Optimal Staged Self-Assembly of General Shapes

Abstract

We analyze the number of tile types t, bins b, and stages necessary to assemble n × n squares and scaled shapes in the staged tile assembly model. For n × n squares, we prove O(n - tb - t tb2 + b t) stages suffice and (n - tb - t tb2) are necessary for almost all n. For shapes S with Kolmogorov complexity K(S), we prove O(K(S) - tb - t tb2 + b t) stages suffice and (K(S) - tb - t tb2) are necessary to assemble a scaled version of S, for almost all S. We obtain similarly tight bounds when the more powerful flexible glues are permitted.