Studies on the Origin of Harmonic Tonality
Studies on the Origin of Harmonic Tonality

Author: Carl Dahlhaus

Publisher: Princeton University Press

Published: 2014-07-14

Total Pages: 406

ISBN-13: 1400861314

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Carl Dahlhaus was without doubt the premier musicologist of the postwar generation, a giant whose recent death was mourned the world over. Translated here for the first time, this fundamental work on the development of tonality shows his complete mastery of the theory of harmony. In it Dahlhaus explains the modern concepts of harmony and tonality, reviewing in the process the important theories of Rameau, Sechter, Ftis, Riemann, and Schenker. He contrasts the familiar premises of chordal composition with the lesser known precepts of intervallic composition, the basis for polyphonic music in the late Middle Ages and Renaissance. Numerous quotations from theoretical treatises document how early music was driven forward not by progressions of chords but by simple progressions of intervals. Exactly when did composers transform intervallic composition into chordal composition? Modality into tonality? Dahlhaus provides extensive analyses of motets by Josquin, frottole by Cara and Tromboncino, and madrigals by Monteverdi to demonstrate how, and to what degree, such questions can be answered. In his bold speculations, in his magisterial summaries, in his command of eight centuries of music and writings on music, and in his deep understanding of European history and culture, Carl Dahlhaus sets a standard that will seldom be equalled. Originally published in 1990. The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.

Unfinished Revolution
Unfinished Revolution

Author: Anne-Maree Whitaker

Publisher: Dr Anne-Maree Whitaker

Published: 1994

Total Pages: 298

ISBN-13: 9780646179513

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"400 United Irishmen and fellow-rebels brought the spirit of Irish rebellion "down under" in the aftermath of the Irish Rebellion of 1798 - and changed Australia forever. At Castle Hill in 1804, this "army of shadows" carried on where they left off but during Bligh's overthrow in 1808, they stood back from a fight that was not theirs. The "political Irish" played a central role in the developing colony. Their professions, trades and skills made them useful as clerks, storekeepers and teachers, and fitted them to be overseers and constables, and helped bring self-sufficiency to the still-fragile colonial economy. They remained revolutionaries; only they negotiated change rather than raised warlike rebellion. Through their open defiance and quiet manipulation of authority, the harp "new strung" resonates to this day in the Australian ethos that United Irishmen helped to create." -- book cover.

Vivaldi
Vivaldi

Author: Michael Talbot

Publisher: Routledge

Published: 2017-07-05

Total Pages: 565

ISBN-13: 1351537318

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Since 1978, the 300th anniversary of Vivaldi's death, there has been an explosion of serious writing about his music, life and times. Much of this has taken the form of articles published in academic journals or conference proceedings, some of which are not easy to obtain. The twenty-two articles selected by Michael Talbot for this volume form a representative selection of the best writing on Vivaldi from the last 30 years, featuring such major figures in Vivaldi research as Reinhard Strohm, Paul Everett, Gastone Vio and Federico Maria Sardelli. Aspects covered include biography, Venetian cultural history, manuscript studies, genre studies and musical analysis. The intention is to serve as a 'first port of call' for those wishing to learn more about Vivaldi or to refresh their existing knowledge. An introduction by Michael Talbot reviews the state of Vivaldi scholarship past and present and comments on the significance of the articles.

Geometric Aspects of General Topology
Geometric Aspects of General Topology

Author: Katsuro Sakai

Publisher: Springer Science & Business Media

Published: 2013-07-22

Total Pages: 539

ISBN-13: 443154397X

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This book is designed for graduate students to acquire knowledge of dimension theory, ANR theory (theory of retracts), and related topics. These two theories are connected with various fields in geometric topology and in general topology as well. Hence, for students who wish to research subjects in general and geometric topology, understanding these theories will be valuable. Many proofs are illustrated by figures or diagrams, making it easier to understand the ideas of those proofs. Although exercises as such are not included, some results are given with only a sketch of their proofs. Completing the proofs in detail provides good exercise and training for graduate students and will be useful in graduate classes or seminars. Researchers should also find this book very helpful, because it contains many subjects that are not presented in usual textbooks, e.g., dim X × I = dim X + 1 for a metrizable space X; the difference between the small and large inductive dimensions; a hereditarily infinite-dimensional space; the ANR-ness of locally contractible countable-dimensional metrizable spaces; an infinite-dimensional space with finite cohomological dimension; a dimension raising cell-like map; and a non-AR metric linear space. The final chapter enables students to understand how deeply related the two theories are. Simplicial complexes are very useful in topology and are indispensable for studying the theories of both dimension and ANRs. There are many textbooks from which some knowledge of these subjects can be obtained, but no textbook discusses non-locally finite simplicial complexes in detail. So, when we encounter them, we have to refer to the original papers. For instance, J.H.C. Whitehead's theorem on small subdivisions is very important, but its proof cannot be found in any textbook. The homotopy type of simplicial complexes is discussed in textbooks on algebraic topology using CW complexes, but geometrical arguments using simplicial complexes are rather easy.