# 0-1 optimization with absolute value (equiv., with two inequalities)

The `bintprog` command from the Optimization Toolbox solves 0-1 programming problems with an inequality constraint and an optional equality constraint: Ax <= b where A is a matrix and b a column vector.

I have a problem of the form |Ax| <= b, or equivalently, -b <= Ax <= b. Is there a way to solve this sort of problem with Matlab?

-

This is very easy:

You have `|Ax| <= b`. This is equivalent to (as you yourself noted) to `-b <= Ax <= b`.
So, you have additional inequality constraints: `Ax <= b` and `-Ax <= b`.
Thus you have over all `AA = [ A ; -A ]` and `bb = [b;b]` defining your abs-value constraints:

``````x = bintprog( f, AA, bb );
``````
-
Looks like you beat me to an identical answer by 43 seconds! Nice job. What's the etiquette here with two identical answer? Should I delete mine? –  raoulcousins Jun 13 '13 at 17:26
@raoulcousins: Please keep it! –  Charles Jun 13 '13 at 18:37
@denis indeed - thanks for the catch! –  Shai Jul 11 '13 at 14:55

With size(A) = [n,m], your constraints are of the form

``````for each {i in 1..m}
-b <= sum {j in 1..n} a_{ij} * x_{ij} <= b
``````

this is the same as two sets of constraints

``````for each {i in 1..m}
sum {j in 1..n} a_{ij} * x_{ij} <= b
sum {j in 1..n} a_{ij} * x_{ij} >= -b
``````

Since you have to write it in the form Ax <= b, it would look like

``````for each {i in 1..m}
sum {j in 1..n} a_{ij} * x_{ij} <= b
sum {j in 1..n} -a_{ij} * x_{ij} <= b
``````

In MATLAB, given your original A and b, you can make these "doubled" constraint matrices with

``````A = [A; -A];
b = [b; b];
``````

and solve your integer program with these new (A,b).

-