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Musical Variation
  • Language: en
  • Pages: 329

Musical Variation

This book offers an in-depth analysis of musical variation through a systematic approach, heavily influenced by the principles of Grundgestalt and developed variations, both created by the Austrian composer Arnold Schoenberg (1874-1951). The author introduces a new transformational-derivative model and the theory that supports it, specifically crafted for the examination of tonal music. The idea for this book emerged during a sabbatical at Columbia University, while the content is the product of extensive research conducted at the Federal University of Rio de Janeiro, resulting in the development of the Model of Derivative Analysis. This model places emphasis on the connections between musical entities rather than viewing them as separate entities. As a case study, the Intermezzo in A Major Op.118/2 by Brahms is selected for analysis. The author's goal is to provide a formal and structured approach while maintaining the text's readability and appeal for both musicians and mathematicians in the field of music theory. The book concludes with the author's recommendations for further research.

Carleson Measures and Interpolating Sequences for Besov Spaces on Complex Balls
  • Language: en
  • Pages: 178

Carleson Measures and Interpolating Sequences for Besov Spaces on Complex Balls

Contents: A tree structure for the unit ball $mathbb B? n$ in $mathbb C'n$; Carleson measures; Pointwise multipliers; Interpolating sequences; An almost invariant holomorphic derivative; Besov spaces on trees; Holomorphic Besov spaces on Bergman trees; Completing the multiplier interpolation loop; Appendix; Bibliography

Towards Higher Categories
  • Language: en
  • Pages: 292

Towards Higher Categories

This IMA Volume in Mathematics and its Applications TOWARDS HIGHER CATEGORIES contains expository and research papers based on a highly successful IMA Summer Program on n-Categories: Foundations and Applications. We are grateful to all the participants for making this occasion a very productive and stimulating one. We would like to thank John C. Baez (Department of Mathematics, University of California Riverside) and J. Peter May (Department of Ma- ematics, University of Chicago) for their superb role as summer program organizers and editors of this volume. We take this opportunity to thank the National Science Foundation for its support of the IMA. Series Editors Fadil Santosa, Director of ...

Mathematics and Computation in Music
  • Language: en
  • Pages: 387

Mathematics and Computation in Music

  • Type: Book
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  • Published: 2011-06-18
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  • Publisher: Springer

This book constitutes the refereed proceedings of the Third International Conference on Mathematics and Computation in Music, MCM 2011, held in Paris, France, in June 2011. The 24 revised full papers presented and the 12 short papers were carefully reviewed and selected from 62 submissions. The MCM conference is the flagship conference of the Society for Mathematics and Computation in Music. This year’s conference aimed to provide a multi-disciplinary platform dedicated to the communication and exchange of ideas amongst researchers involved in mathematics, computer science, music theory, composition, musicology, or other related disciplines. Areas covered were formalization and geometrical representation of musical structures and processes; mathematical models for music improvisation and gestures theory; set-theoretical and transformational approaches; computational analysis and cognitive musicology as well as more general discussions on history, philosophy and epistemology of music and mathematics.

Mathematics and Computation in Music
  • Language: en
  • Pages: 256

Mathematics and Computation in Music

  • Type: Book
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  • Published: 2013-06-05
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  • Publisher: Springer

This book constitutes the thoroughly refereed proceedings of the Fourth International Conference on Mathematics and Computation in Music, MCM 2013, held in Montreal, Canada, in June 2013. The 18 papers presented were carefully reviewed and selected from numerous submissions. They are promoting the collaboration and exchange of ideas among researchers in music theory, mathematics, computer science, musicology, cognition and other related fields.

The American Mathematical Monthly
  • Language: en
  • Pages: 620

The American Mathematical Monthly

  • Type: Book
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  • Published: 2009
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  • Publisher: Unknown

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Operator Valued Hardy Spaces
  • Language: en
  • Pages: 78

Operator Valued Hardy Spaces

The author gives a systematic study of the Hardy spaces of functions with values in the noncommutative $Lp$-spaces associated with a semifinite von Neumann algebra $\mathcal{M .$ This is motivated by matrix valued Harmonic Analysis (operator weighted norm inequalities, operator Hilbert transform), as well as by the recent development of noncommutative martingale inequalities. in this paper noncommutative Hardy spaces are defined by noncommutative Lusin integral function, and it isproved that they are equivalent to those defined by noncommutative Littlewood-Paley G-functions. The main results of this paper include: (i) The analogue in the author's setting of the classical Fefferman duality theorem between $\mathcal{H 1$ and $\mathrm{BMO $. (ii) The atomic decomposition of theauthor's noncommutative $\mathcal{H 1.$ (iii) The equivalence between the norms of the noncommutative Hardy spaces and of the noncommutative $Lp$-spaces $(1

Abstract Algebra
  • Language: en
  • Pages: 570

Abstract Algebra

  • Type: Book
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  • Published: 2022-07-05
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  • Publisher: CRC Press

When a student of mathematics studies abstract algebra, he or she inevitably faces questions in the vein of, "What is abstract algebra" or "What makes it abstract?" Algebra, in its broadest sense, describes a way of thinking about classes of sets equipped with binary operations. In high school algebra, a student explores properties of operations (+, −, ×, and ÷) on real numbers. Abstract algebra studies properties of operations without specifying what types of number or object we work with. Any theorem established in the abstract context holds not only for real numbers but for every possible algebraic structure that has operations with the stated properties. This textbook intends to serv...

Projective Group Structures as Absolute Galois Structures with Block Approximation
  • Language: en
  • Pages: 70

Projective Group Structures as Absolute Galois Structures with Block Approximation

The authors prove: A proper profinite group structure G is projective if and only if G is the absolute Galois group structure of a proper field-valuation structure with block approximation.

Carbohydrate Chemistry
  • Language: en
  • Pages: 713

Carbohydrate Chemistry

In many fields, most notably medicine and molecular biology, the understanding of the structure and function of carbohydrates and glycoconjugates remains vital. This new volume contains critical reviews covering the latest findings in both chemical and biological sciences, and demonstrates the interdisciplinary nature of modern carbohydrate research. This book addresses diverse applications that continue to be major challenges for carbohydrate chemists. The book starts with a review of Gérard Descotes contribution to the field as a pioneer of French modern carbohydrate chemistry. Green nanocatalytic oxidation of free sugars, photosensitive glycomacrocycles, the application of disaccharides in supramolecular chemistry, recent advances in the radiation chemistry of polysaccharides, and the cell wall pectic rhamnogalacturonan II, an enigma in plant glycobiology are just some of the diverse topics presented in Volume 45. This set of reports will certainly benefit any researcher who wishes to learn about the latest developments in the carbohydrate field.