Cultural advice

The Australian National University acknowledges, celebrates and pays our respects to the Ngunnawal and Ngambri people of the Canberra region and to all First Nations Australians on whose traditional lands we meet and work, and whose cultures are among the oldest continuing cultures in human history.

Aboriginal and Torres Strait Islander peoples are advised that ANU Library collections may include images, names, voices, and other representations of deceased persons.

Material in the collection may contain terms, language or views that reflect the period in which the item was created and may be considered inappropriate today.

Inverse Lienard-Chipart Problem

dc.contributor.authorAnderson, Brian D.O.en
dc.contributor.authorJury, E. I.en
dc.date.accessioned2026-01-02T21:41:13Z
dc.date.available2026-01-02T21:41:13Z
dc.date.issued1976en
dc.description.abstractAn inverse Lienard-Chipart problem is posed. It is shown that, in contrast to the inverse Hurwitz problem, it is not solvable using rational formulas.en
dc.description.statusPeer-revieweden
dc.format.extent1en
dc.identifier.issn0018-9286en
dc.identifier.otherORCID:/0000-0002-1493-4774/work/174739942en
dc.identifier.scopus84942391499en
dc.identifier.urihttps://hdl.handle.net/1885/733803114
dc.language.isoenen
dc.sourceIEEE Transactions on Automatic Controlen
dc.titleInverse Lienard-Chipart Problemen
dc.typeJournal articleen
dspace.entity.typePublicationen
local.bibliographicCitation.startpage426en
local.contributor.affiliationAnderson, Brian D.O.; University of Newcastleen
local.contributor.affiliationJury, E. I.; University of Newcastleen
local.identifier.citationvolume21en
local.identifier.doi10.1109/TAC.1976.1101203en
local.identifier.pure2815d2a5-0c74-4756-88de-bcdaa47b9ad3en
local.identifier.urlhttps://www.scopus.com/pages/publications/84942391499en
local.type.statusPublisheden

Downloads