Generalized quantum exponential function and its applications

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dc.contributor.author Burcu Silindir
dc.contributor.author Ahmet Yantir
dc.date.accessioned 2025-10-06T16:20:48Z
dc.date.issued 2019
dc.description.abstract This article aims to present (qh) analogue of exponential function which unifies extends h-and q-exponential functions in a convenient and efficient form. For this purpose we introduce generalized quantum binomial which serves as an analogue of an ordinary polynomial. We state (q h) analogue of Taylor series and introduce generalized quantum exponential function which is determined by Taylor series in generalized quantum binomial. Furthermore we prove existence and uniqueness theorem for a first order linear homogeneous IVP whose solution produces an infinite product form for generalized quantum exponential function. We conclude that both representations of generalized quantum exponential function are equivalent. We illustrate our results by ordinary and partial difference equations. Finally we present a generic dynamic wave equation which admits generalized trigonometric hyperbolic type of solutions and produces various kinds of partial differential/difference equations.
dc.identifier.doi 10.2298/FIL1915907S
dc.identifier.issn 0354-5180
dc.identifier.issn 2406-0933
dc.identifier.uri http://dx.doi.org/10.2298/FIL1915907S
dc.identifier.uri https://gcris.yasar.edu.tr/handle/123456789/6557
dc.language.iso English
dc.publisher UNIV NIS FAC SCI MATH
dc.relation.ispartof Filomat
dc.source FILOMAT
dc.subject Delta (q h)-derivative, (q h)-binomial, (q h)-Taylor series, (q h)-exponential function, (q h)-analogue of wave equation
dc.subject ANALOG
dc.title Generalized quantum exponential function and its applications
dc.type Article
dspace.entity.type Publication
gdc.bip.impulseclass C5
gdc.bip.influenceclass C5
gdc.bip.popularityclass C4
gdc.coar.type text::journal::journal article
gdc.collaboration.industrial false
gdc.description.endpage 4922
gdc.description.startpage 4907
gdc.description.volume 33
gdc.identifier.openalex W3092404503
gdc.index.type WoS
gdc.oaire.accesstype GOLD
gdc.oaire.diamondjournal false
gdc.oaire.impulse 1.0
gdc.oaire.influence 2.9522884E-9
gdc.oaire.isgreen true
gdc.oaire.keywords Dynamic equations on time scales or measure chains
gdc.oaire.keywords Real analysis on time scales or measure chains
gdc.oaire.keywords Difference equations, scaling (\(q\)-differences)
gdc.oaire.keywords \((q, h)\)-exponential function
gdc.oaire.keywords \((q, h)\)-analogue of wave equation
gdc.oaire.keywords delta \((q, h)\)-derivative
gdc.oaire.keywords \((q, h)\)-Taylor series
gdc.oaire.keywords \((q, h)\)-binomial
gdc.oaire.popularity 6.3269296E-9
gdc.oaire.publicfunded false
gdc.oaire.sciencefields 0101 mathematics
gdc.oaire.sciencefields 01 natural sciences
gdc.openalex.collaboration National
gdc.openalex.fwci 1.1512
gdc.openalex.normalizedpercentile 0.78
gdc.opencitations.count 10
gdc.plumx.crossrefcites 3
gdc.plumx.scopuscites 18
oaire.citation.endPage 4922
oaire.citation.startPage 4907
person.identifier.orcid SILINDIR YANTIR- BURCU/0000-0001-5694-9977, Yantir- Ahmet/0000-0002-4855-1691
publicationissue.issueNumber 15
publicationvolume.volumeNumber 33
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relation.isOrgUnitOfPublication.latestForDiscovery ac5ddece-c76d-476d-ab30-e4d3029dee37

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