Uniform Boundedness of Crossing Probabilities Implies Hyperscaling
- Christian Borgs ,
- Jennifer Chayes ,
- H. Kesten ,
- J. Spencer
Random Structures and Algorithms 15 |
We consider bond percolation on the d-dimensional hypercubic lattice. Assuming the existence of a single critical exponent, the exponent ρ describing the decay rate of point-to-plane crossings at the critical point, we prove that hyperscaling holds whenever critical rectangle crossing probabilities are uniformly bounded away from 1.