Computer Science – Information Theory
Scientific paper
2011-11-14
Computer Science
Information Theory
30 pages, 15 figures
Scientific paper
What is the limit of information storage capacity of discrete spin systems? To answer this question, we study classical error-correcting codes which can be physically realized as the energy ground space of gapped local Hamiltonians. For discrete spin systems on a D-dimensional lattice governed by local frustration-free Hamiltonians, the following bound is known to hold; $kd^{1/D}\leq O(n)$ where k is the number of encodable logical bits, d is the code distance, and n is the total number of spins in the system. Yet, previously found codes were far below this bound and it remained open whether there exists an error-correcting code which saturates the bound or not. Here, we give a construction of local spin systems which saturate the bound asymptotically with $k \sim O(L^{D-1})$ and $d \sim O(L^{D-\epsilon})$ for an arbitrary small $\epsilon> 0$ where L is the linear length of the system. Our model borrows an idea from a fractal geometry arising in Sierpinski triangle.
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