How can I solve this PDE equation?
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∂c/∂t+Q∂c/∂v=Ri
R1=∑_(i=D)^G▒KFiCf
R2=KFDCF-∑_(i=N)^G▒KDiCD
R3=KFNCF+KDNCD-KNGCN
R4=KFG+KDGCD+KNGCN
I.C.: Ci(v,0)=Cis
B.C.: Q(0,t)=Qin &Ci(0,t)=Ci0
6 Comments
Walter Roberson
on 15 Oct 2016
Please also post an image of the equations. Your notation is not clear.
You seem to be using i as a subscript with D and G as scalars, a sum over variable i ranging from D to G. But then KDiCD would look to be K*Di*C*D for some unknown K and C, but that would imply that D should be subscripted.
In the definition of R1, you have Cf, and in some of the other places you have CF . Is that a mistake, that they should all be Cf ? Or is Cf a single variable and CF is C*F for some unknown C and F?
Please be clear as to what the parameters are of the system, what the different variable names are, and where the boundaries of the variable names are.
saeed karami
on 21 Oct 2016
saeed karami
on 21 Oct 2016
please see the second image
Walter Roberson
on 21 Oct 2016
Sometimes you use i to subscript, like in R_f and R_D, but what is R_i in the first equation?
In assigning to R_D is that using D as a numeric value like it is used in the definition of R_f ? Or in the definitions of R_f and R_d are D and G and N abstract symbols in some sorted order but non-numeric order not stated here ?
saeed karami
on 21 Oct 2016
Walter Roberson
on 21 Oct 2016
I do not know how to sum over a range of symbols unless the symbols have been ordered in some way. A summation over an unordered set of symbols is denoted by sigma variable_name element_of set; when you have sigma variable_name = value with upper value given, then it is assumed that the variables are orderable and vary by 1 -- e.g., i = N, i = N+1, i = N+2 ... i = G
Accepted Answer
Pritesh Shah
on 15 Oct 2016
0 votes
1 Comment
saeed karami
on 15 Oct 2016
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