Articoli in riviste
|Radial Fredholm perturbation in the two-dimensional Ising model and gap-exponent relation|
|Karevski D, Turban L, Igloi F|
|Journal of Physics A: Mathematical and General 28 (1995) 3925-3934|
|DOI : 10.1088/0305-4470/28/14/013|
|ArXiv : cond-mat/9505111 [PDF]|
|HAL : hal-00421995|
We consider concentric circular defects in the two-dimensional Ising model, which are distributed according to a generalized Fredholm sequence, i. e. at exponentially increasing radii. This type of aperiodicity does not change the bulk critical behaviour but introduces a marginal extended perturbation. The critical exponent of the local magnetization is obtained through finite-size scaling, using a corner transfer matrix approach in the extreme anisotropic limit. It varies continuously with the amplitude of the modulation and is closely related to the magnetic exponent of the radial Hilhorst-van Leeuwen model. Through a conformal mapping of the system onto a strip, the gap-exponent relation is shown to remain valid for such an aperiodic defect.