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The Duncan Segregation Index is a measure of occupational segregation based on gender that measures whether there is a larger than expected presence of one gender over another in a given occupation or labor force by identifying the percentage of employed women (or men) who would have to change occupations for the occupational distribution of men and women to be equal.
The index score can also be interpreted as the percentage of one of the two groups included in the calculation that would have to move to different geographic areas in order to produce a distribution that matches that of the larger area. The index of dissimilarity can be used as a measure of segregation. A score of zero (0%) reflects a fully ...
Anton Bruckner's Symphony No. 8 in C minor, WAB 108, is the last symphony the composer completed. It exists in two major versions of 1887 and 1890. It exists in two major versions of 1887 and 1890. It was premiered under conductor Hans Richter in 1892 at the Musikverein , Vienna.
Symphony No. 5, Op. 71 (1892-97, orchestration of his lost String Sextet in C sharp minor) Joseph Martin Kraus: Symphony in C minor, VB 142 (a reworking of the Symphony in C-sharp minor, VB 140) Symphonie funèbre in C minor; Franz Krommer: Symphony No. 4, Op. 102 (1819–20) [13] Joseph Küffner: Symphony No. 4, Op. 141 (published 1823) Franz ...
Rudolf Barshai transcribed the quartet for string orchestra, in which version it is known as Chamber Symphony in C minor, Op. 110a. [4] Boris Giltburg arranged the quartet for piano solo. [5] Other arrangements include Lucas Drew's Sinfonia for string orchestra [6] and Abram Stasevich's Sinfonietta for string orchestra and timpani. [7]
Piano Trio No. 1, Op. 8, in C minor for violin, violoncello and piano is a very early chamber composition by Dmitri Shostakovich. It was performed privately in early 1924, but was not published until the 1980s. Twenty years later, the composer wrote the more well-known Piano Trio No. 2 in E minor, Op. 67.
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A presheaf of spaces on an ∞-category C is a contravariant functor from C to the ∞-category of spaces (for example, the nerve of the category of CW-complexes.) [4] It is an ∞-category version of a presheaf of sets, as a "set" is replaced by a "space".