Relevant bibliographies by topics / Harmony of the spheres

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  1. Journal articles
  2. Dissertations / Theses
  3. Books
  4. Book chapters
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Academic literature on the topic 'Harmony of the spheres'

Author: Grafiati
Published: 4 June 2021
Last updated: 28 July 2024

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Journal articles on the topic "Harmony of the spheres"

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Swindale, Nicholas V. "Harmony of the spheres?" Psychomusicology: Music, Mind, and Brain 23, no. 3 (2013): 187–91. http://dx.doi.org/10.1037/pmu0000010.

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Lindblom, Per Henrik. "Harmony of the legal spheres." European Review of Private Law 5, Issue 1 (March 1, 1997): 11–46. http://dx.doi.org/10.54648/149355.

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The Storme Commission has published a proposal for a Directive on harmonisation of certain aspects of civil procedure. This initiative is to be welcomed as promoting discussion of the need for and problems of harmonisation, but provides no definitive solutions. The European Union probably has competence to legislate in this area, provided that the harmonisation measures adopted do in fact facilitate the development of the single market. The risk is that partial harmonisation will not achieve this objective but will instead lead to greater complexity because of the need to deal with the interaction between harmonised and non-harmonised rules. An analysis of the Storme Commission proposals demonstrates that they leave considerable uncertainty as to the remaining role of national laws, and that they would not gain universal acceptance because they would conflict with the approach adopted in some jurisdictions.
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Max, Nelson. "Another harmony of the spheres." Nature 355, no. 6356 (January 1992): 115–16. http://dx.doi.org/10.1038/355115a0.

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Baimuratov, Uraz. "ON THE DISCOVERY OF THE "LAW OF PRESERVATION AND DEVELOPMENT OF ETHNOS BY MEANS OF SAVING HARMONY ON A TRUE SPIRITUAL BASIS"." BULLETIN 2, no. 390 (April 15, 2021): 268–73. http://dx.doi.org/10.32014/2021.2518-1467.80.

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The article highlights the scientific discovery of the author. In this case, the category of the duality of the world "Harmony-disharmony" is used, which is both spiritual and material at the same time. Spiritually oriented worldview is given special attention. The purpose of a person's life in our earthly life is set by our Creator and consists in successfully passing the tests for confession in earthly life. This allows a person to hope for eternal life in paradise. The concept of Harmony has tremendous methodological significance for humanities. A comparative analysis of two forms of life of individuals and societies is given. The role of saving Harmony, its laws is stated, including the newly discovered one. Harmony means an essential connection, dimensionality, conformity, unity of various spheres of society, without fail on the basis of true spirituality and morality. The paradigm of Harmony is a systemic combination of demoethics "D" as the main sphere with three other spheres of society (demography "D", democracy "D" and demoeconomics "D") according to the formula "D + 3D". The absence or lagging behind of one of these spheres means disharmony, lack of spirituality and immorality are especially pernicious. In Harmony, there is an economic Law of dominant elevation of true spiritual needs over reasonable material and non-material needs and desires of individuals.
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Stefankiewicz, A. R., and J. K. M. Sanders. "Harmony of the Self-Assembled Spheres." Science 328, no. 5982 (May 27, 2010): 1115–16. http://dx.doi.org/10.1126/science.1190821.

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Marchenkov, Vladimir L. "Theurgy revisited, or the harmony of cultural spheres." Studies in East European Thought 71, no. 1 (February 7, 2019): 27–42. http://dx.doi.org/10.1007/s11212-019-09318-5.

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Kolomiets, G. G., and D. Rasul-Kareyev. "Philosophical Conversations about Music in Simple Language. Pythagoras: the Divine Number and World Musical Harmony." Concept: philosophy, religion, culture 7, no. 2 (June 18, 2023): 154–67. http://dx.doi.org/10.24833/2541-8831-2023-2-26-154-167.

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The article is written on the basis of a conversation on the philosophy of music by Professor G.G. Kolomiets, author of the book Value of music: philosophical aspect, with a musician from France, Dmitry Rasul-Kareev, Clarinet solo of Orchestra de la Suisse Romande. The dialogue gives a detailed and simple understanding of the philosophical view of music on the example of the ancient philosopher Pythagoras. His cosmological teaching saw the kinship of music, mathematics and philosophy and stated that the divine perception of the world is contained in the divine Number permeating the entire cosmos and our life. Music is made of numerical proportions and acts as a substance that exists even without a person, yet this unchanging principle of divine harmony, can be felt, experienced and expressed in musical art. Cosmologists believed there is a comprehensive law, according to which objects obey the divine mind, the great Rhythm. Music seemed to be the embodiment of the rhythm of the universe and harmony. The essence of the harmony of the spheres is that the cosmos is a harmoniously arranged and musical-sounding body. The movement of the starry sky creates the music of the cosmic spheres, which is refracted when playing musical instruments, and this lends itself to precise mathematical calculations. The intervals between the cosmic spheres are mathematically correlated with each other like the intervals of tones in music. The Pythagorean understanding of the numerical harmony of the structure of the universe largely determined the path of development of music theory, forming the main musical categories: fret, rhythm, interval, modulation and others. The modern philosophy of music deepens the Pythagorean ideas of harmony of spheres, putting forward the principles of functionality and processivity as properties of music, and allows us to talk about the law of cyclicity on a global scale. For example, following Pythagoras, music outside of the actual musical art is interpreted as a reflection of the vibrations of a complex communicative system: man-society-nature-cosmos.
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Pickering, Judith. "Harmony of the spheres: musical elements of couple communication." Musical Connections in Couple and Family Psychoanalysis 10, no. 1 (March 9, 2020): 42–58. http://dx.doi.org/10.33212/cfp.v10n1.2020.42.

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Music is the language of the emotions and musical elements of speech are the way in which emotional states are expressed. This article amplifies the multi-modal musical spectrum of psychotherapy with couples, families, and individuals. Musical qualities of communication underlie myriad forms of unconscious and conscious communication in the therapeutic setting, whether concerning the analytic couple of individual therapy, the various dyads and triads of couple therapy, or the multiple intersecting groupings involved in family therapy. When couples engage in states of intersubjective intimacy, their dialogue features a melodious form of speech featuring improvised reciprocal imitation, theme, and variation. When a couple have been triggered into an interlocking traumatic scene, harmony is replaced with cacophony. Awareness of the acoustic features of different emotional states such as depression, anger, and anxiety, as well as specific features of the activation of an interlocking traumatic scene, helps alert therapists that such a shift has taken place. In turn, this will help tune appropriate therapeutic responses.
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Proust, Dominique. "The Harmony of the Spheres from Pythagoras to Voyager." Proceedings of the International Astronomical Union 5, S260 (January 2009): 358–67. http://dx.doi.org/10.1017/s1743921311002535.

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Lord, Mary Louise. "Virgil's Eclogues, Nicholas Trevet, and the Harmony of the Spheres." Mediaeval Studies 54 (January 1992): 186–273. http://dx.doi.org/10.1484/j.ms.2.306397.

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Dissertations / Theses on the topic "Harmony of the spheres"

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Teeuwen, Mariken. "Harmony and the music of the spheres the ars musica in ninth-century commentaries on Martianus Capella /." Leiden [etc.] : Brill, 2002. http://catalogue.bnf.fr/ark:/12148/cb388575092.

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Teeuwen, Mariken. "Harmony and the music of the spheres : The "Ars Musica" in Ninth-century commentaries on Martianus Capella /." Utrecht (Pays-Bas) : [s. n.], 2000. http://catalogue.bnf.fr/ark:/12148/cb39300516w.

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Ratto, Andrea. "Harmonic maps of spheres and equivariant theory." Thesis, University of Warwick, 1987. http://wrap.warwick.ac.uk/62726/.

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In Chapter I we produce many new harmonic maps of spheres by the qualitative study of the pendulum equations for the join and the Hopf construction. In particular, we obtain Corollary 1.7.1. Let Φ1 : Sp -> Sr be any harmonic homogeneous polynomial of degree greater or equal than two, and let Φ2 be the identity map id : Sq -> Sq. Then the (q+1)-suspension of Φ1 is harmonically representable by an equivariant map of the form Φ1 * Φ2 if and only if q=0 ....5. Corollary 1.11.1. Let [f] E ΠSp be a stable class in the image of the stable J-ho momorphism Jp :Πp (0) -> ΠSp, p >= 6. Then there exists q > p such that [f] can be represented by a harmonic map Φ : Sp+q+1 -> Sq+1. In Chapter II we illustrate equivariant theory and study the rendering problems: in particular, we show that the restriction q=o ...5 in Corollary 1.7.1. can be removed provided that the domain is given a suitable riemannian metric; then, for istance, the groups Πn(Sn) = Z can be rendered harmonic for every n. In Chapter III we describe applications of equivariant theory to the study of Dirichlet problems and warped products; and extensions of the theory to spaces with conical singularities.
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Nakajima, Tôru. "Stability and singularities of harmonic maps into spheres /." Sendai : Tohoku Univ, 2003. http://www.gbv.de/dms/goettingen/383853893.pdf.

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Fawley, Helen Linda. "Twist or theory of immersions of surfaces in four-dimensional spheres and hyperbolic spaces." Thesis, Durham University, 1997. http://etheses.dur.ac.uk/4766/.

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Let f : S → S(^4) be an immersion of a Riemann surface in the 4-sphere. The thesis begins with a study of the adapted moving frame of / in order to produce conditions for certain naturally defined lifts to SO(5)/U(2) and S0(5)T(^2) to be conformal, harmonic and holomorphic with respect to two different but naturally occuring almost complex structures. This approach brings together the results of a number of authors regarding lifts of conformal, minimal immersions including the link with solutions of the Toda equations. Moreover it is shown that parallel mean curvature immersions have haj-monic lifts into S0(5)/U(2).A certain natural lift of / into CP(^3), the twistor space of S(^4), is studied more carefully via an explicit description and in the case of / being a conformal immersion this gives a beautiful and simple formula for the lift in terms of a stereographic co-ordinate associated to /. This involves establishing explicitly the two-to-one correspondence between elements of the matrix groups Sp(2) and SO(5) and working with quaternions. The formula enables properties of such lifts to be explored and in particular it is shown that the harmonic sequence of a harmonic lift is either finite or satisfies a certain symmetry property. Uniqueness properties of harmonic lifts are also proved. Finally, the ideas are extended to the hyperbolic space H(^4) and after an exposition of the twistor fibration for this case, a method for constructing superminimal immersions of surfaces into H'^ from those in S"' is given.
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Bahy-El-Dien, A. A. "On the construction of harmonic two-spheres in complex hyperquadrics and quaternionic projective spaces." Thesis, University of Leeds, 1988. http://ethos.bl.uk/OrderDetails.do?uin=uk.bl.ethos.384090.

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Anand, Christopher Kumar. "Uniton bundles : parametrizing harmonic two-spheres in a unitary group by holomorphic vector bundles." Thesis, McGill University, 1994. http://digitool.Library.McGill.CA:80/R/?func=dbin-jump-full&object_id=28411.

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We show that a twistor construction of Hitchin and Ward can be adapted to study unitons (harmonic spheres in a unitary group). Specifically, we show that unitons are equivalent to holomorphic bundles with extra structure over a rational ruled surface. This equivalence allows us to confirm the conjecture of Wood that unitons are rational. These bundles are in turn representable by monads. By interpreting the uniton construction of Ward in this setting, we are able to give an expression for unitons of 'simplest type' in terms of the monad data (three matrices) using only matrix operations. This expression yields a proof that the components of the moduli and energy levels are one and the same for unitons of 'simplest type'.
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Viltanioti, Irini Fotini. "De l'omphalos de la Terre à la cité céleste d'Apollon: études sur la doctrine de la Tétractys dans le pythagorisme ancien." Doctoral thesis, Universite Libre de Bruxelles, 2010. http://hdl.handle.net/2013/ULB-DIPOT:oai:dipot.ulb.ac.be:2013/210038.

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La doctrine pythagoricienne de la Tétractys est sans doute une des questions les plus délicates de l’histoire de la philosophie. Elle représente non seulement une des théories essentielles de l’arithmologie, mais aussi, ainsi que la doxographie ancienne en témoigne, « le plus grand secret et le fondement de la philosophie pythagoricienne ». Armand Delatte, dans ses classiques Etudes sur la littérature pythagoricienne, a souligné l’importance véhiculée par ce philosophème. Dans la première partie, « méthodologique », de notre étude, nous traitons du lien entre Platon et la pensée pythagoricienne, en prenant comme fil conducteur trois notions essentielles: le silence voué des initiés de l’ordre et la pratique du secret ;l’expression énigmatique et « symbolique » ;la pratique de l’allégorie (hyponoia), indissolublement associée, elle, à celle du mythe. La deuxième partie de notre travail est centrée sur le témoignage le plus ancien au sujet de la Tétractys, à savoir sur la fameuse maxime des Acousmatiques :« Qu’est-ce que l’oracle des Delphes ?La Tétractys, c'est-à-dire l’harmonie où se trouvent les Sirènes ». En outre, en modérant, d’une certaine manière, l’ « ésotérisme historique » de l’Ecole de Tübingen, dont nous nous prenons des distances quant à certains points (comme, par exemple, l’importance de la méthode allégorique), nous tentons, dans la troisième et dernière partie de notre étude, de lire certains passages mythiques de Platon comme des allégories susceptibles d’être comprises et de trouver leur cohérence à la lumière de la tradition indirecte, voire de la théorie platonicienne sur les nombres, théorie intimement liée à la doctrine pythagoricienne de la Tétractys. Dans cet ordre d’idées, à partir de la République et du Timée jusqu’au Phèdre et au Gorgias, la mathématisation platonicienne de la réalité se verrait intégrée aux mythes, dont la somptuosité poétique ne serait qu’une image de l’enchantement philosophique entraînant l’élévation de l’âme vers l’Un – Bien. Bien qu’ayant toujours présents à l’esprit les dangers auxquels notre étude s’expose, nous n’avons pas toujours su les éliminer. Nous ne méconnaissons aucunement ses lacunes et ses faiblesses. Nous considérons en revanche que son avantage réside en ce qu’elle tente de contribuer à éclairer d’une lumière nouvelle certains aspects méconnus. C’est sans doute là que se situe le danger, mais aussi son intérêt.


Doctorat en Philosophie
info:eu-repo/semantics/nonPublished

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Avery, Wendy. "Harmony." Thesis, Virginia Tech, 1998. http://hdl.handle.net/10919/36537.

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Mayers, Jonathan. "Transmutational Harmony." ScholarWorks@UNO, 2011. http://scholarworks.uno.edu/td/1328.

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The work that I have produced during my graduate studies at the University of New Orleans addresses the impact that humans have on the environment in our contemporary world. A primary focus, but not exclusive, includes industrial materials or objects, their overwhelming presence that informs the juxtaposition of economic progress, and the reality of environmental disruption. Humor and metaphor are central themes of my work and reference my personal observations and experiences of living in the midst of these environments. Sources from Contemporary underground art have been filtered through my exposure to studio practice and art history, mainly the autonomous processes of Surrealism, resulting in a variety of influences that inform my work. I present imaginary images of architectural, biological, and mechanical transformations with the hopes of nudging the viewers' expectations and to create a better understanding of my opinion pertaining to the world and reality we all live in.
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Books on the topic "Harmony of the spheres"

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Solomon, Jon. Harmony in Ptolemy's harmonics. Armidale, N.S.W: University of New England-Armidale, 1990.

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Gruntz-Stoll, Johannes. Harmonik: Sprache des Universums : Überlieferung und Überwindung pythagoräischer Harmonik. Bern: Kreis der Freunde um Hans Kayser, 2000.

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1891-1964, Kayser Hans, Haase Rudolf, Studer André M. 1926-, and Kreis der Freunde um Hans Kayser Bern., eds. Im Anfang war der Klang: Was ist Harmonik? : Nachdruck vergriffener Texte. Bern: Der Kreis, 1986.

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Jacomien, Prins, and Teeuwen Mariken, eds. Harmonisch labyrint: De muziek van de kosmos in de westerse wereld. Hilversum: Verloren, 2007.

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Fabbri, Natacha. Cosmologia e armonia in Kepler e Mersenne: Contrappunto a due voci sul tema dell'harmonice mundi. Firenze: L.S. Olschki, 2003.

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Mathieu, W. A. Harmonic experience: Tonal harmony from Its natural origins to its modern expression. Rochester, Vermont: Inner Traditions International, 1997.

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Vauclair, Sylvie. La nouvelle musique des sphères. Paris: Odile Jacob, 2013.

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Cousto. Orpheus-Handbuch: Die Wirkung der Rhythmen unserer Erde auf Körper, Seele und Geist : ein Leitfaden für Theorie und Praxis. Berlin: Simon und Leutner, 1991.

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Zipp, Friedrich. Vom Urklang zur Weltharmonie: Werden und Wirken der Idee der Sphärenmusik. Kassel: Merseburger, 1985.

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Cousto. Klange, Bilder, Welten: Musik im Einklang mit der Natur. Berlin: Simon und Leutner, 1989.

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Book chapters on the topic "Harmony of the spheres"

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Barnes, John. "Harmony of the Spheres." In Gems of Geometry, 157–78. Berlin, Heidelberg: Springer Berlin Heidelberg, 2012. http://dx.doi.org/10.1007/978-3-642-30964-9_7.

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Barnes, John. "Harmony of the Spheres." In Gems of Geometry, 147–68. Berlin, Heidelberg: Springer Berlin Heidelberg, 2009. http://dx.doi.org/10.1007/978-3-642-05092-3_7.

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Walker, Daniel P. "The Harmony of the Spheres." In The Western Ontario Series in Philosophy of Science, 67–77. Dordrecht: Springer Netherlands, 2000. http://dx.doi.org/10.1007/978-94-015-9578-0_2.

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McDonald, Grantley. "The Reception of Ficino’s Theory of World Harmony in Germany." In Sing Aloud Harmonious Spheres, 160–82. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-10.

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Wardhaugh, Benjamin. "The Harmony of the Spheres in English Musical Mathematics, 1650–1750." In Sing Aloud Harmonious Spheres, 223–40. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-13.

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Shiloah, Amnon. "Theory of Heavenly Harmony and Angelic Song in Jewish and Islamic Sources." In Sing Aloud Harmonious Spheres, 44–61. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-4.

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Vanhaelen, Maude. "Cosmic Harmony, Demons, and the Mnemonic Power of Music in Renaissance Florence." In Sing Aloud Harmonious Spheres, 101–22. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-7.

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Prins, Jacomien. "Francesco Patrizi and the ‘Weakest Echo of the Harmony of the Spheres’ 1." In Sing Aloud Harmonious Spheres, 139–59. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-9.

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Spruit, Leen. "Francesco Giorgi on the Harmony of Creation and the Catholic Censorship of His Views." In Sing Aloud Harmonious Spheres, 123–38. New York: Routledge, 2017. | Series: Warwick series in the humanities: Routledge, 2017. http://dx.doi.org/10.4324/9781315161037-8.

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Rawnsley, J. "Harmonic 2-Spheres." In Quantum Theories and Geometry, 175–89. Dordrecht: Springer Netherlands, 1988. http://dx.doi.org/10.1007/978-94-009-3055-1_10.

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Conference papers on the topic "Harmony of the spheres"

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Williams, Rick A., and Osuk Y. Kwon. "Multiple Subaperture Interferometric Testing of Full Spheres." In Optical Fabrication and Testing. Washington, D.C.: Optica Publishing Group, 1986. http://dx.doi.org/10.1364/oft.1986.tha8.

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The objectives of this work are to develop nondestructive, optical test techniques to estimate optical path difference (OPD) errors of full spheres (e.g., gyroscopes, ball hearings, micro-balloons). We propose to use a multiple subaperture interferometric test modeled after analogous techniques used in full aperture testing of large optical systems1. A spherical harmonic base set of polynomials for full sphere descriptions is developed, together with the numerical methods for fitting these polynomials to obtain the aberration coefficients over the spherical surface. The physical interpretation of the lower order terms with respect to OPD errors for a spherical body are discussed and demonstrated using three-dimensional graphics representations. A computer simulation of the multiple subaperture technique for full spheres is utilized in an analysis of test accuracy as a function of various test design parameters (subaperture size, number of subapertures, subaperture tilt errors, inter-subaperture phasing errors, etc.). The results of the simulation suggest that optical testing of full spheres is feasable and has the potential for increased speed, accuracy, and surface preservation as compared to direct physical methods.
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Sumeruk, Ariel, and T. Ditmire. "Studying harmonic generation enhancement in wavelength scale spheres." In Frontiers in Optics. Washington, D.C.: OSA, 2005. http://dx.doi.org/10.1364/fio.2005.jtuc11.

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Sumeruk, Ariel, and Todd Dimire. "Second harmonic radiation pattern from wavelegth scale spheres." In International Quantum Electronics Conference. Washington, D.C.: OSA, 2004. http://dx.doi.org/10.1364/iqec.2004.ithg13.

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Mackowski, Daniel W. "Direct Simulation of Scattering and Absorption by Particle Deposits." In ASME 2006 International Mechanical Engineering Congress and Exposition. ASMEDC, 2006. http://dx.doi.org/10.1115/imece2006-14615.

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A computational scheme is presented to exactly calculate the electromagnetic field distribution, and associated radiative absorption and scattering characteristics, of large-scale ensembles of spherical particles that are subjected to a focussed incident beam. The method employs a superposition extension to Lorenz/Mie theory, in which the internal and scattered fields for each sphere in the ensemble are represented by vector spherical harmonic expansions, and boundary conditions at the surfaces of the spheres are matched by application of the addition theorem for vector harmonics. The incident field is modeled as a transverse, linearly-polarized wave with a Gaussian amplitude distribution along a fixed focal plane. Application of the method to prediction of the absorption and reflectance characteristics of particle deposits is discussed, and illustrative calculations are presented.
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Rachaprolu, Joel Sundar, and Eric Greenwood. "Helicopter Noise Source Separation Using an Order Tracking Filter." In Vertical Flight Society 78th Annual Forum & Technology Display. The Vertical Flight Society, 2022. http://dx.doi.org/10.4050/f-0078-2022-17433.

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Due to the importance of understanding the aeroacoustics of rotorcraft with continually changing noise sources, this paper presents a new technique for source separation from ground-based acoustic measurements. The source separation process is based on combining a time-domain de-Dopplerization method with the Vold-Kalman (VK) order tracking filter approach. This process can extract rotor harmonic noise even when the sources are continuously changing with time, including impulsive events such as Blade Vortex Interaction (BVI) noise. The advantage of this approach over traditional methods such as harmonic averaging is that the phase and amplitude relationship of acoustic signals is preserved throughout the extraction process. The approach is applied to the measured acoustic data from a Bell 430 helicopter. The measured data were separated into main rotor harmonic, tail rotor harmonic, and broadband residual components. For steady-state conditions, the extracted components could be de-propagated to form acoustic spheres showing the directivity of the separated main and tail rotor components. The source separation process was also applied to a maneuvering flight condition. Each component has different pulse shapes and directivity trends, consistent with aeroacoustic theory.
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Tovletoglou, Konstantinos, Lev Mukhanov, Dimitrios S. Nikolopoulos, and Georgios Karakonstantis. "HaRMony." In ASPLOS '20: Architectural Support for Programming Languages and Operating Systems. New York, NY, USA: ACM, 2020. http://dx.doi.org/10.1145/3373376.3378489.

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Kuchta, Cameron, Reuben D. Budiardja, and Verónica G. Vergara Larrea. "Harmony." In PEARC '19: Practice and Experience in Advanced Research Computing. New York, NY, USA: ACM, 2019. http://dx.doi.org/10.1145/3332186.3332254.

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Jeong, Sangyeong. "Harmony." In ACM SIGGRAPH 2012 Computer Animation Festival. New York, New York, USA: ACM Press, 2012. http://dx.doi.org/10.1145/2341836.2341863.

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Grandl, Robert, Yizheng Chen, Junaid Khalid, Suli Yang, Ashok Anand, Theophilus Benson, and Aditya Akella. "Harmony." In SOCC '13: ACM Symposium on Cloud Computing. New York, NY, USA: ACM, 2013. http://dx.doi.org/10.1145/2523616.2525961.

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Tuli, Anupriya, Pushpendra Singh, Mamta Sood, Koushik Sinha Deb, Siddharth Jain, Abhishek Jain, Manan Wason, Rakesh Chadda, and Rohit Verma. "Harmony." In UbiComp '16: The 2016 ACM International Joint Conference on Pervasive and Ubiquitous Computing. New York, NY, USA: ACM, 2016. http://dx.doi.org/10.1145/2968219.2968301.

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Reports on the topic "Harmony of the spheres"

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Sergeev, Armen. Harmonic Spheres and Yang--Mills Fields. GIQ, 2013. http://dx.doi.org/10.7546/giq-14-2013-11-33.

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Sergeev, Armen. Harmonic Spheres and Yang--Mills Fields. Journal of Geometry and Symmetry in Physics, 2012. http://dx.doi.org/10.7546/jgsp-27-2012-1-25.

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Lo, Ching-Jo. Harmony. Ames: Iowa State University, Digital Repository, November 2016. http://dx.doi.org/10.31274/itaa_proceedings-180814-1673.

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Reppenhagen, Patricia. A harmony of opposites. Portland State University Library, January 2000. http://dx.doi.org/10.15760/etd.5245.

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Morse, Alexander. Metaverse + Realverse: In Search Of Harmony. ResearchHub Technologies, Inc., December 2022. http://dx.doi.org/10.55277/researchhub.af3uap2i.

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Suparto, Susilowati. Can Indonesia’s love law ensure domestic harmony? Edited by Ria Ernunsari and Chris Bartlett. Monash University, April 2024. http://dx.doi.org/10.54377/6529-8b82.

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Wang, Jianyong, and George Karypis. HARMONY: Efficiently Mining the Best Rules for Classification. Fort Belvoir, VA: Defense Technical Information Center, September 2004. http://dx.doi.org/10.21236/ada439469.

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Longhurst, G. R. Gas evolution from spheres. Office of Scientific and Technical Information (OSTI), April 1991. http://dx.doi.org/10.2172/5710543.

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Leandre, Remi. Random Spheres and Operads. Journal of Geometry and Symmetry in Physics, 2012. http://dx.doi.org/10.7546/jgsp-6-2006-67-84.

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Channels, Jr, and Alfred C. Harmony of Action - Sherman as an Army Group Commander. Fort Belvoir, VA: Defense Technical Information Center, January 1992. http://dx.doi.org/10.21236/ada252324.

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