Kardar-Parisi-Zhang physics in integrable rotationally symmetric dynamics on discrete space-time lattice

Žiga Krajnik (Avtor), Tomaž Prosen (Avtor)

Povzetek

We introduce a deterministic SO(3) invariant dynamics of classical spins on a discrete space–time lattice and prove its complete integrability by explicitly finding a related non-constant (baxterized) solution of the set-theoretic Yang–Baxter equation over the 2-sphere. Equipping the algebraic structure with the corresponding Lax operator we derive an infinite sequence of conserved quantities with local densities. The dynamics depend on a single continuous spectral parameter and reduce to a (lattice) Landau–Lifshitz model in the limit of a small parameter which corresponds to the continuous time limit. Using quasi-exact numerical simulations of deterministic dynamics and Monte Carlo sampling of initial conditions corresponding to a maximum entropy equilibrium state we determine spin-spin spatio-temporal (dynamical) correlation functions with relative accuracy of three orders of magnitude. We demonstrate that in the equilibrium state with a vanishing total magnetization the correlation function precisely follows Kardar–Parisi–Zhang scaling hence the spin transport belongs to the universality class with dynamical exponent z=3/2, in accordance to recent related simulations in discrete and continuous time quantum Heisenberg spin 1/2 chains.

Ključne besede

statistična fizika;integrabilni sistemi;spinske verige;spinski transport;statistical physics;integrable systems;spin chains;spin transport;

Podatki

Jezik:	Angleški jezik
Leto izida:	2020
Tipologija:	1.01 - Izvirni znanstveni članek
Organizacija:	UL FMF - Fakulteta za matematiko in fiziko
UDK:	536.9
COBISS:	23775747
ISSN:	0022-4715
Št. ogledov:	410
Št. prenosov:	160
Ocena:	0 (0 glasov)
Metapodatki:

Ostali podatki

Sekundarni jezik:	Slovenski jezik
Sekundarne ključne besede:	statistična fizika;integrabilni sistemi;spinske verige;spinski transport;
Strani:	str. 110-130
Letnik:	ǂVol. ǂ179
Zvezek:	ǂiss. ǂ1
Čas izdaje:	2020
DOI:	10.1007/s10955-020-02523-1
ID:	11924498