O PRSTENU TRIGONOMETRIJSKIH POLINOMA SA PRIMENAMA U TEORIJI ANALITIČKIH NEJEDNAKOSTI

eLibrary

 
 

O PRSTENU TRIGONOMETRIJSKIH POLINOMA SA PRIMENAMA U TEORIJI ANALITIČKIH NEJEDNAKOSTI

Show simple item record

dc.contributor.advisor Malešević, Branko
dc.contributor.author Makragić, Milica
dc.date.accessioned 2018-12-11T14:04:05Z
dc.date.available 2018-12-11T14:04:05Z
dc.date.issued 2018
dc.identifier.uri http://hdl.handle.net/123456789/4745
dc.description.abstract This doctoral dissertation comprises two parts. Trigonometric polynomial rings are the central topic of the first part of the dissertation. It is presented that the ring of complex trigonometric polynomials, C [cos x, sin x ], is a unique factorization domain, and that the ring of real trigonometric polynomials, R [cos x, sin x ], is not a unique factorization domain. Necessary and sufficient conditions for the case when in the ring C [cos x, sin x ], unlike the ring R [cos x, sin x ], the degree of the product of two trigonometric polynomials is not equal to the sum of degrees of its factors, are given. The theory of trigonometric polynomials is extended to hyperbolic-trigonometric polynomials, or HT-polynomials for short, which are defined similarly to trigonome- tric polynomials. Real or complex HT-polynomials form a ring and even an integral domain R [cosh x, sinh x ], or C [cosh x, sinh x ]. Factorization in these domains is con- sidered, and it is shown that these are unique factorization domains. The irreducible elements, as well as the form of the maximal ideals of both these domains are deter- mined. The algorithms for dividing, factoring, computing greatest common divisors, as well as the algorithms for simplifying ratios of two HT-polynomials are considered over the field of rational numbers. In the second part of the dissertation, related to applications, two methods of proving inequalities of the form f ( x ) > 0 are described over the given finite in- terval ( a,b ) ⊂ R , a ≤ 0 ≤ b , which by using the finite Maclaurin series expan- sion generate polynomial approximations, when the function f ( x ) is element of the ring extension of R [cos x, sin x ], or R [cosh x, sinh x ], denoted by R [ x, cos x, sin x ], or R [ x, cosh x, sinh x ]. The completeness of the presented methods is proved and the concrete results of these methods are illustrated through examples of proving actual inequalities. en_US
dc.description.provenance Submitted by Slavisha Milisavljevic (slavisha) on 2018-12-11T14:04:05Z No. of bitstreams: 1 Disertacija_Milica_Makragic.pdf: 2169981 bytes, checksum: 0b2970d155ecdb5ea85d502c384a0b2c (MD5) en
dc.description.provenance Made available in DSpace on 2018-12-11T14:04:05Z (GMT). No. of bitstreams: 1 Disertacija_Milica_Makragic.pdf: 2169981 bytes, checksum: 0b2970d155ecdb5ea85d502c384a0b2c (MD5) Previous issue date: 2018 en
dc.language.iso sr en_US
dc.publisher Beograd en_US
dc.title O PRSTENU TRIGONOMETRIJSKIH POLINOMA SA PRIMENAMA U TEORIJI ANALITIČKIH NEJEDNAKOSTI en_US
mf.author.birth-date 1986-11-25
mf.author.birth-place Kruševac en_US
mf.author.birth-country Srbija en_US
mf.author.residence-state Srbija en_US
mf.author.citizenship Srpsko en_US
mf.author.nationality Srpsko en_US
mf.subject.area Mathematics en_US
mf.subject.keywords integral domain, factorization, localization, trigonometric polynomial, hyperbolic-trigonometric polynomial, trigonometric inequalities, hyperbolic inequa- lities. en_US
mf.subject.subarea Algebra en_US
mf.contributor.committee Lipkovski, Aleksandar
mf.contributor.committee Petrović, Zoran
mf.contributor.committee Ikodinović, Nebojša
mf.university.faculty Mathematics faculty en_US
mf.document.references 110 en_US
mf.document.pages 142 en_US
mf.document.location Beograd en_US
mf.document.genealogy-project No en_US
mf.university Belgrade en_US

Files in this item

Files Size Format View
Disertacija_Milica_Makragic.pdf 2.169Mb PDF View/Open

This item appears in the following Collection(s)

Show simple item record