# Algorithm to find the order of evaluation of multiple equations

I have the text content full of expressions like:

``````a = 1
d = b + c
b = a * c
c = 2 - a
...
``````

This expressions may be written in random order. I can extract each of these expressions and evaluate each of them but I need to find optimal algorithm to avoid circular evaluations like:

``````a = 1
d = ? (skip)
b = ? (skip)
c = 2 - a = 1
...
d = ? (skip)
b = a * c = 1
...
d = b + c = 2
...
``````

Is there the way "to order" the equations by the involved arguments to avoid extra calculation passes by like:

``````a = 1
c = 2 - a = 1
b = a * c = 1
d = b + c = 2
...
``````

?

-
I suppose there's always a solution, you will never face a situation like [a=b;b=a] or [a=1;a=2] ? –  Kwariz Sep 23 '12 at 8:30
@Kwariz You are absolutely right. There might be situations like you mentioned. Even cross references might be. But I simplified the question just for basic algorithm. Thank you for correction! –  Ruben Kazumov Sep 23 '12 at 20:19

For each expression, create a node in a graph, where the incoming edges are the other expressions it depends upon. Then use a topological sort to determine the evaluation order.

Example:

Expressions:

``````a = 1
d = b + c
b = a * c
c = 2 - a
``````

Graph nodes:

``````a()
d(b,c)
b(a,c)
c(a)
``````

Topological sort:

``````begin
process a
process a's dependencies (none)
output a
mark a as done
process d
process d's dependencies
process b
process b's dependencies
process c
process c's dependencies
output c
mark c as done
output b
mark b as done
output d
mark d as done
``````a c b d
It's actually recursive call of some kind of `process_variable()` function. Thank you! –  Ruben Kazumov Sep 23 '12 at 20:13