Relevant bibliographies by topics / Hyperbolic

Academic literature on the topic 'Hyperbolic'

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Published: 4 June 2021

Last updated: 1 August 2024

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Journal articles on the topic "Hyperbolic"

Pulungan, Ulfa Julianti, and Sisila Fitriany Damanik. "Hyperboles Used by A Beauty Influencer in The Beauty Product Reviews Videos on YouTube." TRANSFORM : Journal of English Language Teaching and Learning 11, no. 3 (March 11, 2023): 127. http://dx.doi.org/10.24114/tj.v11i3.44032.

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This study attempts to analyze hyperboles used by a beauty influencer in the beauty product review videos on YouTube. One of the most famous beauty influencer named Suhay Salim in her beauty product reviews videos on her YouTube channel often applying hyperbolic utterances. By following Claridge (2011) and Cano Mora (2006) theory of hyperbole, the study aims to find out the form of hyperbole that used by Suhay Salim in her beauty product reviews videos, and also how the hyperbolic utterance conveyed and why they used in the ways they are. In order to achieve the aims, the data is in the form of utterances that was selected from two of Suhay Salim’s most popular videos which contain skincare products review on her YouTube channel. The study adopts descriptive qualitative research method in order to give detailed explanation in describing the phenomenon. The results show that Suhay Salim uses six forms of hyperbole such as single word, phrasal, clausal, numerical, comparison and repetition hyperbole. And they are conveyed through variations of words, phrases and clauses. There are found some hyperbolic markers which can be grouped into two hyperbole form. There are found more than one hyperbolic marker in one example. And there are also found some examples have the same hyperbolic utterance. Moreover, the use of the hyperbole makes the utterances during reviewing the products way more attractive, convincing and persuasive which can attracts the viewer’s attention and influence them to buy the same product as the reviewer.

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Petkov, Emiliyan G. "Development and Implementation of NURBS Models of Quadratic Curves and Surfaces." Serdica Journal of Computing 3, no. 4 (January 11, 2010): 425–48. http://dx.doi.org/10.55630/sjc.2009.3.425-448.

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This article goes into the development of NURBS models of quadratic curves and surfaces. Curves and surfaces which could be represented by one general equation (one for the curves and one for the surfaces) are addressed. The research examines the curves: ellipse, parabola and hyperbola, the surfaces: ellipsoid, paraboloid, hyperboloid, double hyperboloid, hyperbolic paraboloid and cone, and the cylinders: elliptic, parabolic and hyperbolic. Many real objects which have to be modeled in 3D applications possess specific features. Because of this these geometric objects have been chosen. Using the NURBS models presented here, specialized software modules (plug-ins) have been developed for a 3D graphic system. An analysis of their implementation and the primitives they create has been performed.

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Ikhlas Mahdi Hassan. "A pragma-linguistic Analysis of hyperbolic Constructions in book Blurbs." Journal of the College of Basic Education 20, no. 85 (December 26, 2022): 815–31. http://dx.doi.org/10.35950/cbej.v20i85.8608.

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The main purpose of this paper is to investigate hyperbole inbook blurbs. Back cover blurbs, brief texts displayed on book covers,provide information about a book to potential readers. They aremainly evaluative- persuasive texts which summarize the mainfeatures of the book and provide a mostly subjective evaluation usinglexical, pragmatic and textual devices. One of these devices ishyperbole. Hyperbole (also referred to as exaggeration oroverstatement) has been studied in rhetoric and literary contexts, butonly relatively recently in book blurbs. This paper aims to analyze andclassify hyperbolic constructions in back cover blurbs of selectedbooks in order to identify their pragmatic functions as evaluation andpersuasion. In order to achieve the aim of the present study, thirty book blurbsof linguistics and literary books were analyzed through adopting alinguistic and pragmatic model. The findings reveal that hyperbolicconstructions are realized widely via lexical devices especiallyadjectives. Moreover, most of the hyperbolic constructions used in theselected texts fulfill certain pragmatic functions among whichevaluation and emphasis are highly frequent. Based on this, hyperboleis primarily evaluative rather than a descriptive or explanatory device.Key words: hyperbole, book blurbs, pragmatic functions

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Li, Yunyue, Yang Zhang, and Jon Claerbout. "Hyperbolic estimation of sparse models from erratic data." GEOPHYSICS 77, no. 1 (January 2012): V1—V9. http://dx.doi.org/10.1190/geo2011-0099.1.

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We have developed a hyperbolic penalty function for image estimation. The center of a hyperbola is parabolic like that of an [Formula: see text] norm fitting. Its asymptotes are similar to [Formula: see text] norm fitting. A transition threshold must be chosen for regression equations of data fitting and another threshold for model regularization. We combined two methods: Newton’s and a variant of conjugate gradient method to solve this problem in a manner we call the hyperbolic conjugate direction (HYCD) method. We tested examples of (1) velocity transform with strong noise (2) migration of aliased data, and (3) blocky interval velocity estimation. For the linear experiments we performed in this study, nonlinearity is introduced by the hyperbolic objective function, but the convexity of the sum of the hyperbolas assures the convergence of gradient methods. Because of the sufficiently reliable performance obtained on the three mainstream geophysical applications, we expect the HYCD solver method to become our default method.

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Haryadi, Rafi, and Yusmalinda Yusmalinda. "AN ANALYSIS OF HYPERBOLE USED IN HEART OF DARKNESS BY JOSEPH CONRAD." LINGUA LITERA : journal of english linguistics and literature 7, no. 2 (September 12, 2022): 12–22. http://dx.doi.org/10.55345/stba1.v7i2.165.

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Abstract The purpose of this research was to identify the forms of hyperbole found in Heart of Darkness by Joseph Conrad. The research data were taken from the novel Heart of Darkness by Joseph Conrad. The writer applied Claridge’s theory to classify the forms of hyperbole. There are seven forms of hyperbole. They are single-word hyperbole, phrasal hyperbole, clausal hyperbole, numerical hyperbole, hyperbolic superlatives, hyperbolic comparison, and hyperbolic repetition. This study was qualitative research. This study reveals that seven forms of hyperbole according to Claridge (2011) were found in Heart of Darkness by Joseph Conrad. The forms are single-word hyperbole, phrasal hyperbole, clausal hyperbole, numerical hyperbole, the role of the superlative, comparison, and repetition. From the occurrence of all seven forms of hyperbole, it was found that the most form of hyperbole was clausalhyperbole. In conclusion, it can be said that Joseph Conrad used all forms of hyperbole in the novel Heart of Darkness.

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Ovejas Ramírez, Carla. "Hyperbolic markers in modeling hyperbole: a scenario-based account." Círculo de Lingüística Aplicada a la Comunicación 85 (January 11, 2021): 61–71. http://dx.doi.org/10.5209/clac.66249.

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This article discusses hyperbolic markers in modeling hyperbole from the perspective of a scenario-based account of language use within the framework of Cognitive Linguistics. In this view, hyperbole is seen as a mapping across two conceptual domains (Peña y Ruiz de Mendoza, 2017), a source domain, here relabeled as the magnified scenario, which contains a hypothetical unrealistic situation based on exaggeration, and a target domain or observable scenario which depicts the real situation addressed by the hyperbolic expression. Since the hypothetical scenario is a magnified version of the observable scenario, the mapping contains source-target matches in varying degrees of resemblance. Within this theoretical context, the article explores resources available to speakers for the construction of magnified scenarios leading to hyperbolic interpretation. Among such resources, we find hyperbole markers and the setting up of domains of reference. Finally, the article also discusses hyperbole blockers, which cancel out the activity of the other hyperbolic meaning construction mechanisms.

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Reynolds, William F. "Hyperbolic Geometry on a Hyperboloid." American Mathematical Monthly 100, no. 5 (May 1993): 442. http://dx.doi.org/10.2307/2324297.

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Reynolds, William F. "Hyperbolic Geometry on a Hyperboloid." American Mathematical Monthly 100, no. 5 (May 1993): 442–55. http://dx.doi.org/10.1080/00029890.1993.11990430.

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IZUMIYA, SHYUICHI, DONGHE PEI, and TAKASI SANO. "SINGULARITIES OF HYPERBOLIC GAUSS MAPS." Proceedings of the London Mathematical Society 86, no. 2 (March 2003): 485–512. http://dx.doi.org/10.1112/s0024611502013850.

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In this paper we adopt the hyperboloid in Minkowski space as the model of hyperbolic space. We define the hyperbolic Gauss map and the hyperbolic Gauss indicatrix of a hypersurface in hyperbolic space. The hyperbolic Gauss map has been introduced by Ch. Epstein [J. Reine Angew. Math. 372 (1986) 96–135] in the Poincaré ball model, which is very useful for the study of constant mean curvature surfaces. However, it is very hard to perform the calculation because it has an intrinsic form. Here, we give an extrinsic definition and we study the singularities. In the study of the singularities of the hyperbolic Gauss map (indicatrix), we find that the hyperbolic Gauss indicatrix is much easier to calculate. We introduce the notion of hyperbolic Gauss–Kronecker curvature whose zero sets correspond to the singular set of the hyperbolic Gauss map (indicatrix). We also develop a local differential geometry of hypersurfaces concerning their contact with hyperhorospheres.2000 Mathematical Subject Classification: 53A25, 53A05, 58C27.

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Botvynovska, Svitlana, Zhanetta Levina, and Hanna Sulimenko. "IMAGING OF A HYPERBOLIC PARABOLOID WITH TOUCHING LINE WITH THE PARABOLAL WRAPPING CONE." Management of Development of Complex Systems, no. 48 (December 20, 2021): 53–60. http://dx.doi.org/10.32347/2412-9933.2021.48.53-60.

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The paper is dedicated to architectural structures modeling by means of computer-graphics. Images on the monitor represent perspective. That’s why the images could be assessed from the most convenient points as viewer’s position is considered to be the perspective center. Non-rectilinear profile makes the structure the most impressive. The hyperbolic paraboloid surface is researched. Parabolas and hyperbolas are the only forms of its sections except for tangent planes cases. Parabolas as contact lines are reviewed. Hyperbolic paraboloid is an infinite surface that’s why only a portion of it could be modeled. Four link space zigzag ({4l} indicator) is its best representation. In such case the non-rectilinear profile should be represented as a curve of second order semicircular arc. Modeling of a limited section does not affect the final modeling because the {4l} representation makes the depiction of all surface in that frame of axis that have the identified hyperbolic paraboloid looks like a cone. The paper’s objective is development of imaging technique using parabolic contact lines to design hyperbolic paraboloid surface and applicable to several surfaces of the same construction. To do so, parameter analysis of the task is conducted, the applicable theory is identified, and the hyperbolic paraboloid imaging technique using the set profile line in the form of any curve of second order is conducted, namely the imaging technique for contact parabola and the set of hyperbolic paraboloids which it set forth. The set of plans that may contain the parabolic contact line set is two-parameter. However, in general, the position of those planes is remains unknown. Thus, the task is as follows: find the third point of the plane that intersects the given wrapping cone along the parabola when the two points are given. These two points must belong to the same forming line on the cone. The imaging requires 7 parameters whereas the hyperbolic paraboloid has 8 parameters. That’s why with one parabolic contact line and given wrapping cone of the second order one-parameter set of hyperbolic paraboloids could be imaged. The paper shows how to image the contact line if the profile line is given as a parabola, ellipse, or hyperbola. The portion of one hyperbolic paraboloid may imaged when the parameters are aligned and any other bisecant of same perspective line of shape. Two portions of parabola conjugated due to the joint wrapping cone hyperbolic paraboloid imaging is demonstrated.

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Dissertations / Theses on the topic "Hyperbolic"

Hawksley, Ruth. "Hyperbolic monopoles." Thesis, University of Edinburgh, 1998. http://hdl.handle.net/1842/14019.

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A Euclidean SU(2) monopole consists of a connection and Higgs field on an SU(2) bundle over π³, satisfying certain partial differential equations. Monopoles may equivalently be described in terms of holomorphic vector bundles on twistor space, algebraic curves in twistor space, rational maps, or solutions to Nahm's equations (a set of ODEs for matrix-valued functions), all satisfying some further conditions. Research by Atiyah, Donaldson, Hitchin, Nahm and others has provided a beautiful and relatively complete picture of these different viewpoints and the links between them. Monopoles have also been studied on hyperbolic space π³, although the corresponding picture in this case is less well understood. One difficulty is that the conditions which must be imposed in order for all the various correspondences to be valid have not yet been completely determined. A partial answer is given in Chapter 2, where it is proved that any hyperbolic monopole arising from a spectral curve satisfies a certain natural boundary condition. The proof uses the algebraic geometry of the spectral curve and is similar to Hurtubise's proof of the analogous result in the Euclidean case. A large part of this thesis concentrates on the "Braam-Austin" description of hyperbolic monopoles. This is the hyperbolic version of Nahm's description of Euclidean monopoles; a monopole corresponds to a pair of discrete matrix-valued functions satisfying some difference equations. Euclidean monopoles appear as limits of hyperbolic monopoles as the curvature of π³ tends to zero. This "Euclidean limit" is described geometrically and is studied in terms of Braam-Austin data. Explicit conditions are given for such a sequence to have a subsequence converging to a Euclidean monopole. The result depends on a conjecture (§ 4.5) about properties of Braam-Austin monopole solutions.

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Lê, Nguyên Khoa 1975. "Time-frequency analyses of the hyperbolic kernel and hyperbolic wavelet." Monash University, Dept. of Electrical and Computer Systems Engineering, 2002. http://arrow.monash.edu.au/hdl/1959.1/8299.

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Vlamis, Nicholas George. "Identities on hyperbolic manifolds and quasiconformal homogeneity of hyperbolic surfaces." Thesis, Boston College, 2015. http://hdl.handle.net/2345/bc-ir:104137.

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Thesis advisor: Martin J. Bridgeman
Thesis advisor: Ian Biringer
The first part of this dissertation is on the quasiconformal homogeneity of surfaces. In the vein of Bonfert-Taylor, Bridgeman, Canary, and Taylor we introduce the notion of quasiconformal homogeneity for closed oriented hyperbolic surfaces restricted to subgroups of the mapping class group. We find uniform lower bounds for the associated quasiconformal homogeneity constants across all closed hyperbolic surfaces in several cases, including the Torelli group, congruence subgroups, and pure cyclic subgroups. Further, we introduce a counting argument providing a possible path to exploring a uniform lower bound for the nonrestricted quasiconformal homogeneity constant across all closed hyperbolic surfaces. We then move on to identities on hyperbolic manifolds. We study the statistics of the unit geodesic flow normal to the boundary of a hyperbolic manifold with non-empty totally geodesic boundary. Viewing the time it takes this flow to hit the boundary as a random variable, we derive a formula for its moments in terms of the orthospectrum. The first moment gives the average time for the normal flow acting on the boundary to again reach the boundary, which we connect to Bridgeman's identity (in the surface case), and the zeroth moment recovers Basmajian's identity. Furthermore, we are able to give explicit formulae for the first moment in the surface case as well as for manifolds of odd dimension. In dimension two, the summation terms are dilogarithms. In dimension three, we are able to find the moment generating function for this length function
Thesis (PhD) — Boston College, 2015
Submitted to: Boston College. Graduate School of Arts and Sciences
Discipline: Mathematics

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Ray, Gourab. "Hyperbolic random maps." Thesis, University of British Columbia, 2014. http://hdl.handle.net/2429/48417.

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Random planar maps have been an object of utmost interest over the last decade and half since the pioneering works of Benjamini and Schramm, Angel and Schramm and Chassaing and Schaeffer. These maps serve as models of random surfaces, the study of which is very important with motivations from physics, combinatorics and random geometry. Uniform infinite planar maps, introduced by Angel and Schramm, which are obtained as local limits of uniform finite maps embedded in the sphere, serve as a very important discrete model of infinite random surfaces. Recently, there has been growing interest to create and understand hyperbolic versions of such uniform infinite maps and several conjectures and proposed models have been around for some time. In this thesis, we mainly address these questions from several viewpoints and gather evidence of their existence and nature. The thesis can be broadly divided into two parts. The first part is concerned with half planar maps (maps embedded in the upper half plane) which enjoy a certain domain Markov property. This is reminiscent of that of the SLE curves. Chapters 2 and 3 are mainly concerned with classi cation of such maps and their study, with a special focus on triangulations. The second part concerns investigating unicellular maps or maps with one face embedded in a high genus surface. Unicellular maps are generalizations of trees in higher genera. The main motivation is that investigating such maps will shed some light into understanding the local limit of general maps via some well-known bijective techniques. We obtain certain information about the large scale geometry of such maps in Chapter 4 and about the local limit of such maps in Chapter 5.
Science, Faculty of
Mathematics, Department of
Graduate

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Moussong, Gabor. "Hyperbolic Coxeter groups." Connect to this title online, 1988. http://rave.ohiolink.edu/etdc/view?acc%5Fnum=osu1112044027.

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Bult, Fokko Joppe van de. "Hyperbolic hypergeometric functions." [Amsterdam] : Amsterdam : Thomas Stieltjes Institute for Mathematics ; Universiteit van Amsterdam [Host], 2007. http://dare.uva.nl/document/97725.

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Koundouros, Stilianos. "Hyperbolic 3-manifolds." Thesis, University of Cambridge, 2004. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.615624.

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Markham, Sarah. "Hypercomplex hyperbolic geometry." Thesis, Durham University, 2003. http://etheses.dur.ac.uk/3698/.

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The rank one symmetric spaces of non-compact type are the real, complex, quaternionic and octonionic hyperbolic spaces. Real hyperbolic geometry is widely studied complex hyperbolic geometry less so, whilst quaternionic hyperbolic geometry is still in its infancy. The purpose of this thesis is to investigate the conditions for discrete group action in quaternionic and octonionic hyperbolic 2-spaces and their geometric consequences, in the octonionic case, in terms of lower bounds on the volumes of non-compact manifolds. We will also explore the eigenvalue problem for the 3 x 3 octonionic matrices germane to the Jordan algebra model of the octonionic hyperbolic plane. In Chapters One and Two we concentrate on discreteness conditions in quaternionic hyperbolic 2-space. In Chapter One we develop a quaternionic Jørgensen's inequality for non-elementary groups of isometries of quaternionic hyperbolic 2-space generated by two elements, one of which is either loxodromic or boundary elliptic. In Chapter Two we give a generalisation of Shimizu's Lemma to groups of isometries of quaternionic hyperbolic 2-space containing a screw-parabolic element. In Chapter Three we present the Jordan algebra model of the octonionic hyperbolic plane and develop a generalisation of Shimizu's Lemma to groups of isometries of octonionic hyperbolic 2-space containing a parabolic map. We use this result to determine estimates of lower bounds on the volumes of non-compact closed octonionic 2-manifolds. In Chapter Four we construct an octonionic Jørgensen's inequality for non-elementary groups of isometries of octonionic hyperbolic 2-space generated by two elements, one of which is loxodromic. In Chapter Five we solve the real eigenvalue problem Xv = λv, for the 3 x 3 ɸ-Hermitian matrices, X, of the Jordan algebra model of the octonionic hyperbolic plane. Finally, in Chapter Six we consider the embedding of collars about real geodesies in complex hyperbohc 2-space, quaternionic hyperbolic 2-space and octonionic hyperbolic 2-space.

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ALMEIDA, HELLEN ANGELICA DA SILVA. "HYPERBOLIC COXETER GROUPS." PONTIFÍCIA UNIVERSIDADE CATÓLICA DO RIO DE JANEIRO, 2009. http://www.maxwell.vrac.puc-rio.br/Busca_etds.php?strSecao=resultado&nrSeq=32643@1.

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PONTIFÍCIA UNIVERSIDADE CATÓLICA DO RIO DE JANEIRO
COORDENAÇÃO DE APERFEIÇOAMENTO DO PESSOAL DE ENSINO SUPERIOR
PROGRAMA DE SUPORTE À PÓS-GRADUAÇÃO DE INSTS. DE ENSINO
Grupos de Coxeter ou de reflexões são importantes no estudo de inúmeras áreas da matemática, incluindo grupos e álgebras de Lie. Nesta dissertação apresentaremos a teoria básica de grupos de reflexões e a classificação dos grupos hiperbólicos, i.e., daqueles que agem no espaço hiperbólico tendo como domínio fundamental um politopo compacto.
Groups of Coxeter or of reflections they are important in the study of countless areas of the mathematics, including groups and algebras of Lie. In this dissertation we will present the basic theory of groups of reflections and the classification of the hyperbolic groups, this is of those that act in the hyperbolic space tends as fundamental domain a compact politopo.

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Marshall, Joseph. "Computation in hyperbolic groups." Thesis, University of Warwick, 2001. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.369403.

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Books on the topic "Hyperbolic"

Anderson, James W. Hyperbolic Geometry. London: Springer London, 1999. http://dx.doi.org/10.1007/978-1-4471-3987-4.

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Kuznetsov, Sergey P. Hyperbolic Chaos. Berlin, Heidelberg: Springer Berlin Heidelberg, 2012. http://dx.doi.org/10.1007/978-3-642-23666-2.

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Beckh, Matthias. Hyperbolic structures. Chichester, UK: John Wiley & Sons, Ltd, 2015. http://dx.doi.org/10.1002/9781118932711.

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Anderson, James W. Hyperbolic geometry. London: Springer, 1999.

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Beckh, Matthias. Hyperbolic structures. Chichester, West Sussex, United Kingdom: John Wiley & Sons Inc., 2014.

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Todd, Fisher. Hyperbolic Flows. Berlin, Germany: European Mathematical Society, 2019.

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Alves, José F. Nonuniformly Hyperbolic Attractors. Cham: Springer International Publishing, 2020. http://dx.doi.org/10.1007/978-3-030-62814-7.

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Carasso, Claude, Pierre Charrier, Bernard Hanouzet, and Jean-Luc Joly, eds. Nonlinear Hyperbolic Problems. Berlin, Heidelberg: Springer Berlin Heidelberg, 1989. http://dx.doi.org/10.1007/bfb0083863.

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Carasso, Claude, Denis Serre, and Pierre-Arnaud Raviart, eds. Nonlinear Hyperbolic Problems. Berlin, Heidelberg: Springer Berlin Heidelberg, 1987. http://dx.doi.org/10.1007/bfb0078312.

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Ungar, A. A. Hyperbolic Triangle Centers. Dordrecht: Springer Netherlands, 2010. http://dx.doi.org/10.1007/978-90-481-8637-2.

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Book chapters on the topic "Hyperbolic"

Benjamini, Itai. "The Hyperbolic Plane and Hyperbolic Graphs." In Lecture Notes in Mathematics, 23–31. Cham: Springer International Publishing, 2013. http://dx.doi.org/10.1007/978-3-319-02576-6_3.

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Pikulin, Victor P., and Stanislav I. Pohozaev. "Hyperbolic problems." In Equations in Mathematical Physics, 81–160. Basel: Birkhäuser Basel, 2001. http://dx.doi.org/10.1007/978-3-0348-8285-9_3.

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Lang, Serge. "Hyperbolic Imbeddings." In Introduction to Complex Hyperbolic Spaces, 31–64. New York, NY: Springer New York, 1987. http://dx.doi.org/10.1007/978-1-4757-1945-1_3.

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Shub, Michael. "Hyperbolic Sets." In Global Stability of Dynamical Systems, 20–32. New York, NY: Springer New York, 1987. http://dx.doi.org/10.1007/978-1-4757-1947-5_4.

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Benedetti, Riccardo, and Carlo Petronio. "Hyperbolic Space." In Universitext, 1–43. Berlin, Heidelberg: Springer Berlin Heidelberg, 1992. http://dx.doi.org/10.1007/978-3-642-58158-8_1.

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Alves, José F. "Hyperbolic Structures." In Springer Monographs in Mathematics, 103–59. Cham: Springer International Publishing, 2020. http://dx.doi.org/10.1007/978-3-030-62814-7_4.

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Pilyugin, Sergei Yu. "Hyperbolic Sets." In Introduction to Structurally Stable Systems of Differential Equations, 119–56. Basel: Birkhäuser Basel, 1988. http://dx.doi.org/10.1007/978-3-0348-8643-7_12.

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Thomas, J. W. "Hyperbolic Equations." In Texts in Applied Mathematics, 205–59. New York, NY: Springer New York, 1995. http://dx.doi.org/10.1007/978-1-4899-7278-1_6.

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Trudeau, Richard J. "Hyperbolic Geometry." In The Non-Euclidean Revolution, 173–231. Boston, MA: Birkhäuser Boston, 2001. http://dx.doi.org/10.1007/978-1-4612-2102-9_6.

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Shen, Samuel S. "Hyperbolic Waves." In Nonlinear Topics in the Mathematical Sciences, 25–51. Dordrecht: Springer Netherlands, 1993. http://dx.doi.org/10.1007/978-94-011-2102-6_2.

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Conference papers on the topic "Hyperbolic"

Kong, Li, Chuanyi Li, and Vincent Ng. "Deexaggeration." In Thirty-First International Joint Conference on Artificial Intelligence {IJCAI-22}. California: International Joint Conferences on Artificial Intelligence Organization, 2022. http://dx.doi.org/10.24963/ijcai.2022/581.

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We introduce a new task in hyperbole processing, deexaggeration, which concerns the recovery of the meaning of what is being exaggerated in a hyperbolic sentence in the form of a structured representation. In this paper, we lay the groundwork for the computational study of understanding hyperbole by (1) defining a structured representation to encode what is being exaggerated in a hyperbole in a non-hyperbolic manner, (2) annotating the hyperbolic sentences in two existing datasets, HYPO and HYPO-cn, using this structured representation, (3) conducting an empirical analysis of our annotated corpora, and (4) presenting preliminary results on the deexaggeration task.

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"Hyperbolic Paraboloid Shell Structures." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/3164.

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"Hyperbolic Paraboloid Performance and Cost." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/3612.

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"Groined Vaults." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/2823.

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"Umbrella and Gable Roofs." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/3170.

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"Bending Theory." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/2808.

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"Saddle Shells." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/2816.

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"Construction." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/3420.

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"Membrane Analysis." In SP-110: Hyperbolic Paraboloid Shells. American Concrete Institute, 1988. http://dx.doi.org/10.14359/2798.

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Guo, Yunhui, Xudong Wang, Yubei Chen, and Stella X. Yu. "Clipped Hyperbolic Classifiers Are Super-Hyperbolic Classifiers." In 2022 IEEE/CVF Conference on Computer Vision and Pattern Recognition (CVPR). IEEE, 2022. http://dx.doi.org/10.1109/cvpr52688.2022.00010.

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Reports on the topic "Hyperbolic"

Chu, Isaac, Gregory Fu, Mark Steffen, and Matthias Sherwood. Hyperbolic Analysis. Web of Open Science, April 2020. http://dx.doi.org/10.37686/ejai.v1i1.29.

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Stannard, Casey R., and Paul Callahan. Hyperbolic Honeycomb. Ames: Iowa State University, Digital Repository, November 2016. http://dx.doi.org/10.31274/itaa_proceedings-180814-1635.

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Ungar, Abraham A. Hyperbolic Geometry. GIQ, 2014. http://dx.doi.org/10.7546/giq-15-2014-259-282.

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Ungar, Abraham A. Hyperbolic Geometry. Jgsp, 2013. http://dx.doi.org/10.7546/jgsp-32-2013-61-86.

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Shearer, Michael. Nonlinear Hyperbolic Conservation Laws. Fort Belvoir, VA: Defense Technical Information Center, August 1987. http://dx.doi.org/10.21236/ada184963.

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Ungar, Abraham A. The Hyperbolic Triangle Defect. GIQ, 2012. http://dx.doi.org/10.7546/giq-5-2004-225-236.

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Keyfitz, Barbara L. Nonstrictly Hyperbolic Conservation Laws. Fort Belvoir, VA: Defense Technical Information Center, November 1989. http://dx.doi.org/10.21236/ada218525.

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Hyman, J., M. Shashikov, B. Swartz, and B. Wendroff. Multidimensional methods for hyperbolic problems. Office of Scientific and Technical Information (OSTI), April 1996. http://dx.doi.org/10.2172/224954.

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Steinhardt, Allan O. Hyperbolic Transforms in Array Processing. Fort Belvoir, VA: Defense Technical Information Center, February 1991. http://dx.doi.org/10.21236/ada247061.

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Ungar, Abraham A. The Relativistic Hyperbolic Parallelogram Law. GIQ, 2012. http://dx.doi.org/10.7546/giq-7-2006-249-264.

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Academic literature on the topic 'Hyperbolic'

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Contents

Journal articles on the topic "Hyperbolic"

Dissertations / Theses on the topic "Hyperbolic"

Books on the topic "Hyperbolic"

Book chapters on the topic "Hyperbolic"

Conference papers on the topic "Hyperbolic"

Reports on the topic "Hyperbolic"