
<ns0:uwmetadata xmlns:ns0="http://phaidra.univie.ac.at/XML/metadata/V1.0" xmlns:ns1="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0" xmlns:ns10="http://phaidra.univie.ac.at/XML/metadata/provenience/V1.0" xmlns:ns11="http://phaidra.univie.ac.at/XML/metadata/provenience/V1.0/entity" xmlns:ns12="http://phaidra.univie.ac.at/XML/metadata/digitalbook/V1.0" xmlns:ns13="http://phaidra.univie.ac.at/XML/metadata/etheses/V1.0" xmlns:ns2="http://phaidra.univie.ac.at/XML/metadata/extended/V1.0" xmlns:ns3="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/entity" xmlns:ns4="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/requirement" xmlns:ns5="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/educational" xmlns:ns6="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/annotation" xmlns:ns7="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/classification" xmlns:ns8="http://phaidra.univie.ac.at/XML/metadata/lom/V1.0/organization" xmlns:ns9="http://phaidra.univie.ac.at/XML/metadata/histkult/V1.0">
  <ns1:general>
    <ns1:identifier>o:1420</ns1:identifier>
    <ns1:title language="sr">Holomorfno projektivna preslikavanja generalisanih hiperboličkih Kelerovih prostora i uopštenja</ns1:title>
    <ns2:alt_title language="sr">Holomorphically projective mappings of generalized hyperbolic Kahler spaces and generalizations  : doctoral dissertation</ns2:alt_title>
    <ns1:language>sr</ns1:language>
    <ns1:description language="en">The thesis deals with manifolds with non-symmetric linear
connection, analyzes the properties of such manifolds with
respect to various mappings, but also discovers new manifolds
endowed with additional structures and examines their properties.
In such manner the thesis represents a continuation of
investigation on manifolds with non-symmetric linear connection.
Also, the thesis is a continuation of investigation in the field of
the mappings of manifolds with non-symmetric linear
connection, as well as infinitesimal deformations of such
manifolds. Particularly, generalized hyperbolic Kahler spaces are
defined as special generalized Riemannian spaces and
holomorphically projective mappings between such spaces are
considered. Manifolds with non-symmetric linear connection
admits five linearly independent curvature tensors. By using these
curvature tensors it is possible to consider geometric objects of
manifolds with non-symmetric linear connection which are
invariant with respect to various mappings.</ns1:description>
    <ns1:description language="sr">Spisak naučnih radova autora: list 108Biografija: list 107Lista imena: list 106.  Datum odbrane: 03.10.2017. Differential geometry</ns1:description>
    <ns2:identifiers>
      <ns2:identifier>1025541353</ns2:identifier>
    </ns2:identifiers>
    <ns2:identifiers>
      <ns2:resource>91552101</ns2:resource>
      <ns2:identifier>5453</ns2:identifier>
    </ns2:identifiers>
    <ns2:identifiers>
      <ns2:resource>91552100</ns2:resource>
      <ns2:identifier>1025541353</ns2:identifier>
    </ns2:identifiers>
  </ns1:general>
  <ns1:lifecycle>
    <ns1:upload_date>2017-12-13T17:00:56.053Z</ns1:upload_date>
    <ns1:status>45</ns1:status>
    <ns2:peer_reviewed>no</ns2:peer_reviewed>
    <ns1:contribute seq="0">
      <ns1:role>46</ns1:role>
      <ns1:ext_role>mentor</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Miloš Z. 1989- </ns3:firstname>
        <ns3:lastname>Petrović</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
    <ns1:contribute seq="1">
      <ns1:role>63</ns1:role>
      <ns1:ext_role>mentor</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Mića 1965- </ns3:firstname>
        <ns3:lastname>Stanković</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
    <ns1:contribute seq="2">
      <ns1:role>63</ns1:role>
      <ns1:ext_role>član komisije</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Predrag 1959- </ns3:firstname>
        <ns3:lastname>Stanimirović</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
    <ns1:contribute seq="3">
      <ns1:role>63</ns1:role>
      <ns1:ext_role>član komisije</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Ljubica 1955- </ns3:firstname>
        <ns3:lastname>Velimirović</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
    <ns1:contribute seq="4">
      <ns1:role>63</ns1:role>
      <ns1:ext_role>član komisije</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Zoran </ns3:firstname>
        <ns3:lastname>Rakić</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
    <ns1:contribute seq="5">
      <ns1:role>63</ns1:role>
      <ns1:ext_role>član komisije</ns1:ext_role>
      <ns1:entity seq="0">
        <ns3:firstname> Milan 1984- </ns3:firstname>
        <ns3:lastname>Zlatanović</ns3:lastname>
      </ns1:entity>
      <ns1:date>2017</ns1:date>
    </ns1:contribute>
  </ns1:lifecycle>
  <ns1:technical>
    <ns1:format>VI, 108 listova</ns1:format>
    <ns1:size>3405143</ns1:size>
    <ns1:location>http://phaidrabg.bg.ac.rs/o:1420</ns1:location>
  </ns1:technical>
  <ns1:rights>
    <ns1:cost>no</ns1:cost>
    <ns1:copyright>yes</ns1:copyright>
    <ns1:license>4</ns1:license>
  </ns1:rights>
  <ns1:annotation>
    <ns6:annotations>
      <ns6:date>2017-12-13T17:00:56.320Z</ns6:date>
    </ns6:annotations>
  </ns1:annotation>
  <ns1:classification>
    <ns1:purpose>70</ns1:purpose>
    <ns7:keyword language="sr" seq="1">generalisani hiperbolički Kelerov prostor, generalisaniRimanov prostor, holomorfno projektivno preslikavanje, skorogeodezaijsko preslikavanje, nesimetrična linearna koneksija,tenzor krivine, invarijantni geometrijski objekt</ns7:keyword>
    <ns7:keyword language="sr" seq="1">generalized hyperbolic Kahler space, generalized Riemannianspace, holomorphically projective mapping, almost geodesicmapping, non-symmetric linear connection, curvature tensor,invariant geometric object</ns7:keyword>
    <ns7:keyword language="sr" seq="1">514.764.3+514.764.25+514.763.4(043.3)</ns7:keyword>
    <ns7:keyword language="sr" seq="1">P 150</ns7:keyword>
  </ns1:classification>
  <ns1:organization>
    <ns8:hoschtyp>1738</ns8:hoschtyp>
    <ns8:orgassignment>
      <ns8:faculty>18A07</ns8:faculty>
      <ns8:department>18A0701</ns8:department>
    </ns8:orgassignment>
  </ns1:organization>
  <ns12:digitalbook>
    <ns12:releaseyear>2017</ns12:releaseyear>
  </ns12:digitalbook>
</ns0:uwmetadata>