Critical behavior of random surfaces in one dimension

Joseph Polchinski

doi:10.1016/0550-3213(90)90280-q

Keywords

Dimension (graph theory)Critical dimensionScalingLogarithmStatistical physicsMathematicsRandom fieldField (mathematics)PhysicsStatisticsMathematical analysisGeometryCombinatoricsPure mathematicsQuantum mechanics

Affiliated Institutions

The University of Texas at Austin US

Related Publications

Field-theoretic techniques and critical dynamics. II. Ginzburg-Landau stochastic models with energy conservation

E. Brézin , C. De Dominicis

The critical dynamics of a stochastic Ginzburg-Landau model of an $N$-component order parameter coupled to a conserved-energy-density field is studied with the help of field-the...

1975 Physical review. B, Solid state 55 citations

High-Dimensional Probability

Roman Vershynin

High-dimensional probability offers insight into the behavior of random vectors, random matrices, random subspaces, and objects used to quantify uncertainty in high dimensions. ...

2018 Cambridge University Press eBooks 1143 citations

Feynman-Graph Expansion for the Equation of State near the Critical Point

E. Brézin , D. J. Wallace , Kenneth G. Wilson

The scaling equation of state for a generalized classical Heisenberg ferromagnet near the critical point is derived by an expansion in $\ensuremath{\epsilon}=4\ensuremath{-}d$, ...

1973 Physical review. B, Solid state 268 citations

High-Dimensional Probability: An Introduction with Applications in Data Science

Roman Vershynin

High-dimensional probability offers insight into the behavior of random vectors, random matrices, random subspaces, and objects used to quantify uncertainty in high dimensions. ...

2018 1094 citations

Surface tension, roughening, and lower critical dimension in the random-field Ising model

G. Grinstein , Shang-keng Ma

A continuum interface model is constructed to study the low-temperature properties of domain walls in the random-field Ising model (RFIM). The width of the domain wall and its s...

1983 Physical review. B, Condensed matter 198 citations

Publication Info

Year: 1990
Type: article
Volume: 346
Issue: 2-3
Pages: 253-263
Citations: 116
Access: Closed

External Links

View on DOI.org

Social Impact

Altmetric

Critical behavior of random surfaces in one dimension

PlumX Metrics

Social media, news, blog, policy document mentions

Citation Metrics

116

OpenAlex

Cite This

APA Style

                            
                                    Joseph Polchinski
                                
                            (1990). 
                            Critical behavior of random surfaces in one dimension. 
                            Nuclear Physics B
                            , 346
                            (2-3)
                            , 253-263.
                            https://doi.org/10.1016/0550-3213(90)90280-q

Identifiers

DOI: 10.1016/0550-3213(90)90280-q