Completitud de la métrica de hausdorff es espacios métricos compactos.
This paper defines the Hausdorff metric on a closed and bounded subsets compact metric space. Throughout this is investigated by some topological properties as complete ness and total boundedness, for this two definitions is presented and also shown that they are equivalent finally shown that induce...
- Autores:
- Tipo de recurso:
- Trabajo de grado de pregrado
- Fecha de publicación:
- 2016
- Institución:
- Universidad Distrital Francisco José de Caldas
- Repositorio:
- RIUD: repositorio U. Distrital
- Idioma:
- spa
- OAI Identifier:
- oai:repository.udistrital.edu.co:11349/23714
- Acceso en línea:
- http://hdl.handle.net/11349/23714
- Palabra clave:
- métrica de Hausdorff
completitud
Matemáticas - Tesis y disertaciones académica
Teoría métrica de Hausdorff
Métrica de Hausdorff
Métodos de enseñanza
Hausdorff metric
- Rights
- License
- Atribución-NoComercial-SinDerivadas 4.0 Internacional
| id |
UDISTRITA2_63cfc325ccb2cc9b09aafc9761cdf27b |
|---|---|
| oai_identifier_str |
oai:repository.udistrital.edu.co:11349/23714 |
| network_acronym_str |
UDISTRITA2 |
| network_name_str |
RIUD: repositorio U. Distrital |
| repository_id_str |
|
| dc.title.spa.fl_str_mv |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| dc.title.titleenglish.spa.fl_str_mv |
Completeness the hausdorff métric in compact space |
| title |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| spellingShingle |
Completitud de la métrica de hausdorff es espacios métricos compactos. métrica de Hausdorff completitud Matemáticas - Tesis y disertaciones académica Teoría métrica de Hausdorff Métrica de Hausdorff Métodos de enseñanza Hausdorff metric |
| title_short |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| title_full |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| title_fullStr |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| title_full_unstemmed |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| title_sort |
Completitud de la métrica de hausdorff es espacios métricos compactos. |
| dc.contributor.advisor.spa.fl_str_mv |
Ochoa Castillo, Carlos Orlando |
| dc.subject.spa.fl_str_mv |
métrica de Hausdorff completitud |
| topic |
métrica de Hausdorff completitud Matemáticas - Tesis y disertaciones académica Teoría métrica de Hausdorff Métrica de Hausdorff Métodos de enseñanza Hausdorff metric |
| dc.subject.lemb.spa.fl_str_mv |
Matemáticas - Tesis y disertaciones académica Teoría métrica de Hausdorff Métrica de Hausdorff Métodos de enseñanza |
| dc.subject.keyword.spa.fl_str_mv |
Hausdorff metric |
| description |
This paper defines the Hausdorff metric on a closed and bounded subsets compact metric space. Throughout this is investigated by some topological properties as complete ness and total boundedness, for this two definitions is presented and also shown that they are equivalent finally shown that induced Hausdorff space is complete |
| publishDate |
2016 |
| dc.date.created.spa.fl_str_mv |
2016-08-02 |
| dc.date.accessioned.none.fl_str_mv |
2020-05-29T07:16:14Z |
| dc.date.available.none.fl_str_mv |
2020-05-29T07:16:14Z |
| dc.type.degree.spa.fl_str_mv |
Creación o Interpretación |
| dc.type.driver.spa.fl_str_mv |
info:eu-repo/semantics/bachelorThesis |
| dc.type.coar.spa.fl_str_mv |
http://purl.org/coar/resource_type/c_7a1f |
| format |
http://purl.org/coar/resource_type/c_7a1f |
| dc.identifier.uri.none.fl_str_mv |
http://hdl.handle.net/11349/23714 |
| url |
http://hdl.handle.net/11349/23714 |
| dc.language.iso.spa.fl_str_mv |
spa |
| language |
spa |
| dc.rights.*.fl_str_mv |
Atribución-NoComercial-SinDerivadas 4.0 Internacional |
| dc.rights.coar.fl_str_mv |
http://purl.org/coar/access_right/c_abf2 |
| dc.rights.uri.*.fl_str_mv |
http://creativecommons.org/licenses/by-nc-nd/4.0/ |
| dc.rights.acceso.spa.fl_str_mv |
Abierto (Texto Completo) |
| rights_invalid_str_mv |
Atribución-NoComercial-SinDerivadas 4.0 Internacional http://creativecommons.org/licenses/by-nc-nd/4.0/ Abierto (Texto Completo) http://purl.org/coar/access_right/c_abf2 |
| dc.format.mimetype.spa.fl_str_mv |
pdf |
| institution |
Universidad Distrital Francisco José de Caldas |
| bitstream.url.fl_str_mv |
http://repository.udistrital.edu.co/bitstream/11349/23714/6/Top.pdf.jpg http://repository.udistrital.edu.co/bitstream/11349/23714/2/license_url http://repository.udistrital.edu.co/bitstream/11349/23714/3/license_text http://repository.udistrital.edu.co/bitstream/11349/23714/4/license_rdf http://repository.udistrital.edu.co/bitstream/11349/23714/5/license.txt http://repository.udistrital.edu.co/bitstream/11349/23714/1/Top.pdf |
| bitstream.checksum.fl_str_mv |
a8e117bd7c568bc3a61cab1dc4768dd2 321f3992dd3875151d8801b773ab32ed d41d8cd98f00b204e9800998ecf8427e d41d8cd98f00b204e9800998ecf8427e da5c6a3ca62d5dd4853000a60fee7083 aad569e6a37b22d3c6eb193c0b068651 |
| bitstream.checksumAlgorithm.fl_str_mv |
MD5 MD5 MD5 MD5 MD5 MD5 |
| repository.name.fl_str_mv |
Repositorio Institucional Universidad Distrital - RIUD |
| repository.mail.fl_str_mv |
repositorio@udistrital.edu.co |
| _version_ |
1803712623058878464 |
| spelling |
Ochoa Castillo, Carlos OrlandoRomero Dávila, Jesús Andrés2020-05-29T07:16:14Z2020-05-29T07:16:14Z2016-08-02http://hdl.handle.net/11349/23714This paper defines the Hausdorff metric on a closed and bounded subsets compact metric space. Throughout this is investigated by some topological properties as complete ness and total boundedness, for this two definitions is presented and also shown that they are equivalent finally shown that induced Hausdorff space is completeThis work is a reconstruction of part of the article Completeness and complete boundedness of the Hausdorf Metric Professor Jeff Henrikson. For this was a literature review to fill in the details on some of the demonstrations; It left open the possibility of inquiring about other properties induced Hausdorff space.pdfspaAtribución-NoComercial-SinDerivadas 4.0 Internacionalhttp://creativecommons.org/licenses/by-nc-nd/4.0/Abierto (Texto Completo)http://purl.org/coar/access_right/c_abf2métrica de HausdorffcompletitudMatemáticas - Tesis y disertaciones académicaTeoría métrica de HausdorffMétrica de HausdorffMétodos de enseñanzaHausdorff metricCompletitud de la métrica de hausdorff es espacios métricos compactos.Completeness the hausdorff métric in compact spaceCreación o Interpretacióninfo:eu-repo/semantics/bachelorThesishttp://purl.org/coar/resource_type/c_7a1fTHUMBNAILTop.pdf.jpgTop.pdf.jpgIM Thumbnailimage/jpeg6446http://repository.udistrital.edu.co/bitstream/11349/23714/6/Top.pdf.jpga8e117bd7c568bc3a61cab1dc4768dd2MD56open accessCC-LICENSElicense_urllicense_urltext/plain; charset=utf-843http://repository.udistrital.edu.co/bitstream/11349/23714/2/license_url321f3992dd3875151d8801b773ab32edMD52open accesslicense_textlicense_texttext/html; charset=utf-80http://repository.udistrital.edu.co/bitstream/11349/23714/3/license_textd41d8cd98f00b204e9800998ecf8427eMD53open accesslicense_rdflicense_rdfapplication/rdf+xml; charset=utf-80http://repository.udistrital.edu.co/bitstream/11349/23714/4/license_rdfd41d8cd98f00b204e9800998ecf8427eMD54open accessLICENSElicense.txtlicense.txttext/plain; charset=utf-87163http://repository.udistrital.edu.co/bitstream/11349/23714/5/license.txtda5c6a3ca62d5dd4853000a60fee7083MD55open accessORIGINALTop.pdfTop.pdfapplication/pdf3006926http://repository.udistrital.edu.co/bitstream/11349/23714/1/Top.pdfaad569e6a37b22d3c6eb193c0b068651MD51open access11349/23714oai:repository.udistrital.edu.co:11349/237142023-10-03 10:31:56.622open accessRepositorio Institucional Universidad Distrital - RIUDrepositorio@udistrital.edu.coTElDRU5DSUEgWSBBVVRPUklaQUNJw5NOIEVTUEVDSUFMIFBBUkEgUFVCTElDQVIgWSBQRVJNSVRJUiBMQSBDT05TVUxUQSBZIFVTTyBERSBDT05URU5JRE9TIEVOIEVMIFJFUE9TSVRPUklPIElOU1RJVFVDSU9OQUwgREUgTEEgVU5JVkVSU0lEQUQgRElTVFJJVEFMClTDqXJtaW5vcyB5IGNvbmRpY2lvbmVzIGRlIHVzbyBwYXJhIHB1YmxpY2FjacOzbiBkZSBvYnJhcyBlbiBlbCBSZXBvc2l0b3JpbyBJbnN0aXR1Y2lvbmFsIGRlIGxhIFVuaXZlcnNpZGFkIERpc3RyaXRhbCBGcmFuY2lzY28gSm9zw6kgZGUgQ2FsZGFzIChSSVVEKQoKQ29tbyB0aXR1bGFyKGVzKSBkZWwob3MpIGRlcmVjaG8ocykgZGUgYXV0b3IsIGNvbmZpZXJvIChlcmltb3MpIGEgbGEgVW5pdmVyc2lkYWQgRGlzdHJpdGFsIEZyYW5jaXNjbyBKb3PDqSBkZSBDYWxkYXMgKGVuIGFkZWxhbnRlLCBMQSBVTklWRVJTSURBRCkgdW5hIGxpY2VuY2lhIHBhcmEgdXNvIG5vIGV4Y2x1c2l2YSwgbGltaXRhZGEgeSBncmF0dWl0YSBzb2JyZSBsYSBvYnJhIHF1ZSBpbnRlZ3JhcsOhIGVsIFJlcG9zaXRvcmlvIEluc3RpdHVjaW9uYWwgKGVuIGFkZWxhbnRlLCBSSVVEKSwgZGUgYWN1ZXJkbyBhIGxhcyBzaWd1aWVudGVzIHJlZ2xhcywgbGFzIGN1YWxlcyBkZWNsYXJvIChhbW9zKSBjb25vY2VyIHkgYWNlcHRhcjoKCmEpCUVzdGFyw6EgdmlnZW50ZSBhIHBhcnRpciBkZSBsYSBmZWNoYSBlbiBxdWUgc2UgaW5jbHV5YSBlbiBlbCBSSVVEIHkgaGFzdGEgcG9yIHVuIHBsYXpvIGRlIGRpZXogKDEwKSBBw7FvcywgcHJvcnJvZ2FibGUgaW5kZWZpbmlkYW1lbnRlIHBvciBlbCB0aWVtcG8gcXVlIGR1cmUgZWwgZGVyZWNobyBQYXRyaW1vbmlhbCBkZWwgYXV0b3I7IGxhIGN1YWwgcG9kcsOhIGRhcnNlIHBvciB0ZXJtaW5hZGEgcHJldmlhIHNvbGljaXR1ZCBhIExBIFVOSVZFUlNJREFEIHBvciBlc2NyaXRvIGNvbiB1bmEgYW50ZWxhY2nDs24gZGUgZG9zICgyKSBtZXNlcyBhbnRlcyBkZWwgdmVuY2ltaWVudG8gZGVsIHBsYXpvIGluaWNpYWwgbyBlbCBkZSBzdShzKSBwcsOzcnJvZ2EocykuICAKCmIpCUxBIFVOSVZFUlNJREFEIHBvZHLDoSBwdWJsaWNhciBsYSBvYnJhIGVuIGxhcyBkaXN0aW50YXMgdmVyc2lvbmVzIHJlcXVlcmlkYXMgcG9yIGVsIFJJVUQgKGRpZ2l0YWwsIGltcHJlc28sIGVsZWN0csOzbmljbyB1IG90cm8gbWVkaW8gY29ub2NpZG8gbyBwb3IgY29ub2NlcikgTEEgVU5JVkVSU0lEQUQgbm8gc2Vyw6EgcmVzcG9uc2FibGUgZW4gZWwgZXZlbnRvIHF1ZSBlbCBkb2N1bWVudG8gYXBhcmV6Y2EgcmVmZXJlbmNpYWRvIGVuIG1vdG9yZXMgZGUgYsO6c3F1ZWRhIG8gcmVwb3NpdG9yaW9zIGRpZmVyZW50ZXMgYWwgUklVRCwgdW5hIHZleiBlbChvcykgYXV0b3IoZXMpIHNvbGljaXRlbiBzdSBlbGltaW5hY2nDs24gZGVsIFJJVUQsIGRhZG8gcXVlIGxhIG1pc21hIHNlcsOhIHB1YmxpY2FkYSBlbiBJbnRlcm5ldC4gCgpjKQlMYSBhdXRvcml6YWNpw7NuIHNlIGhhY2UgYSB0w610dWxvIGdyYXR1aXRvLCBwb3IgbG8gdGFudG8sIGxvcyBhdXRvcmVzIHJlbnVuY2lhbiBhIHJlY2liaXIgYmVuZWZpY2lvIGFsZ3VubyBwb3IgbGEgcHVibGljYWNpw7NuLCBkaXN0cmlidWNpw7NuLCBjb211bmljYWNpw7NuIHDDumJsaWNhIHkgY3VhbHF1aWVyIG90cm8gdXNvIHF1ZSBzZSBoYWdhIGVuIGxvcyB0w6lybWlub3MgZGUgbGEgcHJlc2VudGUgbGljZW5jaWEgeSBkZSBsYSBsaWNlbmNpYSBkZSB1c28gY29uIHF1ZSBzZSBwdWJsaWNhIChDcmVhdGl2ZSBDb21tb25zKS4KCmQpCUxvcyBjb250ZW5pZG9zIHB1YmxpY2Fkb3MgZW4gZWwgUklVRCBzb24gb2JyYShzKSBvcmlnaW5hbChlcykgc29icmUgbGEgY3VhbChlcykgZWwob3MpIGF1dG9yKGVzKSBjb21vIHRpdHVsYXJlcyBkZSBsb3MgZGVyZWNob3MgZGUgYXV0b3IsIGFzdW1lbiB0b3RhbCByZXNwb25zYWJpbGlkYWQgcG9yIGVsIGNvbnRlbmlkbyBkZSBzdSBvYnJhIGFudGUgTEEgVU5JVkVSU0lEQUQgeSBhbnRlIHRlcmNlcm9zLiBFbiB0b2RvIGNhc28gTEEgVU5JVkVSU0lEQUQgc2UgY29tcHJvbWV0ZSBhIGluZGljYXIgc2llbXByZSBsYSBhdXRvcsOtYSBpbmNsdXllbmRvIGVsIG5vbWJyZSBkZWwgYXV0b3IgeSBsYSBmZWNoYSBkZSBwdWJsaWNhY2nDs24uCgplKQlMQSBVTklWRVJTSURBRCBwb2Ryw6EgaW5jbHVpciBsYSBvYnJhIGVuIGxvcyDDrW5kaWNlcyB5IGJ1c2NhZG9yZXMgcXVlIGVzdGltZW4gbmVjZXNhcmlvcyBwYXJhIG1heGltaXphciBsYSB2aXNpYmlsaWRhZCBlbCB1c28geSBlbCBpbXBhY3RvIGRlIGxhIHByb2R1Y2Npw7NuIGNpZW50w61maWNhLCBhcnTDrXN0aWNhIHkgYWNhZMOpbWljYSBlbiBsYSBjb211bmlkYWQgbG9jYWwsIG5hY2lvbmFsIG8gaW50ZXJuYWNpb25hbC4gCgoKZikJTEEgVU5JVkVSU0lEQUQgcG9kcsOhIGNvbnZlcnRpciBsYSBvYnJhIGEgY3VhbHF1aWVyIG1lZGlvIG8gZm9ybWF0byBjb24gZWwgZmluIGRlIHN1IHByZXNlcnZhY2nDs24gZW4gZWwgdGllbXBvIHF1ZSBsYSBwcmVzZW50ZSBsaWNlbmNpYSB5IGxhIGRlIHN1cyBwcsOzcnJvZ2FzLgoKCkNvbiBiYXNlIGVuIGxvIGFudGVyaW9yIGF1dG9yaXpvKGFtb3MpLCBhIGZhdm9yIGRlbCBSSVVEIHkgZGUgc3VzIHVzdWFyaW9zLCBsYSBwdWJsaWNhY2nDs24geSBjb25zdWx0YSBkZSBsYSBzaWd1aWVudGUgb2JyYToKClRpdHVsbyAJCkF1dG9yCUFwZWxsaWRvcwlOb21icmVzCjEJCQoyCQkKMwkJCiAKCmcpCUF1dG9yaXpvKGFtb3MpLCBxdWUgbGEgb2JyYSBzZWEgcHVlc3RhIGEgZGlzcG9zaWNpw7NuIGRlbCBww7pibGljbyBlbiBsb3MgdMOpcm1pbm9zIGVzdGFibGVjaWRvcyBlbiBsb3MgbGl0ZXJhbGVzIGFudGVyaW9yZXMsIGJham8gbG9zIGzDrW1pdGVzIGRlZmluaWRvcyBwb3IgTEEgVU5JVkVSU0lEQUQsIGVuIGxhcyDigJxDb25kaWNpb25lcyBkZSB1c28gZGUgZXN0cmljdG8gY3VtcGxpbWllbnRv4oCdIGRlIGxvcyByZWN1cnNvcyBwdWJsaWNhZG9zIGVuIGVsIFJJVUQsIGN1eW8gdGV4dG8gY29tcGxldG8gc2UgcHVlZGUgY29uc3VsdGFyIGVuIGh0dHA6Ly9yZXBvc2l0b3J5LnVkaXN0cml0YWwuZWR1LmNvLwoKaCkJQ29ub3pjbyhjZW1vcykgeSBhY2VwdG8oYW1vcykgcXVlIG90b3JnbyhhbW9zKSB1bmEgbGljZW5jaWEgZXNwZWNpYWwgcGFyYSBwdWJsaWNhY2nDs24gZGUgb2JyYXMgZW4gZWwgUmVwb3NpdG9yaW8gSW5zdGl0dWNpb25hbCBkZSBsYSBVbml2ZXJzaWRhZCBEaXN0cml0YWwgRnJhbmNpc2NvIEpvc8OpIGRlIENhbGRhcywgbGljZW5jaWEgICBkZSBsYSBjdWFsIGhlIChoZW1vcykgb2J0ZW5pZG8gdW5hIGNvcGlhLgoKaSkJTWFuaWZpZXN0byhhbW9zKSBtaSAobnVlc3RybykgdG90YWwgYWN1ZXJkbyBjb24gbGFzIGNvbmRpY2lvbmVzIGRlIHVzbyB5IHB1YmxpY2FjacOzbiBlbiBlbCBSZXBvc2l0b3JpbyBJbnN0aXR1Y2lvbmFsIGRlIGxhIFVuaXZlcnNpZGFkIERpc3RyaXRhbCBGcmFuY2lzY28gSm9zw6kgZGUgQ2FsZGFzIHF1ZSBzZSBkZXNjcmliZW4geSBleHBsaWNhbiBlbiBlbCBwcmVzZW50ZSBkb2N1bWVudG8uCgpqKQlDb25vemNvKGNlbW9zKSBsYSBub3JtYXRpdmlkYWQgaW50ZXJuYSBkZSAgTEEgVU5JVkVSU0lEQUQ7IGVuIGNvbmNyZXRvLCBlbCBBY3VlcmRvIDAwNCBkZSAyMDEyIGRlbCBDU1UsIEFjdWVyZG8gMDIzIGRlIDIwMTIgZGVsIENTVSBzb2JyZSBQb2zDrXRpY2EgRWRpdG9yaWFsLCBBY3VlcmRvIDAyNiAgZGVsIDMxIGRlIGp1bGlvIGRlIDIwMTIgc29icmUgZWwgcHJvY2VkaW1pZW50byBwYXJhIGxhIHB1YmxpY2FjacOzbiBkZSB0ZXNpcyBkZSBwb3N0Z3JhZG8gZGUgbG9zIGVzdHVkaWFudGVzIGRlIGxhIFVuaXZlcnNpZGFkIERpc3RyaXRhbCBGcmFuY2lzY28gSm9zw6kgZGUgQ2FsZGFzLCAgQWN1ZXJkbyAwMzAgZGVsIDAzIGRlIGRpY2llbWJyZSBkZSAyMDEzIHBvciBtZWRpbyBkZWwgY3VhbCBzZSBjcmVhIGVsIFJlcG9zaXRvcmlvIEluc3RpdHVjaW9uYWwgZGUgbGEgVW5pdmVyc2lkYWQgRGlzdHJpdGFsIEZyYW5jaXNjbyBKb3PDqSBkZSBDYWxkYXMsIEFjdWVyZG8gMDM4IGRlIDIwMTUgMjAxNSDigJxwb3IgZWwgY3VhbCBzZSBtb2RpZmljYSBlbCBBY3VlcmRvIDAzMSBkZSAyMDE0IGRlIDIwMTQgcXVlIHJlZ2xhbWVudGEgZWwgdHJhYmFqbyBkZSBncmFkbyBwYXJhIGxvcyBlc3R1ZGlhbnRlcyBkZSBwcmVncmFkbyBkZSBsYSBVbml2ZXJzaWRhZCBEaXN0cml0YWwgRnJhbmNpc2NvIEpvc8OpIGRlIENhbGRhcyB5IHNlIGRpY3RhbiBvdHJhcyBkaXJlY3RyaWNlc+KAnSB5IGxhcyBkZW3DoXMgbm9ybWFzIGNvbmNvcmRhbnRlIHkgY29tcGxlbWVudGFyaWFzIHF1ZSByaWdlbiBhbCByZXNwZWN0bywgZXNwZWNpYWxtZW50ZSBsYSBsZXkgMjMgZGUgMTk4MiwgbGEgbGV5IDQ0IGRlIDE5OTMgeSBsYSBkZWNpc2nDs24gQW5kaW5hIDM1MSBkZSAxOTkzLiBFc3RvcyBkb2N1bWVudG9zIHBvZHLDoW4gc2VyIGNvbnN1bHRhZG9zIHkgZGVzY2FyZ2Fkb3MgZW4gZWwgcG9ydGFsIHdlYiBkZSBsYSBiaWJsaW90ZWNhIGh0dHA6Ly9zaXN0ZW1hZGViaWJsaW90ZWNhcy51ZGlzdHJpdGFsLmVkdS5jby8gIAoKaykJQWNlcHRvKGFtb3MpIHF1ZSBMQSBVTklWRVJTSURBRCBubyBzZSByZXNwb25zYWJpbGl6YSBwb3IgbGFzIGluZnJhY2Npb25lcyBhIGxhIHByb3BpZWRhZCBpbnRlbGVjdHVhbCBvIERlcmVjaG9zIGRlIEF1dG9yIGNhdXNhZGFzIHBvciBsb3MgdGl0dWxhcmVzIGRlIGxhIHByZXNlbnRlIExpY2VuY2lhIHkgZGVjbGFyYW1vcyBxdWUgbWFudGVuZHLDqSAoZW1vcykgaW5kZW1uZSBhIExBIFVOSVZFUlNJREFEIHBvciBsYXMgcmVjbGFtYWNpb25lcyBsZWdhbGVzIGRlIGN1YWxxdWllciB0aXBvIHF1ZSBsbGVnYXJlbiBhIHByZXNlbnRhcnNlIHBvciB2aW9sYWNpw7NuIGRlIGRlcmVjaG9zIGEgbGEgcHJvcGllZGFkIGludGVsZWN0dWFsIG8gZGUgQXV0b3IgcmVsYWNpb25hZG9zIGNvbiBsb3MgZG9jdW1lbnRvcyByZWdpc3RyYWRvcyBlbiBlbCBSSVVELgoKbCkJRWwgKGxvcykgYXV0b3IoZXMpIG1hbmlmaWVzdGEobW9zKSBxdWUgbGEgb2JyYSBvYmpldG8gZGUgbGEgcHJlc2VudGUgYXV0b3JpemFjacOzbiBlcyBvcmlnaW5hbCwgZGUgZXhjbHVzaXZhIGF1dG9yw61hLCB5IHNlIHJlYWxpesOzIHNpbiB2aW9sYXIgbyB1c3VycGFyIGRlcmVjaG9zIGRlIGF1dG9yIGRlIHRlcmNlcm9zOyBkZSB0YWwgc3VlcnRlLCBlbiBjYXNvIGRlIHByZXNlbnRhcnNlIGN1YWxxdWllciByZWNsYW1hY2nDs24gbyBhY2Npw7NuIHBvciBwYXJ0ZSBkZSB1biB0ZXJjZXJvIGVuIGN1YW50byBhIGxvcyBkZXJlY2hvcyBkZSBhdXRvciBzb2JyZSBsYSBvYnJhLCBlbCAobG9zKSBlc3R1ZGlhbnRlKHMpIOKAkyBhdXRvcihlcykgYXN1bWlyw6EobikgdG9kYSBsYSByZXNwb25zYWJpbGlkYWQgeSBzYWxkcsOhKG4pIGVuIGRlZmVuc2EgZGUgbG9zIGRlcmVjaG9zIGFxdcOtIGF1dG9yaXphZG9zLiBQYXJhIHRvZG9zIGxvcyBlZmVjdG9zLCBMQSBVTklWRVJTSURBRCBhY3TDumEgY29tbyB1biB0ZXJjZXJvIGRlIGJ1ZW5hIGZlLiAgIAoKCm0pCUVsIChsb3MpIGF1dG9yKGVzKSBtYW5pZmllc3RhKG1vcykgcXVlIGNvbm96Y28oY2Vtb3MpIGxhIGF1dG9ub23DrWEgeSBsb3MgZGVyZWNob3MsIHF1ZSBwb3NlZShtb3MpIHNvYnJlIGxhIG9icmEgeSwgY29tbyB0YWwsIGVzIChzb21vcykgcmVzcG9uc2FibGUocykgZGVsIGFsY2FuY2UganVyw61kaWNvIHkgbGVnYWwsIGRlIGVzY29nZXIgbGEgb3BjacOzbiBkZSBsYSBwdWJsaWNhY2nDs24gbyBkZSByZXN0cmljY2nDs24gZGUgbGEgcHVibGljYWNpw7NuIGRlbCBkb2N1bWVudG8gcmVnaXN0cmFkbyBlbiBlbCBSSVVELgoKCgoKU0kgRUwgRE9DVU1FTlRPIFNFIEJBU0EgRU4gVU4gVFJBQkFKTyBRVUUgSEEgU0lETyBQQVRST0NJTkFETyBPIEFQT1lBRE8gUE9SIFVOQSBBR0VOQ0lBIE8gVU5BIE9SR0FOSVpBQ0nDk04sIENPTiBFWENFUENJw5NOIERFIExBIFVOSVZFUlNJREFEIERJU1RSSVRBTCBGUkFOQ0lTQ08gSk9TRSBERSBDQUxEQVMsIExPUyBBVVRPUkVTIEdBUkFOVElaQU4gUVVFIFNFIEhBIENVTVBMSURPIENPTiBMT1MgCkRFUkVDSE9TIFkgT0JMSUdBQ0lPTkVTIFJFUVVFUklET1MgUE9SIEVMIFJFU1BFQ1RJVk8gQ09OVFJBVE8gTyBBQ1VFUkRPLgoKCgoKCgoKCgoKCgoKCgoKCgoKCgpFbiBjb25zdGFuY2lhIGRlIGxvIGFudGVyaW9yLCBmaXJtbyhhbW9zKSBlbCBwcmVzZW50ZSBkb2N1bWVudG8sIGVuIGxhIGNpdWRhZCBkZSBCb2dvdMOhLCBELkMuLCBhIGxvcyAKCgpGSVJNQSBERSBMT1MgVElUVUxBUkVTIERFIERFUkVDSE9TIERFIEFVVE9SCgpfX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX18gICBDLkMuIE5vLiBfX19fX19fX19fX19fX19fX18KX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fICAgQy5DLiBOby4gX19fX19fX19fX19fX19fX19fCl9fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fX19fXyAgIEMuQy4gTm8uIF9fX19fX19fX19fX19fX19fXwoKCgpDb3JyZW8gRWxlY3Ryw7NuaWNvIEluc3RpdHVjaW9uYWwgZGVsIChkZSBsb3MpIEF1dG9yKGVzKToKCkF1dG9yCUNvcnJlbyBFbGVjdHLDs25pY28gCjEJCjIJCjMJCgpOb21icmUgZGUgRGlyZWN0b3IoZXMpIGRlIEdyYWRvOgoKMQkKMgkKMwkKCk5vbWJyZSBGYWN1bHRhZCB5IFByb3llY3RvIEN1cnJpY3VsYXI6CgpGYWN1bHRhZAlQcm95ZWN0byBDdXJyaWN1bGFyCgkKCgoKCgoKCk5vdGE6IEVuIGNhc28gcXVlIG5vIGVzdMOpIGRlIGFjdWVyZG8gY29uIGxhcyBjb25kaWNpb25lcyBkZSBsYSBwcmVzZW50ZSBsaWNlbmNpYSwgeSBtYW5pZmllc3RlIGFsZ3VuYSByZXN0cmljY2nDs24gc29icmUgbGEgb2JyYSwganVzdGlmaXF1ZSBsb3MgbW90aXZvcyBwb3IgbG9zIGN1YWxlcyBlbCBkb2N1bWVudG8geSBzdXMgYW5leG9zIG5vIHB1ZWRlbiBzZXIgcHVibGljYWRvcyBlbiBlbCBSZXBvc2l0b3JpbyBJbnN0aXR1Y2lvbmFsIGRlIGxhIFVuaXZlcnNpZGFkIERpc3RyaXRhbCBGcmFuY2lzY28gSm9zw6kgZGUgQ2FsZGFzIFJJVUQuCgoKU2kgcmVxdWllcmUgbcOhcyBlc3BhY2lvLCBwdWVkZSBhbmV4YXIgdW5hIGNvcGlhIHNpbWlsYXIgYSBlc3RhIGhvamEKCgo= |