Please use this identifier to cite or link to this item: http://hdl.handle.net/1942/46200
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dc.contributor.authorPalma-Marquez, Jesus-
dc.contributor.authorYEUNG, Melvin-
dc.date.accessioned2025-06-17T09:21:29Z-
dc.date.available2025-06-17T09:21:29Z-
dc.date.issued2025-
dc.date.submitted2025-06-04T09:45:40Z-
dc.identifier.citationNonlinearity, 38 (6) (Art N° 065001)-
dc.identifier.urihttp://hdl.handle.net/1942/46200-
dc.description.abstractWe study large classes of real-valued analytic functions that naturally emerge in the understanding of Dulac's problem, which addresses the finiteness of limit cycles in planar differential equations. Building on a maximum modulus-type result, our main statement essentially follows. Namely, for any function belonging to these classes, the following dichotomy holds: either it has isolated fixed points or it coincides with the identity. As an application, we prove that the non-accumulation of limit cycles holds for vector fields around a specific class of the so-called superreal polycycles.-
dc.description.sponsorshipWe would like to thank Dmitry Novikov for the insightful comments he provided during the several discussions we had about our work. In particular, we are grateful to him for explaining Ilyashenko’s version of Phragmén–Lindelöf principle to us. We sincerely thank the anonymous referee for their pertinent and useful remarks, which have significantly improved the clarity and presentation of this paper.-
dc.language.isoen-
dc.publisherIOP Publishing Ltd-
dc.rights2025 The Author(s). Published by IOP Publishing Ltd and the London Mathematical Society. Original Content from this work may be used under the terms of the Creative Commons Attribution 4.0 licence. Any further distribution of this work must maintain attribution to the author(s) and the title of the work, journal citation and DOI.-
dc.subject.otherCauchy-Heine transform-
dc.subject.otherDulac's problem-
dc.subject.otherlimit cycles-
dc.subject.otherPhragm & eacute-
dc.subject.othern-Lindel & ouml-
dc.subject.otherf principle-
dc.subject.otherStokes phenomenon-
dc.titleA maximum modulus theorem for functions admitting stokes phenomena, and specific cases of Dulac's theorem*-
dc.typeJournal Contribution-
dc.identifier.issue6-
dc.identifier.volume38-
local.format.pages22-
local.bibliographicCitation.jcatA1-
dc.description.notesPalma-Márquez, J (corresponding author), Weizmann Inst Sci, Rehovot, Israel.-
dc.description.notesjesus.palma@weizmann.ac.il; melvin.yeung@uhasselt.be-
local.publisher.placeTEMPLE CIRCUS, TEMPLE WAY, BRISTOL BS1 6BE, ENGLAND-
local.type.refereedRefereed-
local.type.specifiedArticle-
local.bibliographicCitation.artnr065001-
dc.identifier.doi10.1088/1361-6544/add703-
dc.identifier.isi001489430300001-
local.provider.typewosris-
local.description.affiliation[Palma-Marquez, Jesus] Weizmann Inst Sci, Rehovot, Israel.-
local.description.affiliation[Yeung, Melvin] Hasselt Univ, Campus Diepenbeek,Agoralaan Gebouw D, B-3590 Diepenbeek, Belgium.-
local.uhasselt.internationalyes-
item.contributorPalma-Marquez, Jesus-
item.contributorYEUNG, Melvin-
item.fullcitationPalma-Marquez, Jesus & YEUNG, Melvin (2025) A maximum modulus theorem for functions admitting stokes phenomena, and specific cases of Dulac's theorem*. In: Nonlinearity, 38 (6) (Art N° 065001).-
item.accessRightsOpen Access-
item.fulltextWith Fulltext-
crisitem.journal.issn0951-7715-
crisitem.journal.eissn1361-6544-
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