OCENE ŠVARC-PIKOVOG TIPA ZA HARMONIJSKA PRESLIKAVANJA I HIPERBOLIČKA METRIKA

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OCENE ŠVARC-PIKOVOG TIPA ZA HARMONIJSKA PRESLIKAVANJA I HIPERBOLIČKA METRIKA

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dc.contributor.advisor Mateljević, Miodrag
dc.contributor.author Svetlik, Marek
dc.date.accessioned 2021-01-12T17:15:58Z
dc.date.available 2021-01-12T17:15:58Z
dc.date.issued 2020
dc.identifier.uri http://hdl.handle.net/123456789/5091
dc.description.abstract In this dissertation we consider various versions of the Schwarz lemma and theSchwarz-Pick lemma for holomorphic, harmonic and harmonic quasiregular mappings. Inaddition, in order to present new results, an overview of the results that can be considered asclassical is given. As one of the most important consequence of the Schwarz-Pick lemma forholomorphic mappings, an introduction of the hyperbolic distancedΩon the simply connecteddomainsΩ C(such thatΩ6=C) is given in details, as well as the connection of that distanceand holomorphic mappings. All versions of the Schwarz lemma and the Schwarz-Pick lemma for harmonic mappingsare shown as assertions analogous to the corresponding claims for holomorphic mappings.In the proofs of these assertions, the properties of the hyperbolic distance and Euclideanproperties of hyperbolic disks are used. Firstly, we considered some versions of the Schwarzlemma for harmonic mappings from the unit disk to the interval (-1,1) and then for harmonicmappings of the unit disk into itself, without the assumption thatz= 0is mapped to itself bythe corresponding map. Thereby, the corresponding inequalities were shown to be sharp andextremal mappings were found. By using the strip and half plane method, simple proofs ofthe Schwarz-Pick lemma for real-valued harmonic mappings are given, as well as the simpleproofs of their corollaries that are formulated in terms of corresponding hyperbolic distances.For both holomorphic and harmonic mappings a version of the Schwarz lemma have beenformulated and proved in the case where the values of these mappings and values of thenorms of their differentials, at the pointz= 0, are given. Also, in that case we showed thatthe corresponding inequalities are sharp and extremal mappings were found. It has also beenshown that the same methods can be used to obtain Harnack’s inequalities for harmonicmappings, as well as for their generalizations.Furthermore, we give simple proofs of a version of the Schwarz-Pick lemma for harmonicquasiregular mappings whose codomain is a half plane or a strip. One version of the Schwarzlemma for harmonic quasiregular mappings from the unit disk into a strip is obtained thanksto the appropriate (which seems unexpected) inequality satisfied by the Euclidean and hyper-bolic distances on the strip. By using the properties of the Gaussian curvature we also showthat harmonic quasiconformal mappings of the hyperbolic domain into convex hyperbolicdomain are quasi-isometries of the corresponding metric spaces.The introduction of the hyperbolic distance is shown in two ways. The first way is classi-cal one. Starting from the hyperbolic metric on the unit disk, first we define the hyperboliclength of theC1curve and then the hyperbolic distance between two given points. Thesecond one is based on the axiomatic foundation of the absolute plane geometry. Startingfrom the theorem related to the existence and the uniqueness (up to the unit for length) ofthe distance in the absolute plane (which is in accordance with the basic geometry relations- between and congruence), we simultaneously derive the formula for that distance in twomodels of that plane. One of these models is the set of complex numbersC, observed as amodel of the Euclidean plane and the second one is the unit disk that is considered as thePoincaré disk model of hyperbolic plane. en_US
dc.description.provenance Submitted by Slavisha Milisavljevic (slavisha) on 2021-01-12T17:15:58Z No. of bitstreams: 1 svetlik_marek-phd.pdf: 1279604 bytes, checksum: cc83f1d59257376db8ce69b0fd466584 (MD5) en
dc.description.provenance Made available in DSpace on 2021-01-12T17:15:58Z (GMT). No. of bitstreams: 1 svetlik_marek-phd.pdf: 1279604 bytes, checksum: cc83f1d59257376db8ce69b0fd466584 (MD5) Previous issue date: 2020 en
dc.language.iso sr en_US
dc.publisher Beograd en_US
dc.title OCENE ŠVARC-PIKOVOG TIPA ZA HARMONIJSKA PRESLIKAVANJA I HIPERBOLIČKA METRIKA en_US
mf.author.birth-date 1983-10-25
mf.author.birth-place Beograd en_US
mf.author.birth-country Srbija en_US
mf.author.residence-state Srbija en_US
mf.author.citizenship Srpsko en_US
mf.subject.area Mathematics en_US
mf.subject.keywords The Schwarz lemma, the Schwarz-Pick lemma, harmonic mappings, quasiregu-lar mappings, quasiconformal mappings, hyperbolic metric, Gaussian curvature, the Ahlforslemma, quasi-isometry. en_US
mf.subject.subarea Complex Analysis en_US
mf.contributor.committee Knežević, Miljan
mf.contributor.committee Arsenović, Miloš
mf.contributor.committee Božin, Vladimir
mf.contributor.committee Gajić, Borislav
mf.university.faculty Mathematical faculty en_US
mf.document.references 81 en_US
mf.document.pages 109 en_US
mf.document.location Belgrade en_US
mf.document.genealogy-project No en_US
mf.university Belgrade University en_US

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