I have an $n\times n$ matrix, and want to find a bijective function $h:[n^2] \to [n]\times [n]$ that can act as a hash function to map the numbers 1 through $n^2$ to row/column indices in my matrix. The additional property I'm looking for is that any two close input values should map to matrix indices that are far apart (in, say, the L1 norm). Thus, for a reasonably small set of integers $\{k,k+1,k+2,\ldots,k+d\} \subset [n^2]$, we should have that $\{h(k), h(k+1), h(k+2), \ldots, h(k+d)\}$ are a scattered set of matrix indices, none of which are close to each other.
I know that in the one dimensional version of this problem, where we have a length $n$ array instead of a matrix, we can get this scattering property using Fibonacci hashing: $$h(k) = \left\lfloor n \left(k\varphi \pmod{1}\right)\right\rfloor,$$
where $\varphi$ is the golden ratio, $\varphi=\tfrac{\sqrt5-1}{2}$. This is according to Knuth (The Art of Computer Programming Vol 3, 2nd edition, p. 514).
Might there be a way to extend Fibonacci hashing to a function with a similarly nice scattering property in two dimensions?
