solution of laminar convection problems.

Nomenclature

B	=	magnetic field
c	=	lattice speed
ci	=	discrete particle speeds
Cp	=	specific heat at constant pressure
F	=	external forces
f	=	density distribution functions
feq	=	equilibrium density distribution functions
g	=	internal energy distribution functions
geq	=	equilibrium internal energy distribution functions
gy	=	gravity
Ha	=	Hartman number
M	=	lattice number in y-direction
Ma	=	Mach number
Nu	=	Nusselt number
Pr	=	Prandtl number
Ra	=	Rayleigh number
Sx	=	entropy generation rate due x
T	=	temperature
TVD_S	=	hybrid TVD scheme with Superbee limiter
TVD_M	=	hybrid TVD scheme with Minmod limiter
u, v	=	velocity components in x- and y-directions
x, y	=	Cartesian coordinates
Greek letters	=
α	=	thermal diffusivity
β	=	thermal expansion coefficient
	=	magnetic field inclination angle
μ	=	dynamic viscosity
ρ	=	density
σ	=	electrical conductivity
τα	=	relaxation time for temperature
τυ	=	relaxation time for flow
υ	=	kinematic viscosity
ωi	=	weighted factor in i-direction
	=	limiter function
Subscripts	=
c	=	cold
f	=	fluid
h	=	hot

Nomenclature

B	=	magnetic field
c	=	lattice speed
ci	=	discrete particle speeds
Cp	=	specific heat at constant pressure
F	=	external forces
f	=	density distribution functions
feq	=	equilibrium density distribution functions
g	=	internal energy distribution functions
geq	=	equilibrium internal energy distribution functions
gy	=	gravity
Ha	=	Hartman number
M	=	lattice number in y-direction
Ma	=	Mach number
Nu	=	Nusselt number
Pr	=	Prandtl number
Ra	=	Rayleigh number
Sx	=	entropy generation rate due x
T	=	temperature
TVD_S	=	hybrid TVD scheme with Superbee limiter
TVD_M	=	hybrid TVD scheme with Minmod limiter
u, v	=	velocity components in x- and y-directions
x, y	=	Cartesian coordinates
Greek letters	=
α	=	thermal diffusivity
β	=	thermal expansion coefficient
	=	magnetic field inclination angle
μ	=	dynamic viscosity
ρ	=	density
σ	=	electrical conductivity
τα	=	relaxation time for temperature
τυ	=	relaxation time for flow
υ	=	kinematic viscosity
ωi	=	weighted factor in i-direction
	=	limiter function
Subscripts	=
c	=	cold
f	=	fluid
h	=	hot

Notes

¹FHP.

²HPP.

³The model was also independently proposed by other authors.