15,296 research outputs found

    Regularized quantum periods for three-dimensional Fano manifolds

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    The database smooth_fano_3 This is a database of regularized quantum periods for three-dimensional Fano manifolds. There are 105 entries in the database. Each entry in the database is a key-value record with keys and values as described in the paper: Databases of Quantum Periods for Fano Manifolds, Tom Coates and Alexander M. Kasprzyk, 2021. If you make use of this data, please cite the above paper and the DOI for this data: doi:10.5281/zenodo.570827

    Regularized quantum periods for two-dimensional Fano manifolds

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    The database smooth_fano_2 This is a database of regularized quantum periods for two-dimensional Fano manifolds. There are ten entries in the database. Each entry in the database is a key-value record with keys and values as described in the paper: Databases of Quantum Periods for Fano Manifolds, Tom Coates and Alexander M. Kasprzyk, 2021. If you make use of this data, please cite the above paper and the DOI for this data: doi:10.5281/zenodo.570823

    Regularized quantum periods for one-dimensional Fano manifolds

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    The database smooth_fano_1 This is a database of regularized quantum periods for one-dimensional Fano manifolds. There is one entry in the database. Each entry in the database is a key-value record with keys and values as described in the paper: Databases of Quantum Periods for Fano Manifolds, Tom Coates and Alexander M. Kasprzyk, 2021. If you make use of this data, please cite the above paper and the DOI for this data: doi:10.5281/zenodo.570818

    Regularized quantum periods for four-dimensional Fano manifolds

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    The database smooth_fano_4 This is a database of regularized quantum periods for four-dimensional Fano manifolds. The database will be updated as new four-dimensional Fano manifolds are discovered and new regularized quantum periods computed. Each entry in the database is a key-value record with keys and values as described in the paper [CK2021]. If you make use of this data, please cite that paper and the DOI for this data: doi:10.5281/zenodo.5708307 Names The database describes Fano varieties via names, as follows: Names of Fano manifolds Name Description P1 one-dimensional projective space P2 two-dimensional projective space dP(k) the del Pezzo surface of degree k given by the blow-up of P2 in 9-k points P3 three-dimensional projective space Q3 a quadric hypersurface in four-dimensional projective space B(3,k) the three-dimensional Fano manifold of Picard rank 1, Fano index 2, and degree 8k V(3,k) the three-dimensional Fano manifold of Picard rank 1, Fano index 1, and degree k MM(r,k) the k-th entry in the Mori-Mukai list of three-dimensional Fano manifolds of Picard rank r, ordered as in [CCGK2016] P4 four-dimensional projective space Q4 a quadric hypersurface in five-dimensional projective space FI(4,k) the four-dimensional Fano manifold of Fano index 3 and degree 81k V(4,k) the four-dimensional Fano manifold of Picard rank 1, Fano index 2, and degree 16k MW(4,k) the k-th entry in Table 12.7 of [IP1999] of four-dimensional Fano manifolds of Fano index 2 and Picard rank greater than 1 Obro(4,k) the k-th four-dimensional Fano toric manifold in Obro's classification [O2007] Str(k) the k-th Strangeway manifold in [CGKS2020] CKP(k) the k-th four-dimensional Fano toric complete intersection in [CKP2015] CKK(k) the k-th four-dimensional Fano quiver flag zero locus in Appendix B of [K2019] A name of the form "S1 x S2", where S1 and S2 are names of Fano manifolds X1 and X2, refers to the product manifold X1 x X2. References [CCGK2016] Quantum periods for 3-dimensional Fano manifolds; Tom Coates, Alessio Corti, Sergey Galkin, Alexander M. Kasprzyk; Geometry and Topology 20 (2016), no. 1, 103-256. [CGKS2020] Quantum periods for certain four-dimensional Fano manifolds; Tom Coates, Sergey Galkin, Alexander M. Kasprzyk, Andrew Strangeway; Experimental Math. 29 (2020), no. 2, 183-221. [CK2021] Databases of quantum periods for Fano manifolds; Tom Coates, Alexander M. Kasprzyk; 2021. [CKP2015] Four-dimensional Fano toric complete intersections; Tom Coates, Alexander M. Kasprzyk, Thomas Prince; Proc. Royal Society A 471 (2015), no. 2175, 20140704, 14. [IP1999] Fano varieties; V.A. Iskovskikh, Yu. G. Prokhorov; Encyclopaedia Math. Sci. vol. 47, Springer, Berlin, 1999, 1-247. [K2019] Four-dimensional Fano quiver flag zero loci; Elana Kalashnikov; Proc. Royal Society A 275 (2019), no. 2225, 20180791, 23. [O2007] An algorithm for the classification of smooth Fano polytopes; Mikkel Obro; arXiv:0704.0049 [math.CO]; 2007

    Douglas Alexander Stewart, poet, author and playwright

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    Douglas Alexander Stewart, poet, author and playwrigh

    ‘The man who writes tunes': an assessment of the work of Eric Coates (1886-1957) and his role within the field of British light music

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    The light-music composer Eric Coates was one of the most successful and popular composers of the twentieth century. This thesis seeks to address how he achieved this status through the various media that were open to him. After a biographical and teleological discussion of Coates, light music, his position within this 'school' of composition and his views on light music this thesis discusses his relationship with the BBC. Looking at the BBC's policy towards light music shows how his music fitted into their broadcasting schedules and was tailor made for use as signature tunes. Concomitant to this was a mutual symbiosis, the BBC needed his music and Coates desired their promotion and performances of his music. Key BBC personnel were important in programming, obstructing, commenting and performing his music, especially Stanford Robinson and the BBC Theatre Orchestra. Coates' popularity was sealed by his legacy of gramophone records, though these contained frequent cuts, Coates' slender output was all of a high standard because of its sincerity, melody, countermelodies, orchestration, integration of dance bands and jazz music. Though he was alive to a compositional formula that governed light music, it was never creatively limiting, as demonstrated by an in-depth discussion of several pieces. Coates often appeared in newspapers as a minor celebrity and these interviews often drew in his latest compositions. Allied to this was the foundation of the Performing Right Society which enabled him to earn a comfortable living through his music. The final aspect of his career dealt with is the music festivals held at many seaside resorts and the BBC Light Music Festivals which gave Coates the chance to conduct with important luminaries and to produce new works. All these issues united to create a unique and well-loved composer

    Harmony

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    Digital copies were created from a selection of items in the original hard copy Albert Coates collection (PDV 4) held in DOMUS in the Stellenbosch University Music LibraryVocal music. Songs. Vocal score. Annotations

    Harmony

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    Digital copies were created from a selection of items in the original hard copy Albert Coates collection (PDV 4) held in DOMUS in the Stellenbosch University Music LibraryVocal music. Songs. Vocal score. Incomplete. Annotations

    Harmony

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    Digital copies were created from a selection of items in the original hard copy Albert Coates collection (PDV 4) held in DOMUS in the Stellenbosch University Music LibraryVocal music. Songs. Full score. Annotations

    sj-docx-1-tva-10.1177_15248380231196115 – Supplemental material for Narcissism and Intimate Partner Violence: A Systematic Review and Meta-Analysis

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    Supplemental material, sj-docx-1-tva-10.1177_15248380231196115 for Narcissism and Intimate Partner Violence: A Systematic Review and Meta-Analysis by Eliza Oliver, Alexander Coates, Joanne M. Bennett and Megan L. Willis in Trauma, Violence, & Abuse</p
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