Self-Repelling Elastic Manifolds with Low Dimensional Range

Abstract

We consider self-repelling elastic manifolds with a domain [-N,N]d Zd, that take values in RD. Our main result states that when the dimension of the domain is d=2 and the dimension of the range is D=1, the effective radius RN of the manifold is approximately N4/3. This verifies the conjecture of Kantor, Kardar and Nelson [7]. Our results for the case where d ≥ 3 and D <d give a lower bound on RN of order N1D (d-2(d-D)D+2 ) and an upper bound proportional to Nd2+d-DD+2. These results imply that self-repelling elastic manifolds with a low dimensional range undergo a significantly stronger stretching than in the case where d=D, which was studied by the authors in [10].