U,viJiThe set of relative throughpu

U,
vi
Ji
The set of relative throughputs, r , , c = 1 , 2 ,..., C
satisfies the set of C linear equations given by
relative service demand of class c;
relative service demand of all classes at
service center i;
set of classes belonging to service center i;
C
d=l
rc= x rdndc, c = 1 , 2 , . . . , c . ( 1 )
It can be seen that these equations are linearly
dependent and can only be solved to within a
multicative constant. Therefore they are not
sufficient to uniquely determine the relative
throughputs. By choosing any one relative
throughput, say rk, and setting it to a constant, say
1, we can obtain a set of linearly independent
equations. We can solve this set of equations using
usual methods such as Gaussian elimination to
obtain a set of relative throughputs.
The relative throughput at a service center is the
sum of the relative throughputs of those job classes
that require service from that center. It is given by
yi= C r c , i = 1 , 2 ,..., M. (2)
CE J,
The mean service demand at a service center is
given by
2 1 rcceJ.
Pc
Y i
S . = , i=1,2) ...)M . (3)
With the set of relative throughputs obtained and
the set of the mean service times given, we can
obtain the relative service demand for each class as
given by
(4)
and similarly the total relative service demand for
each service center as given by
1
CLC
u = r c - - , c = 1 ,2,. .. , C
vi= U,, i= 1,2 ,..., M. (5)
CE J,
From [7], it is known that the steady-state
probability for the distribution of the number of
jobs at the service centers has the following product
form:
l M
P(n1 ,n2,...,nM)=- n f i ( n i > (6)
G(N) i=l
where n 1 ,n2 ,... ,nM sum to N, and
f i (n ) = vl (7)