Link to graph bandwidth resources

Gram-matrix-parameterization.md

@@ -31,4 +31,9 @@ For $G$ to be realizable as a Gram matrix, it's necessary for each dependent var
 
 1. The solution space has non-empty interior—or, equivalently, codimension zero.
 2. The solution space has empty interior—or, equivalently, positive codimension.
-3. The solution space is empty.
+3. The solution space is empty.
+
+### Choosing dependent variables
+
+* [Graph bandwidth](https://en.wikipedia.org/wiki/Graph_bandwidth)
+* [The Cuthill–McKee algorithm](https://en.wikipedia.org/wiki/Cuthill%E2%80%93McKee_algorithm)