The problem statement:
n variables and
k pairs. The variables can be distinct by assigning a value from 1 to
n to each variable. Each pair
p contain 2 variables and let the absolute difference between 2 variables in
abs(p). Define the upper bound of difference is
Find an assignment that minimize
Limit: n<=100 k<=1000
Each variable appear at least 2 times in list of pairs.
A problem instance: Input n=9, k=12 1 2 (meaning pair x1 x2) 1 3 1 4 1 5 2 3 2 6 3 5 3 7 3 8 3 9 6 9 8 9 Output: 1 2 5 4 3 6 7 8 9 (meaning x1=1,x2=2,x3=5,...)
Explaination: An assignment of
x1=1,x2=2,x3=3,... will result in
U=6 (3 9 has greastest abs value). The output assignment will get
U=4, the minimum value (changed pair:
3 7 => 5 7, 3 8 => 5 8, etc. and 3 5 isn't changed. In this case,
abs(p)<=4 for every pair).
There is an important point: To achieve the best assignments, the variables in the pairs that have greatest abs must be change.
Base on this, I have thought of a greedy algorithm:
1)Assign every x to default assignment (x(i)=i) 2)Locate pairs that have largest abs and x(i)'s contained in them. 3)For every i,j: Calculate U. Swap value of x(i),x(j). Calculate U'. If U'<U, stop and repeat step 3. If U'>=U for every i,j, end and output the assignment.
However, this method has a major pitfall, if we need an assignment like this:
x(a)<<x(b), x(b)<<x(c), x(c)<<x(a)
, we have to swap in 2 steps, like:
x(b)<=>x(c), then there is a possibility that
x(b)<<x(a) in first step has its abs become larger than U and the swap failed.
Is there any efficient algorithm to solve this problem?