A Transfer Matrix for the Backbone Exponent of Two-Dimensional Percolation

Abstract

Rephrasing the backbone of two-dimensional percolation as a monochromatic path crossing problem, we investigate the latter by a transfer matrix approach. Conformal invariance links the backbone dimension Db to the highest eigenvalue of the transfer matrix T, and we obtain the result Db=1.6431 0.0006. For a strip of width L, T is roughly of size 23L, but we manage to reduce it to L!. We find that the value of Db is stable with respect to inclusion of additional ``blobs'' tangent to the backbone in a finite number of points.

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