Quantum Iterated Function Systems

A. Lasota; A. Lasota; A. Ostruszka; A. Uhlmann; A. Uhlmann; A. Łoziński; A.H. Fan; Artur Łoziński; D. Petz; D. Wójcik; D.J.C. Bures; G. Lindblad; G. Paladin; G. Radons; I. Guarneri; J. Keating; J. Kwapień; J.H. Elton; K. Kraus; K. Życzkowski; K.-S. Lau; Karol Życzkowski; L. Yu; M. Hübner; M. Kuś; M. Ozawa; M. Saraceno; M.-D. Choi; M.B. Ruskai; M.F. Barnsley; M.F. Barnsley; M.F. Barnsley; N.L. Balazs; P. Góra; P. Pakoński; P.M. Alberti; Ph. Blanchard; Ph. Blanchard; R. Omnès; R. Scharf; R.O. Vallejos; S. De Bièvre; S. De Bièvre; T. Kaijser; T. Szarek; W. Słomczyński; W. Słomczyński; W. Słomczyński; Wojciech Słomczyński

research

Quantum Iterated Function Systems

Abstract

Iterated functions system (IFS) is defined by specifying a set of functions in a classical phase space, which act randomly on an initial point. In an analogous way, we define a quantum iterated functions system (QIFS), where functions act randomly with prescribed probabilities in the Hilbert space. In a more general setting a QIFS consists of completely positive maps acting in the space of density operators. We present exemplary classical IFSs, the invariant measure of which exhibits fractal structure, and study properties of the corresponding QIFSs and their invariant states.Comment: 12 pages, 1 figure include

Similar works

Full text

Available Versions

Jagiellonian Univeristy Repository

oai:ruj.uj.edu.pl:item/83296

Last time updated on 28/10/2019

Crossref

Last time updated on 17/02/2019