CONTINUUM MODELS OF DIRECTED POLYMERS ON DISORDERED DIAMOND FRACTALS IN THE CRITICAL CASE
成果类型:
Article
署名作者:
Clark, Jeremy Thane
署名单位:
University of Mississippi
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/22-AAP1783
发表日期:
2022
页码:
4186-4250
关键词:
hierarchical lattice
regime
摘要:
We construct and study a family of random continuum polymer mea-sures Mr corresponding to limiting partition function laws recently derived in a weak-coupling regime for polymer models on hierarchical graphs with marginally relevant disorder. The continuum polymers, which we refer to as directed paths, are identified with isometric embeddings of the unit interval [0, 1] into a compact diamond fractal having Hausdorff dimension two, and there is a natural uniform probability measure, mu, over the space of directed paths, I'. Realizations of the random path measures Mr exhibit strong local-ization properties in comparison to their subcritical counterparts in which the diamond fractal has dimension less than two. Whereas two paths p, q is an element of I' sampled independently using the pure measure mu have only finitely many in-tersections with probability one, a realization of the disordered product mea-sure Mr x Mr a.s. assigns positive weight to the set of pairs of paths (p, q) whose intersection sets are uncountable but of Hausdorff dimension zero. We give a more refined characterization of the size of these dimension-zero sets using generalized (logarithmic) Hausdorff measures. The law of the random measure Mr cannot be constructed as a subcritical Gaussian multiplicative chaos because the coupling strength to the Gaussian field would, in a formal sense, have to be infinite.