On a convex topological order and neutrosophic continuous sets

In this paper, we employ the classical topological preorder to introduce the concept of topologically bounded sets, in order to relate it to the Collatz conjecture problem. In addition, this preorder allows us to derive some results about topologically convex sets, showing that these form a convex s...

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Autores:: Aponte, Elvis
Vielma, Jorge
Sanabria, José
Rosas, Ennis

Tipo de recurso:: Article of investigation

Fecha de publicación:: 2025

Institución:: Corporación Universidad de la Costa

Repositorio:: REDICUC - Repositorio CUC

Idioma:: eng

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dc.title.eng.fl_str_mv	On a convex topological order and neutrosophic continuous sets
title	On a convex topological order and neutrosophic continuous sets
spellingShingle	On a convex topological order and neutrosophic continuous sets Collatz conjeture Topological convex set Topological preorder
title_short	On a convex topological order and neutrosophic continuous sets
title_full	On a convex topological order and neutrosophic continuous sets
title_fullStr	On a convex topological order and neutrosophic continuous sets
title_full_unstemmed	On a convex topological order and neutrosophic continuous sets
title_sort	On a convex topological order and neutrosophic continuous sets
dc.creator.fl_str_mv	Aponte, Elvis Vielma, Jorge Sanabria, José Rosas, Ennis
dc.contributor.author.none.fl_str_mv	Aponte, Elvis Vielma, Jorge Sanabria, José Rosas, Ennis
dc.subject.proposal.eng.fl_str_mv	Collatz conjeture Topological convex set Topological preorder
topic	Collatz conjeture Topological convex set Topological preorder
description	In this paper, we employ the classical topological preorder to introduce the concept of topologically bounded sets, in order to relate it to the Collatz conjecture problem. In addition, this preorder allows us to derive some results about topologically convex sets, showing that these form a convex structure. Finally, using this topological preorder, we define the neutrosophic continuous sets and establish the necessary conditions to identify the points that are connected to these sets, which form a topological convex set.
publishDate	2025
dc.date.accessioned.none.fl_str_mv	2025-04-25T20:05:07Z
dc.date.available.none.fl_str_mv	2025-04-25T20:05:07Z
dc.date.issued.none.fl_str_mv	2025
dc.type.none.fl_str_mv	Artículo de revista
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dc.identifier.citation.none.fl_str_mv	Aponte, Elvis. , Vielma, Jorge. , Sanabria, Jos´e. , Rosas, Ennis. On a convex topological order and neutrosophic continuous sets. International Journal of Neutrosophic Science, vol. , no. , 2025, pp. 425-432. DOI: https://doi.org/10.54216/IJNS.250436
dc.identifier.issn.none.fl_str_mv	2690-6805
dc.identifier.uri.none.fl_str_mv	https://hdl.handle.net/11323/14173
dc.identifier.doi.none.fl_str_mv	10.54216/IJNS.250436
dc.identifier.eissn.none.fl_str_mv	2692-6148
dc.identifier.instname.none.fl_str_mv	Corporación Universidad de la Costa
dc.identifier.reponame.none.fl_str_mv	REDICUC - Repositorio CUC
dc.identifier.repourl.none.fl_str_mv	https://repositorio.cuc.edu.co/
identifier_str_mv	Aponte, Elvis. , Vielma, Jorge. , Sanabria, Jos´e. , Rosas, Ennis. On a convex topological order and neutrosophic continuous sets. International Journal of Neutrosophic Science, vol. , no. , 2025, pp. 425-432. DOI: https://doi.org/10.54216/IJNS.250436 2690-6805 10.54216/IJNS.250436 2692-6148 Corporación Universidad de la Costa REDICUC - Repositorio CUC
url	https://hdl.handle.net/11323/14173 https://repositorio.cuc.edu.co/
dc.language.iso.none.fl_str_mv	eng
language	eng
dc.relation.ispartofjournal.none.fl_str_mv	International Journal of Neutrosophic Science
dc.relation.references.none.fl_str_mv	M.L. Colasante, C. Uzcategui, J. Vielma, Boolean algebras and low separation axioms, ´ Topology Proceedings 34 (2009), 1-15. K. Damodharan, M. Vigneshwaran, Nδ-closure and Nδ-interior in neutrosophic topological spaces, Neutrosophic Sets and Systems 66 (2024), 108-118. G. Di Maio, A separation axiom weaker than R0, Indian Journal of Pure and Applied Mathematics 4 (1985), 373-375. O. Echi, On the product of primal spaces, Quaestiones Mathematicae 45(1) (2022), 1-10. H. Maki, Generalized Λ-sets and the associated closure operator, The Special Issue in Commemoration of Prof. Kazuada IKEDA’s Retirement (1986), 139-146. A. A. Salama, H. E. Khalid, A. K. Essa, and A. G. Mabrouk, ”Exploring the Potential of Neutrosophic Topological Spaces in Computer Science,” Neutrosophic Systems with Applications, vol. 21, pp. 63–97, Sep. 2024. J. Sanabria, C. Granados, L. Sanchez, Properties of co-local function and related ´ Φ-operator in ideal neutrosophic topological space, Neutrosophic sets and Systems 63 (2024), 49-61. M. Kiris¸ci and N. S¸ims¸ek, ”Neutrosophic Metric Spaces,” arXiv preprint arXiv:1907.00798, Jun. 2019. F. Smarandache, A unifying field in logics. Neutrosophy: Neutrosophic probability, set and logic, American Research Press: Rehoboth, USA, 1999. F. Smarandache, Foundation of revolutionary topologies: An overview, examples, trend analysis, research issues, challenges, and future directions, Neutrosophic Systems with Applications 13 (2024), 45- 66. C. Uzcategui, and J. Vielma, Alexandroff topologies viewed as closed sets in the Cantor cube, ´ Divulgaciones Matematicas ´ 13 (2005), 45-53. M. Van de Vel, Theory of convex structures, North-Holland Mathematical Library: Amsterdan, The Netherlands, 1993. J. Vielma and A. Guale, A topological approach to the Ulam-Kakutani-Collatz conjecture, ´ Topology and its Applications 256 (2019), 1-6. T. Yokoyama, Preorder characterizations of lower separation axioms and their applications to foliations and flows, arXiv 1708.06626 (2017), preprint.
dc.relation.citationendpage.none.fl_str_mv	432
dc.relation.citationstartpage.none.fl_str_mv	425
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dc.relation.citationvolume.none.fl_str_mv	25
dc.rights.eng.fl_str_mv	© 2025, American Scientific Publishing Group (ASPG).
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dc.format.extent.none.fl_str_mv	8 páginas
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spelling	Atribución-NoComercial-SinDerivadas 4.0 Internacional (CC BY-NC-ND 4.0)© 2025, American Scientific Publishing Group (ASPG).https://creativecommons.org/licenses/by-nc-nd/4.0/info:eu-repo/semantics/openAccesshttp://purl.org/coar/access_right/c_abf2Aponte, ElvisVielma, JorgeSanabria, JoséRosas, Ennisvirtual::1145-12025-04-25T20:05:07Z2025-04-25T20:05:07Z2025Aponte, Elvis. , Vielma, Jorge. , Sanabria, Jos´e. , Rosas, Ennis. On a convex topological order and neutrosophic continuous sets. International Journal of Neutrosophic Science, vol. , no. , 2025, pp. 425-432. DOI: https://doi.org/10.54216/IJNS.2504362690-6805https://hdl.handle.net/11323/1417310.54216/IJNS.2504362692-6148Corporación Universidad de la CostaREDICUC - Repositorio CUChttps://repositorio.cuc.edu.co/In this paper, we employ the classical topological preorder to introduce the concept of topologically bounded sets, in order to relate it to the Collatz conjecture problem. In addition, this preorder allows us to derive some results about topologically convex sets, showing that these form a convex structure. Finally, using this topological preorder, we define the neutrosophic continuous sets and establish the necessary conditions to identify the points that are connected to these sets, which form a topological convex set.8 páginasapplication/pdfengAmerican Scientific Publishing Group (ASPG)United Stateshttps://www.americaspg.com/articleinfo/21/show/3553On a convex topological order and neutrosophic continuous setsArtículo de revistahttp://purl.org/coar/resource_type/c_2df8fbb1Textinfo:eu-repo/semantics/articlehttp://purl.org/redcol/resource_type/ARTinfo:eu-repo/semantics/publishedVersionhttp://purl.org/coar/version/c_970fb48d4fbd8a85International Journal of Neutrosophic ScienceM.L. Colasante, C. Uzcategui, J. Vielma, Boolean algebras and low separation axioms, ´ Topology Proceedings 34 (2009), 1-15.K. Damodharan, M. Vigneshwaran, Nδ-closure and Nδ-interior in neutrosophic topological spaces, Neutrosophic Sets and Systems 66 (2024), 108-118.G. Di Maio, A separation axiom weaker than R0, Indian Journal of Pure and Applied Mathematics 4 (1985), 373-375.O. Echi, On the product of primal spaces, Quaestiones Mathematicae 45(1) (2022), 1-10.H. Maki, Generalized Λ-sets and the associated closure operator, The Special Issue in Commemoration of Prof. Kazuada IKEDA’s Retirement (1986), 139-146.A. A. Salama, H. E. Khalid, A. K. Essa, and A. G. Mabrouk, ”Exploring the Potential of Neutrosophic Topological Spaces in Computer Science,” Neutrosophic Systems with Applications, vol. 21, pp. 63–97, Sep. 2024.J. Sanabria, C. Granados, L. Sanchez, Properties of co-local function and related ´ Φ-operator in ideal neutrosophic topological space, Neutrosophic sets and Systems 63 (2024), 49-61.M. Kiris¸ci and N. S¸ims¸ek, ”Neutrosophic Metric Spaces,” arXiv preprint arXiv:1907.00798, Jun. 2019.F. Smarandache, A unifying field in logics. Neutrosophy: Neutrosophic probability, set and logic, American Research Press: Rehoboth, USA, 1999.F. Smarandache, Foundation of revolutionary topologies: An overview, examples, trend analysis, research issues, challenges, and future directions, Neutrosophic Systems with Applications 13 (2024), 45- 66.C. Uzcategui, and J. Vielma, Alexandroff topologies viewed as closed sets in the Cantor cube, ´ Divulgaciones Matematicas ´ 13 (2005), 45-53.M. Van de Vel, Theory of convex structures, North-Holland Mathematical Library: Amsterdan, The Netherlands, 1993.J. Vielma and A. Guale, A topological approach to the Ulam-Kakutani-Collatz conjecture, ´ Topology and its Applications 256 (2019), 1-6.T. Yokoyama, Preorder characterizations of lower separation axioms and their applications to foliations and flows, arXiv 1708.06626 (2017), preprint.432425425Collatz conjetureTopological convex setTopological preorderPublicationcb99d9b4-4dcd-4481-8c8a-83af4176c505virtual::1145-1cb99d9b4-4dcd-4481-8c8a-83af4176c505virtual::1145-1https://scholar.google.com/citations?user=KZvdbkwAAAAJ&hl=esvirtual::1145-10000-0001-8123-9344virtual::1145-1ORIGINALOn a convex topological order and neutrosophic continuous sets.pdfOn a convex topological order and neutrosophic continuous sets.pdfapplication/pdf219993https://repositorio.cuc.edu.co/bitstreams/f280acdf-ee18-42ba-9938-487858020e65/download3fddd817f3373db6f8e8662c4930d991MD51LICENSElicense.txtlicense.txttext/plain; charset=utf-815543https://repositorio.cuc.edu.co/bitstreams/594cc3f5-2eb8-46bf-961e-bd9141cd60f4/download73a5432e0b76442b22b026844140d683MD52TEXTOn a convex topological order and neutrosophic continuous sets.pdf.txtOn a convex topological 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ara ejercer estos derechos sobre la Obra tal y como se indica a continuación:</p>
    <ol type="a">
      <li>Reproducir la Obra, incorporar la Obra en una o más Obras Colectivas, y reproducir la Obra incorporada en las Obras Colectivas.</li>
      <li>Distribuir copias o fonogramas de las Obras, exhibirlas públicamente, ejecutarlas públicamente y/o ponerlas a disposición pública, incluyéndolas como incorporadas en Obras Colectivas, según corresponda.</li>
      <li>Distribuir copias de las Obras Derivadas que se generen, exhibirlas públicamente, ejecutarlas públicamente y/o ponerlas a disposición pública.</li>
    </ol>
    <p>Los derechos mencionados anteriormente pueden ser ejercidos en todos los medios y formatos, actualmente conocidos o que se inventen en el futuro. Los derechos antes mencionados incluyen el derecho a realizar dichas modificaciones en la medida que sean técnicamente necesarias para ejercer los derechos en otro medio o formatos, pero de otra manera usted no está autorizado para realizar obras derivadas. Todos los derechos no otorgados expresamente por el Licenciante quedan por este medio reservados, incluyendo pero sin limitarse a aquellos que se mencionan en las secciones 4(d) y 4(e).</p>
  </li>
  <br/>
  <li>
    Restricciones.
    <p>La licencia otorgada en la anterior Sección 3 está expresamente sujeta y limitada por las siguientes restricciones:</p>
    <ol type="a">
      <li>Usted puede distribuir, exhibir públicamente, ejecutar públicamente, o poner a disposición pública la Obra sólo bajo las condiciones de esta Licencia, y Usted debe incluir una copia de esta licencia o del Identificador Universal de Recursos de la misma con cada copia de la Obra que distribuya, exhiba públicamente, ejecute públicamente o ponga a disposición pública. No es posible ofrecer o imponer ninguna condición sobre la Obra que altere o limite las condiciones de esta Licencia o el ejercicio de los derechos de los destinatarios otorgados en este documento. No es posible sublicenciar la Obra. Usted debe mantener intactos todos los avisos que hagan referencia a esta Licencia y a la cláusula de limitación de garantías. Usted no puede distribuir, exhibir públicamente, ejecutar públicamente, o poner a disposición pública la Obra con alguna medida tecnológica que controle el acceso o la utilización de ella de una forma que sea inconsistente con las condiciones de esta Licencia. Lo anterior se aplica a la Obra incorporada a una Obra Colectiva, pero esto no exige que la Obra Colectiva aparte de la obra misma quede sujeta a las condiciones de esta Licencia. Si Usted crea una Obra Colectiva, previo aviso de cualquier Licenciante debe, en la medida de lo posible, eliminar de la Obra Colectiva cualquier referencia a dicho Licenciante o al Autor Original, según lo solicitado por el Licenciante y conforme lo exige la cláusula 4(c).</li>
      <li>Usted no puede ejercer ninguno de los derechos que le han sido otorgados en la Sección 3 precedente de modo que estén principalmente destinados o directamente dirigidos a conseguir un provecho comercial o una compensación monetaria privada. El intercambio de la Obra por otras obras protegidas por derechos de autor, ya sea a través de un sistema para compartir archivos digitales (digital file-sharing) o de cualquier otra manera no será considerado como estar destinado principalmente o dirigido directamente a conseguir un provecho comercial o una compensación monetaria privada, siempre que no se realice un pago mediante una compensación monetaria en relación con el intercambio de obras protegidas por el derecho de autor.</li>
      <li>Si usted distribuye, exhibe públicamente, ejecuta públicamente o ejecuta públicamente en forma digital la Obra o cualquier Obra Derivada u Obra Colectiva, Usted debe mantener intacta toda la información de derecho de autor de la Obra y proporcionar, de forma razonable según el medio o manera que Usted esté utilizando: (i) el nombre del Autor Original si está provisto (o seudónimo, si fuere aplicable), y/o (ii) el nombre de la parte o las partes que el Autor Original y/o el Licenciante hubieren designado para la atribución (v.g., un instituto patrocinador, editorial, publicación) en la información de los derechos de autor del Licenciante, términos de servicios o de otras formas razonables; el título de la Obra si está provisto; en la medida de lo razonablemente factible y, si está provisto, el Identificador Uniforme de Recursos (Uniform Resource Identifier) que el Licenciante especifica para ser asociado con la Obra, salvo que tal URI no se refiera a la nota sobre los derechos de autor o a la información sobre el licenciamiento de la Obra; y en el caso de una Obra Derivada, atribuir el crédito identificando el uso de la Obra en la Obra Derivada (v.g., "Traducción Francesa de la Obra del Autor Original," o "Guión Cinematográfico basado en la Obra original del Autor Original"). Tal crédito puede ser implementado de cualquier forma razonable; en el caso, sin embargo, de Obras Derivadas u Obras Colectivas, tal crédito aparecerá, como mínimo, donde aparece el crédito de cualquier otro autor comparable y de una manera, al menos, tan destacada como el crédito de otro autor comparable.</li>
      <li>
        Para evitar toda confusión, el Licenciante aclara que, cuando la obra es una composición musical:
        <ol type="i">
          <li>Regalías por interpretación y ejecución bajo licencias generales. El Licenciante se reserva el derecho exclusivo de autorizar la ejecución pública o la ejecución pública digital de la obra y de recolectar, sea individualmente o a través de una sociedad de gestión colectiva de derechos de autor y derechos conexos (por ejemplo, SAYCO), las regalías por la ejecución pública o por la ejecución pública digital de la obra (por ejemplo Webcast) licenciada bajo licencias generales, si la interpretación o ejecución de la obra está primordialmente orientada por o dirigida a la obtención de una ventaja comercial o una compensación monetaria privada.</li>
          <li>Regalías por Fonogramas. El Licenciante se reserva el derecho exclusivo de recolectar, individualmente o a través de una sociedad de gestión colectiva de derechos de autor y derechos conexos (por ejemplo, los consagrados por la SAYCO), una agencia de derechos musicales o algún agente designado, las regalías por cualquier fonograma que Usted cree a partir de la obra (“versión cover”) y distribuya, en los términos del régimen de derechos de autor, si la creación o distribución de esa versión cover está primordialmente destinada o dirigida a obtener una ventaja comercial o una compensación monetaria privada.</li>
        </ol>
      </li>
      <li>Gestión de Derechos de Autor sobre Interpretaciones y Ejecuciones Digitales (WebCasting). Para evitar toda confusión, el Licenciante aclara que, cuando la obra sea un fonograma, el Licenciante se reserva el derecho exclusivo de autorizar la ejecución pública digital de la obra (por ejemplo, webcast) y de recolectar, individualmente o a través de una sociedad de gestión colectiva de derechos de autor y derechos conexos (por ejemplo, ACINPRO), las regalías por la ejecución pública digital de la obra (por ejemplo, webcast), sujeta a las disposiciones aplicables del régimen de Derecho de Autor, si esta ejecución pública digital está primordialmente dirigida a obtener una ventaja comercial o una compensación monetaria privada.</li>
    </ol>
  </li>
  <br/>
  <li>
    Representaciones, Garantías y Limitaciones de Responsabilidad.
    <p>A MENOS QUE LAS PARTES LO ACORDARAN DE OTRA FORMA POR ESCRITO, EL LICENCIANTE OFRECE LA OBRA (EN EL ESTADO EN EL QUE SE ENCUENTRA) “TAL CUAL”, SIN BRINDAR GARANTÍAS DE CLASE ALGUNA RESPECTO DE LA OBRA, YA SEA EXPRESA, IMPLÍCITA, LEGAL O CUALQUIERA OTRA, INCLUYENDO, SIN LIMITARSE A ELLAS, GARANTÍAS DE TITULARIDAD, COMERCIABILIDAD, ADAPTABILIDAD O ADECUACIÓN A PROPÓSITO DETERMINADO, AUSENCIA DE INFRACCIÓN, DE AUSENCIA DE DEFECTOS LATENTES O DE OTRO TIPO, O LA PRESENCIA O AUSENCIA DE ERRORES, SEAN O NO DESCUBRIBLES (PUEDAN O NO SER ESTOS DESCUBIERTOS). ALGUNAS JURISDICCIONES NO PERMITEN LA EXCLUSIÓN DE GARANTÍAS IMPLÍCITAS, EN CUYO CASO ESTA EXCLUSIÓN PUEDE NO APLICARSE A USTED.</p>
  </li>
  <br/>
  <li>
    Limitación de responsabilidad.
    <p>A MENOS QUE LO EXIJA EXPRESAMENTE LA LEY APLICABLE, EL LICENCIANTE NO SERÁ RESPONSABLE ANTE USTED POR DAÑO ALGUNO, SEA POR RESPONSABILIDAD EXTRACONTRACTUAL, PRECONTRACTUAL O CONTRACTUAL, OBJETIVA O SUBJETIVA, SE TRATE DE DAÑOS MORALES O PATRIMONIALES, DIRECTOS O INDIRECTOS, PREVISTOS O IMPREVISTOS PRODUCIDOS POR EL USO DE ESTA LICENCIA O DE LA OBRA, AUN CUANDO EL LICENCIANTE HAYA SIDO ADVERTIDO DE LA POSIBILIDAD DE DICHOS DAÑOS. ALGUNAS LEYES NO PERMITEN LA EXCLUSIÓN DE CIERTA RESPONSABILIDAD, EN CUYO CASO ESTA EXCLUSIÓN PUEDE NO APLICARSE A USTED.</p>
  </li>
  <br/>
  <li>
    Término.
    <ol type="a">
      <li>Esta Licencia y los derechos otorgados en virtud de ella terminarán automáticamente si Usted infringe alguna condición establecida en ella. Sin embargo, los individuos o entidades que han recibido Obras Derivadas o Colectivas de Usted de conformidad con esta Licencia, no verán terminadas sus licencias, siempre que estos individuos o entidades sigan cumpliendo íntegramente las condiciones de estas licencias. Las Secciones 1, 2, 5, 6, 7, y 8 subsistirán a cualquier terminación de esta Licencia.</li>
      <li>Sujeta a las condiciones y términos anteriores, la licencia otorgada aquí es perpetua (durante el período de vigencia de los derechos de autor de la obra). No obstante lo anterior, el Licenciante se reserva el derecho a publicar y/o estrenar la Obra bajo condiciones de licencia diferentes o a dejar de distribuirla en los términos de esta Licencia en cualquier momento; en el entendido, sin embargo, que esa elección no servirá para revocar esta licencia o que deba ser otorgada , bajo los términos de esta licencia), y esta licencia continuará en pleno vigor y efecto a menos que sea terminada como se expresa atrás. La Licencia revocada continuará siendo plenamente vigente y efectiva si no se le da término en las condiciones indicadas anteriormente.</li>
    </ol>
  </li>
  <br/>
  <li>
    Varios.
    <ol type="a">
      <li>Cada vez que Usted distribuya o ponga a disposición pública la Obra o una Obra Colectiva, el Licenciante ofrecerá al destinatario una licencia en los mismos términos y condiciones que la licencia otorgada a Usted bajo esta Licencia.</li>
      <li>Si alguna disposición de esta Licencia resulta invalidada o no exigible, según la legislación vigente, esto no afectará ni la validez ni la aplicabilidad del resto de condiciones de esta Licencia y, sin acción adicional por parte de los sujetos de este acuerdo, aquélla se entenderá reformada lo mínimo necesario para hacer que dicha disposición sea válida y exigible.</li>
      <li>Ningún término o disposición de esta Licencia se estimará renunciada y ninguna violación de ella será consentida a menos que esa renuncia o consentimiento sea otorgado por escrito y firmado por la parte que renuncie o consienta.</li>
      <li>Esta Licencia refleja el acuerdo pleno entre las partes respecto a la Obra aquí licenciada. No hay arreglos, acuerdos o declaraciones respecto a la Obra que no estén especificados en este documento. El Licenciante no se verá limitado por ninguna disposición adicional que pueda surgir en alguna comunicación emanada de Usted. Esta Licencia no puede ser modificada sin el consentimiento mutuo por escrito del Licenciante y Usted.</li>
    </ol>
  </li>
  <br/>
</ol>


On a convex topological order and neutrosophic continuous sets

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