Normal view
MARC view
Entry Topical Term
000 - LEADER
- fixed length control field: 01462nz 2200229n 4500
000 - LEADER
- fixed length control field: 1
001 - CONTROL NUMBER
- control field: 34208
003 - CONTROL NUMBER IDENTIFIER
- control field: P5A
005 - DATE AND TIME OF LATEST TRANSACTION
- control field: 20221101114442.0
008 - FIXED-LENGTH DATA ELEMENTS
- fixed length control field: 880825|| anannbab| |a ana |||||
010 ## - LIBRARY OF CONGRESS CONTROL NUMBER
- LC control number: sh 88005213
035 ## - SYSTEM CONTROL NUMBER
- System control number: oca02390550
040 ## - CATALOGING SOURCE
- Original cataloging agency: DLC
- Transcribing agency: DLC
150 ## - HEADING--TOPICAL TERM
- Topical term or geographic name entry element: Limit cycles.
670 ## - SOURCE DATA FOUND
- Source citation: Work cat.: Ch½in, Y.-H. Ordinary differential equations and Hilbert's 16th problem, 1988:
- Information found: CIP galley (limit cycles: isolated closed solution curves as limiting positions of their neighboring solution curves)
670 ## - SOURCE DATA FOUND
- Source citation: Yeh, Y.-C. Theory of limit cycles, c1986.
670 ## - SOURCE DATA FOUND
- Source citation: McGraw-Hill dict. sci. tech.
- Information found: (limit cycle of a differential equation: a closed trajectory C in the plane (corresponding to a periodic solution of the equation) where every point of C has a neighborhood so that every trajectory through it spirals toward C)
670 ## - SOURCE DATA FOUND
- Source citation: Math. subj. classif.
- Information found: (Global analysis, analysis on manifolds, 58-XX; Ordinary differential equations on manifolds, dynamical systems, 58Fxx; Limit cycles, etc., 58F21; Ordinary differential equations, 34-XX; Qualitative theory, 34Cxx; Location of integral curves, singular points, limit cycles, 34C05)
670 ## - SOURCE DATA FOUND
- Source citation: Encyc. dict. math.:
- Information found: p. 496, under Dynamical systems (limit cycles)
670 ## - SOURCE DATA FOUND
- Source citation: Compumath cit. index.
675 ## - SOURCE DATA NOT FOUND
- Source citation: Random House;
- Source citation: James. Math. dict.;
- Source citation: Web. 3