Ralph Kenna
Published 2012-05-18Version 1
By the early 1960's advances in statistical physics had established the existence of universality classes for systems with second-order phase transitions and characterized these by critical exponents which are different to the classical ones. There followed the discovery of (now famous) scaling relations between the power-law critical exponents describing second-order criticality. These scaling relations are of fundamental importance and now form a cornerstone of statistical mechanics. In certain circumstances, such scaling behaviour is modified by multiplicative logarithmic corrections. These are also characterized by critical exponents, analogous to the standard ones. Recently scaling relations between these logarithmic exponents have been established. Here, the theories associated with these advances are presented and expanded and the status of investigations into logarithmic corrections in a variety of models is reviewed.
Comments: Review prepared for the book "Order, Disorder, and Criticality. Vol. III", ed. by Yu. Holovatch and based on the Ising Lectures in Lviv. 48 pages, 1 figure
Logarithmic corrections to the free energy from sharp corners with angle $2π$
Logarithmic Corrections for Spin Glasses, Percolation and Lee-Yang Singularities in Six Dimensions
Logarithmic corrections in the two-dimensional Ising model in a random surface field
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