Modification of the LS-STAG Immersed Boundary Method for Simulating Turbulent Flows

ISSN 1812-3368. Вестник МГТУ им. Н.Э. Баумана. Сер. Естественные науки. 2017. № 5

23

The following designations are introduced in Table 2:





is the Spalart —

Allmaras (S-A) working variable [4];



is the dissipation rate of the turbulent kinetic

energy

;

k



is the specific dissipation rate of

;

k

4

1

2

2

500 3.424

= tanh min max

,

,

;

0.09

w w

k w

k

k

F

d d CD d















































 





























20

= max( ,10 );

k

k

CD

D







1.712 =

;

k

k

D



 



2

= 0.1355[1 ] ;

t

P

f S



 

 

2 0.5

2

=1.2

;

t

f

e

 

= ;









2

2

=

;

0.1681

turb

u v

S

f

y x

l



 



 

 





2

1

=1

;

1

f

f









 

3

1 3

=

;

357.911

f





 

=

;

t

t

t

xx

yy

xy

u

v

u v

P

x

y

y x







  





 

 

 







  







2

2

= 3.2391 0.8061

;

w

t

turb

D

f

f

l



 



 

 



1/6

6

65

=

;

64

w

f

g

g







  



6

= 0.3(

);

g r

r r

 

2

= min

,10 ;

0.1681

turb

r

Sl



















1

2

= max 0.31 ,

;

u v

G

F

y x





 

 





 





2

2

2

2

500

= tanh max

,

.

0.09

w w

k

F

d d





























 





















Modification of the LS-STAG immersed boundary method.

The Cartesian

mesh with cells

,

1

1

=( , ) ( ,

)

i j

i

i

j

j

x x y y









is introduced in the rectangular

computational domain



.

It is denoted that

,

i j



is the face of

,

i j



cell and

,

= ( , )

c

c c

i

i j

j

x y

x

is the center of this cell, which is called "base mesh". Pressure is

computed in the center of

,

.

i j



Unknown components

,

i j

u

and

,

i j

v

of velocity vector

v

are computed in the middle of fluid parts of the cell faces. These points are

the centers of control volumes

1

1

,

= ( ,

) ( ,

)

u

c c

j

j

i

i

i j

x x

y y









(

x

-mesh) and

,

=

v

i j



1

1

( ,

) ( ,

)

c c

i

i

j

j

x x y y









(

y

-mesh) with faces

,

u

i j



and

,

v

i j



and squares

x

ij

M

and

,

,

y

i j

M

respectively (Fig. 2).

The level-set function

= ( ) = ( , )

x y

  

r

[9] is used for immersed boundary

ib



description [2]:

( ) < 0,

= \ {

};

( ) = 0,

;

( ) > 0,

.

f

ib

ib

ib

ib



   









r

r

r

r

r

r