Academic literature on the topic 'Knot volume'
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Journal articles on the topic "Knot volume":
Jiang, Jackson, Ita Suzana Mat Jais, Andrew Kean Tuck Yam, Duncan Angus McGrouther, and Shian Chao Tay. "A Biomechanical Comparison of Different Knots Tied on Fibrewire Suture." Journal of Hand Surgery (Asian-Pacific Volume) 22, no. 01 (February 16, 2017): 65–69. http://dx.doi.org/10.1142/s0218810417500113.
Manso, Rubén, J. Paul McLean, Adam Ash, and Alexis Achim. "Estimation of individual knot volumes by mixed-effects modelling." Canadian Journal of Forest Research 50, no. 2 (February 2020): 81–88. http://dx.doi.org/10.1139/cjfr-2019-0038.
CHO, JINSEOK, and JUN MURAKAMI. "THE COMPLEX VOLUMES OF TWIST KNOTS VIA COLORED JONES POLYNOMIALS." Journal of Knot Theory and Its Ramifications 19, no. 11 (November 2010): 1401–21. http://dx.doi.org/10.1142/s0218216510008443.
YOKOTA, YOSHIYUKI. "ON THE COMPLEX VOLUME OF HYPERBOLIC KNOTS." Journal of Knot Theory and Its Ramifications 20, no. 07 (July 2011): 955–76. http://dx.doi.org/10.1142/s021821651100908x.
BAKER, KENNETH L. "SURGERY DESCRIPTIONS AND VOLUMES OF BERGE KNOTS I: LARGE VOLUME BERGE KNOTS." Journal of Knot Theory and Its Ramifications 17, no. 09 (September 2008): 1077–97. http://dx.doi.org/10.1142/s0218216508006518.
Aptekarev, Alexander Ivanovich. "Hyperbolic volume of 3-d manifolds, A-polynomials, numerical hypothesis testing." Keldysh Institute Preprints, no. 52 (2023): 1–36. http://dx.doi.org/10.20948/prepr-2023-52.
Ito, Noboru, and Yusuke Takimura. "Crosscap number of knots and volume bounds." International Journal of Mathematics 31, no. 13 (November 28, 2020): 2050111. http://dx.doi.org/10.1142/s0129167x20501116.
Ben Aribi, Fathi. "The L2-Alexander invariant is stronger than the genus and the simplicial volume." Journal of Knot Theory and Its Ramifications 28, no. 05 (April 2019): 1950030. http://dx.doi.org/10.1142/s0218216519500305.
Ji, Airu, Julie Cool, and Isabelle Duchesne. "Using X-ray CT Scanned Reconstructed Logs to Predict Knot Characteristics and Tree Value." Forests 12, no. 6 (June 1, 2021): 720. http://dx.doi.org/10.3390/f12060720.
LE, THANG T. Q., and ANH T. TRAN. "ON THE VOLUME CONJECTURE FOR CABLES OF KNOTS." Journal of Knot Theory and Its Ramifications 19, no. 12 (December 2010): 1673–91. http://dx.doi.org/10.1142/s0218216510008534.
Dissertations / Theses on the topic "Knot volume":
Larsson, Jennifer. "KNOTS : A work about exploring design possibilities in draping based on principles of a knot." Thesis, Högskolan i Borås, Akademin för textil, teknik och ekonomi, 2018. http://urn.kb.se/resolve?urn=urn:nbn:se:hb:diva-14008.
Finlinson, Kathleen Arvella. "A Volume Bound for Montesinos Links." BYU ScholarsArchive, 2014. https://scholarsarchive.byu.edu/etd/5299.
Tran, Anh Tuan. "The volume conjecture, the aj conjectures and skein modules." Diss., Georgia Institute of Technology, 2012. http://hdl.handle.net/1853/44811.
Rodríguez, Migueles José Andrés. "Géodésiques sur les surfaces hyperboliques et extérieurs des noeuds." Thesis, Rennes 1, 2018. http://www.theses.fr/2018REN1S021.
Due to the Hyperbolization Theorem, we know precisely when does a given compact three dimensional manifold admits a hyperbolic metric. Moreover, by the Mostow's Rigidity Theorem this geometric structure is unique. However, finding effective and computable connections between the geometry and topology is a challenging problem. Most of the results on this thesis fit into the theme of making the connections more concrete. To every oriented closed geodesic on a hyperbolic surface has a canonical lift on the unit tangent bundle of the surface, and we can see it as a knot in a three dimensional manifold. The knot complement given in this way has a hyperbolic structure. The objective of this thesis is to estimate the volume of the canonical lift complement. For every hyperbolic surface we give a sequence of geodesics on the surface, such that the knot complements associated are not homeomorphic with each other and the sequence of the corresponding volumes is bounded. We also give a lower bound of the volume of the canonical lift complement by an explicit real number which describes a relation between the geodesic and a pants decomposition of the surface. This give us a method to construct a sequence of geodesics where the volume of the associated knot complements is bounded from below in terms of the length of the corresponding geodesic. For the particular case of the modular surface, we obtain estimations for the volume of the canonical lift complement in terms of the period of the continuous fraction expansion of the corresponding geodesic
Bauer, Rodolphe. "La modélisation du volume des compartiments riches en composés chimiques extractibles (écorce et nœud) dans six essences d'intérêt des régions Grand-Est et Bourgogne Franche-Comté." Electronic Thesis or Diss., Paris, AgroParisTech, 2021. http://www.theses.fr/2021AGPT0025.
In a context of renewal of the chemical industry and the search for new outlets for forestry, extractives are becoming increasingly interesting molecules, both ecologically and financially speaking. In order to evaluate the relevance of these molecules as a new resource for the chemical industry and a potential outlet for forestry, it is necessary to make a preliminary evaluation of the resource. This requires knowledge of the volume of compartments rich in extractable material, particularly bark and knots. The present study therefore focuses on modeling bark and knot volumes. It focuses specifically on two French regions, the Grand Est and the Bourgogne-Franche-Comté, and on six important species, Abies alba, Picea abies, Pseudotsuga menziesii, Quercu robur, Quercus patraea, and Fagus sylvatica.This study is made possible, on one hand, by the use of a large database including numerous measurements of bark thickness made at different heights on the stems of many trees. On the other hand, new samplings have been made to allow X-ray scanning of nodes all along the stem and thus to determine precisely the volume on a computer picture.In order to model the available amount of bark, three types of models were built, models predicting the volume of bark, models predicting the surface area of bark along the stem and models predicting the thickness of bark at 1m30. The former achieved a relative root mean square error (RMSErel) of 16.7% to 27.5% depending on the species.The study of bark area models showed that it was possible to use a model independent of diameter-over-bark but that model using this variable are more accurate. The RMSErel achieved by these bark area models varied between 23 and 38% depending on the species and model considered.This work showed the importance of using the bark thickness at 1m30 as an input data. As it is rarely measured today, it was also modelled using the DBH. This allowed us to show the influence of altitude on bark thickness at 1.30 m for three species: Abies alba, Picea abies, Fagus sylvatica. The models obtained RMSErel of the models ranged from 26.8 to 36 % of RMSErel depending on the species considered.Finally, knot volumes have started to be studied. Although this work has not been fully completed, it already shows the importance of producing new models in order to fit the predicted knot patterns as closely as possible to reality. Moreover, the quantity of these compounds in the wood seems, at this stage of the study, to be too small to provide a large extractable resource, despite their great intrinsic richness. Their interest could therefore be more in the extraction of specific molecules
Lamm, Christoph. "Zylinder-knoten und symmetrische Vereinigungen." Bonn : [Mathematisches Institut der Universität Bonn], 1999. http://catalog.hathitrust.org/api/volumes/oclc/45517626.html.
Wolff, Metternich Maria Antonia. "Comfort Zones : The delicate relationship between knitted surfaces and filling materials experienced through human comfort/discomfort." Thesis, Högskolan i Borås, Akademin för textil, teknik och ekonomi, 2019. http://urn.kb.se/resolve?urn=urn:nbn:se:hb:diva-22044.
Rodriguez, Migueles José Andrés. "Géodésiques sur les surfaces hyperboliques et extérieurs des noeuds." Thesis, 2018. http://www.theses.fr/2018REN1S021/document.
Due to the Hyperbolization Theorem, we know precisely when does a given compact three dimensional manifold admits a hyperbolic metric. Moreover, by the Mostow's Rigidity Theorem this geometric structure is unique. However, finding effective and computable connections between the geometry and topology is a challenging problem. Most of the results on this thesis fit into the theme of making the connections more concrete. To every oriented closed geodesic on a hyperbolic surface has a canonical lift on the unit tangent bundle of the surface, and we can see it as a knot in a three dimensional manifold. The knot complement given in this way has a hyperbolic structure. The objective of this thesis is to estimate the volume of the canonical lift complement. For every hyperbolic surface we give a sequence of geodesics on the surface, such that the knot complements associated are not homeomorphic with each other and the sequence of the corresponding volumes is bounded. We also give a lower bound of the volume of the canonical lift complement by an explicit real number which describes a relation between the geodesic and a pants decomposition of the surface. This give us a method to construct a sequence of geodesics where the volume of the associated knot complements is bounded from below in terms of the length of the corresponding geodesic. For the particular case of the modular surface, we obtain estimations for the volume of the canonical lift complement in terms of the period of the continuous fraction expansion of the corresponding geodesic
Tatsuoka, Kay S. "The word problem for alternating knots and finite volume hyperbolic groups." 1985. http://catalog.hathitrust.org/api/volumes/oclc/13175834.html.
Boyles, David C. "Complex curves of degree two characters of two-bridge knot groups." 1986. http://catalog.hathitrust.org/api/volumes/oclc/14694845.html.
Typescript. Vita. eContent provider-neutral record in process. Description based on print version record. Includes bibliographical references (leaves 86-87).
Books on the topic "Knot volume":
Murakami, Hitoshi, and Yoshiyuki Yokota. Volume Conjecture for Knots. Singapore: Springer Singapore, 2018. http://dx.doi.org/10.1007/978-981-13-1150-5.
Hayes, Diana Jane. Double knit: Volume two. Sarasota, FL: Peppertree Press, 2009.
Data Center (Oakland, Calif.), ed. The Right to know, volume 2. [Oakland, Calif: Data Center, 1988.
Zoia, Horn, Gruber Nancy, Berkowitz Bill, and Data Center (Oakland, Calif.), eds. The Right to know, volume 4. Oakland, Calif: DataCenter, 1992.
Zoia, Horn, Gruber Nancy, and Data Center (Oakland, Calif.), eds. The Right to know, volume 3. Oakland, Calif: Data Center, 1990.
Murakami, Hitoshi, and Yoshiyuki Yokota. Volume Conjecture for Knots. Springer, 2018.
Kauffman, Louis H. On Knots. (AM-115), Volume 115. Princeton University Press, 2016.
Neuwirth, Lee Paul. Knot Groups. Annals of Mathematics Studies. (AM-56), Volume 56. Princeton University Press, 2016.
Livingston, Charles. Carus, Volume 24: Knot Theory. American Mathematical Society, 1993.
Kauffman, Louis H., and Sostenes Lins. Temperley-Lieb Recoupling Theory and Invariants of 3-Manifolds (AM-134), Volume 134. Princeton University Press, 2016.
Book chapters on the topic "Knot volume":
Ramadevi, P., and Zodinmawia. "Twist Knot Invariants and Volume Conjecture." In Quantum Theory and Symmetries, 275–85. Cham: Springer International Publishing, 2020. http://dx.doi.org/10.1007/978-3-030-55777-5_26.
Murakami, Hitoshi, and Yoshiyuki Yokota. "Representations of a Knot Group, Their Chern–Simons Invariants, and Their Reidemeister Torsions." In Volume Conjecture for Knots, 65–91. Singapore: Springer Singapore, 2018. http://dx.doi.org/10.1007/978-981-13-1150-5_5.
Khalid, Azim, Soudi Brahim, Périssol Claude, Imane Thami-Alami, and Roussos Sevastianos. "Suppressive Effect of Root Knot Nematode Meloidogyne spp. During Composting of Tomato Residues." In Microbial BioTechnology for Sustainable Agriculture Volume 1, 449–69. Singapore: Springer Nature Singapore, 2022. http://dx.doi.org/10.1007/978-981-16-4843-4_15.
Murakami, Hitoshi, and Yoshiyuki Yokota. "Volume Conjecture." In Volume Conjecture for Knots, 27–34. Singapore: Springer Singapore, 2018. http://dx.doi.org/10.1007/978-981-13-1150-5_3.
Eisenberg, Ronald L. "Volume Loss." In What Radiology Residents Need to Know: Chest Radiology, 43–53. Cham: Springer International Publishing, 2019. http://dx.doi.org/10.1007/978-3-030-16826-1_5.
Murakami, Hitoshi, and Yoshiyuki Yokota. "Generalizations of the Volume Conjecture." In Volume Conjecture for Knots, 93–111. Singapore: Springer Singapore, 2018. http://dx.doi.org/10.1007/978-981-13-1150-5_6.
Wang, Rongzhi, and Herbert Chen. "Surgeon Volume." In 50 Landmark Papers every Thyroid and Parathyroid Surgeon Should Know, 194–98. Boca Raton: CRC Press, 2023. http://dx.doi.org/10.1201/9781003196211-35.
Watanabe, Akie, and Sam M. Wiseman. "Surgeon Volume." In 50 Landmark Papers every Thyroid and Parathyroid Surgeon Should Know, 23–27. Boca Raton: CRC Press, 2023. http://dx.doi.org/10.1201/9781003196211-5.
Sultan, Alan, and Alice F. Artzt. "Measurement: Area and Volume." In The Mathematics that Every Secondary School Math Teacher Needs to Know, 121–73. Second edition. | New York : Routledge, 2017. | Series: Studies in mathematical thinking and learning: Routledge, 2017. http://dx.doi.org/10.4324/9781315391908-4.
Lane, D. J. "Know the place, know the name: Syriac behind the newspapers." In The Harp (Volume 17), edited by Geevarghese Panicker, Rev Jacob Thekeparampil, and Abraham Kalakudi, 211–16. Piscataway, NJ, USA: Gorgias Press, 2011. http://dx.doi.org/10.31826/9781463233051-016.
Conference papers on the topic "Knot volume":
MURAKAMI, HITOSHI. "KASHAEV'S INVARIANT AND THE VOLUME OF A HYPERBOLIC KNOT AFTER Y. YOKOTA." In Proceedings of the Nagoya 1999 International Workshop. WORLD SCIENTIFIC, 2001. http://dx.doi.org/10.1142/9789812810199_0008.
Baseilhac, Stephane, and Riccardo Benedetti. "QHI, 3–manifolds scissors congruence classes and the volume conjecture." In Invariants of Knots and 3--manifolds. Mathematical Sciences Publishers, 2002. http://dx.doi.org/10.2140/gtm.2002.4.13.
Arons, A. B. "Research on teaching and learning: What should teachers know and when should they know it?" In AIP Conference Proceedings Volume 173. AIP, 1988. http://dx.doi.org/10.1063/1.37561.
Rajpurkar, Pranav, Robin Jia, and Percy Liang. "Know What You Don’t Know: Unanswerable Questions for SQuAD." In Proceedings of the 56th Annual Meeting of the Association for Computational Linguistics (Volume 2: Short Papers). Stroudsburg, PA, USA: Association for Computational Linguistics, 2018. http://dx.doi.org/10.18653/v1/p18-2124.
Byrnes, Susan. "Need-to-Know (NTK) Considerations for High Volume Data Access." In Proposed for presentation at the DOE Data Days (D3) 2022 held June 1-3, 2022 in Livermore, CA. US DOE, 2022. http://dx.doi.org/10.2172/2003063.
Axe, Albert R., and Taryn-Marie McCain. "The applicability and effect of the emergency planning and community right to know act on the photovoltaics industry." In AIP Conference Proceedings Volume 166. AIP, 1988. http://dx.doi.org/10.1063/1.37120.
Li, Weiping, and Weiping Zhang. "An L2–Alexander–Conway Invariant for Knots and the Volume Conjecture." In Proceedings of the 23rd International Conference of Differential Geometric Methods in Theoretical Physics. WORLD SCIENTIFIC, 2006. http://dx.doi.org/10.1142/9789812772527_0025.
Wu, Weiqi, Chengyue Jiang, Yong Jiang, Pengjun Xie, and Kewei Tu. "Do PLMs Know and Understand Ontological Knowledge?" In Proceedings of the 61st Annual Meeting of the Association for Computational Linguistics (Volume 1: Long Papers). Stroudsburg, PA, USA: Association for Computational Linguistics, 2023. http://dx.doi.org/10.18653/v1/2023.acl-long.173.
Tannenbaum, Michael J. "Observation of KNO scaling in the neutral energy spectra from αα and pp collisions at ISR energies." In AIP Conference Proceedings Volume 150. AIP, 1986. http://dx.doi.org/10.1063/1.36100.
HILDEN, HUGH M., MARÍA TERESA LOZANO, and JOSÉ MARAÍA MONTESINOS-AMILIBIA. "VOLUMES AND CHERN-SIMONS INVARIANTS OF CYCLIC COVERINGS OVER RATIONAL KNOTS." In Proceedings of the 37th Taniguchi Symposium. WORLD SCIENTIFIC, 1996. http://dx.doi.org/10.1142/9789814503921_0003.
Reports on the topic "Knot volume":
Levy Yeyati, Eduardo, and Jimena Zúñiga. Varieties of Capital Flows: What Do We Know? Inter-American Development Bank, April 2016. http://dx.doi.org/10.18235/0007017.
BENATECH INC ATLANTA GA. Energy Engineering Analysis Program, Energy Survey of Army Boiler and Chiller Plants at Fort Knox, Kentucky, Volume 1 - Executive Summary. Fort Belvoir, VA: Defense Technical Information Center, March 1993. http://dx.doi.org/10.21236/ada330901.
González, Mario, Alessandro Maffioli, Lina Salazar, and Paul Winters. Assessing the Effectiveness of Agricultural Interventions. Inter-American Development Bank, January 2010. http://dx.doi.org/10.18235/0005694.
Teräs, Jukka, Helge Flick, Anders Torgeir Hjertø Lind, and Timothy Heleniak. WANO policy brief. Nordregio, February 2024. http://dx.doi.org/10.6027/pb2024:2.2001-3876.
Udo-Udo Jacob, Jacob. Researching Violent Extremism: Considerations, Reflections, and Perspectives. Edited by Kateira Aryaeinejad, Alastair Reed, and Emma Heywood. RESOLVE Network, May 2023. http://dx.doi.org/10.37805/rve2023.1.
Bilovska, Natalia. HYPERTEXT: SYNTHESIS OF DISCRETE AND CONTINUOUS MEDIA MESSAGE. Ivan Franko National University of Lviv, March 2021. http://dx.doi.org/10.30970/vjo.2021.50.11104.
Hertel, Thomas, David Hummels, Maros Ivanic, and Roman Keeney. How Confident Can We Be in CGE-Based Assessments of Free Trade Agreements? GTAP Working Paper, June 2003. http://dx.doi.org/10.21642/gtap.wp26.
Preventing freewheeling of public safety portable radio volume-power knob. U.S. Department of Health and Human Services, Public Health Service, Centers for Disease Control and Prevention, National Institute for Occupational Safety and Health, June 2021. http://dx.doi.org/10.26616/nioshpub2021117.
Ecuador: Use commercial marketing to increase sustainability. Population Council, 2001. http://dx.doi.org/10.31899/rh2001.1007.