Normal view
MARC view
Entry Topical Term
000 - LEADER
- fixed length control field: 01308nz 2200193n 4500
000 - LEADER
- fixed length control field: 1
001 - CONTROL NUMBER
- control field: 31915
003 - CONTROL NUMBER IDENTIFIER
- control field: P5A
005 - DATE AND TIME OF LATEST TRANSACTION
- control field: 20221101114414.0
008 - FIXED-LENGTH DATA ELEMENTS
- fixed length control field: 970827|| anannbab| |a ana |||||
010 ## - LIBRARY OF CONGRESS CONTROL NUMBER
- LC control number: sh 97006613
035 ## - SYSTEM CONTROL NUMBER
- System control number: oca04478222
040 ## - CATALOGING SOURCE
- Original cataloging agency: DLC
- Transcribing agency: DLC
053 ## - LC CLASSIFICATION NUMBER
- Classification number element-single number or beginning number of span: QA614.85
150 ## - HEADING--TOPICAL TERM
- Topical term or geographic name entry element: Symbolic dynamics.
670 ## - SOURCE DATA FOUND
- Source citation: Work cat.: 97-39657: Kitchens, B.P. Symbolic dynamics, c1997:
- Information found: CIP pref. (In the 1930's and 1940's Hedlund and Morse used infinite sequences to investigate geodesics on surfaces of negative curvature. They coined the term symbolic dynamics and began to study sequence spaces with the shift transformation as dynamical systems)
670 ## - SOURCE DATA FOUND
- Source citation: Encyc. math.
- Information found: (symbolic dynamics: 1) in the narrow sense is the investigation of the topological Bernoulli automorphism [sigma], its invariant closed subsets, its invariant measures, etc.; 2) in the broad sense is the application of symbolic dynamics in the narrow sense to the investigation of dynamical systems which themselves are defined completely independently of [omega] and [sigma])
670 ## - SOURCE DATA FOUND
- Source citation: LC database, Aug. 27, 1997
- Information found: (symbolic dynamics)
675 ## - SOURCE DATA NOT FOUND
- Source citation: Encyc. dict. math.;
- Source citation: James math. dict.;
- Source citation: Math. subj. classif.;
- Source citation: McGraw-Hill dict. sci. tech.
950 ## -
- : g
- : Differentiable dynamical systems