The GM-MDS conjecture
A k×n matrix (k<n) is an MDS matrix if any k columns in it are linearly independent. There are standard constructions of MDS matrices, such as Vandermonde matrices, which used for error correcting codes (they generate Reed-Solomon codes). There is interest in the coding community in *sparse* MDS matrices, with specific coordinates set to zero based on the underlying code topology. A natural question arises: when do these exist? It turns out that there is a simple combinatorial condition which is both necessary and sufficient over exponentially large fields. The GM-MDS conjecture of Dau, Song and Yuen (ISIT 2014) is that the same combinatorial conditions suffice over much smaller fields (of size linear in k,n instead of exponential). In this work, we resolve this conjecture.