(Too lazy to use difference between the maximum and minimum entry in a row, I'll call that range.)
There are a lot of special cases one could take advantage of, one of which kills the apparent trivial worst case of one and the same value for each and every entry, where every row has a range of 0: when a range of 0 is found, searching for a lower one is excessive.
I suggest as a worst case a matrix filled row first with successive values "and extra space around the last one" - starting one column further down every row
1 2 3 5
11 7 8 9
15 17 13 14
, where the range is the same for every row, a lower range might exist (even with duplicates forbidden) and I don't see how to avoid inspecting each and every entry. For one, my favourite "trick" doesn't work:
For a newly found minimum range candidate, look at the next values in the columns containing the minimum and maximum entries, respectively: while the difference doesn't drop below the candidate, the range can't and rows can be skipped. (Another chance for identical values in a row to mess things up - please specify in the question whether they are permitted.)
Then, there are columns starting with a value that sorts after the last value of all other columns: these contribute row maxima (assuming ascending order). Likewise, columns with a last value to come before the first values of every other contribute row minima. (For unique values, weaker conditions suffice.)
You have to inspect every element
(Oliver Charlesworth) - well, if there was one column starting with a value that sorts after the last value of all other columns and another with a last value to come before the first values of every other, you would be done with 2(n-1) comparisons. (Not seeing how this might lead to a fast approach. "Someone" should establish/argue a worst case.)I have updated the question
sadly, so much that it invalidates previous answers, if not up-votes and favourites. I'd much prefer the modified question posted on its own and this one kept as it used to be, with additional specification about the permissibility of duplicate values.