13,607 research outputs found

    Jeremy Schubert Interview

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    This interview is an oral history conducted by Linfield College archivist Rich Schmidt with Jeremy Schubert, the founder of Lunabean Media. The interview took place at the Jereld R. Nicholson Library at Linfield College in McMinnville, Oregon on June 14, 2017. Jeremy Schubert is the founder of Lunabean Media, a wine and web marketing business he started in 2009. In this interview, Schubert talks about marketing Oregon wine, the trends of the industry, and the personal touch he takes with clients. He also discusses the future of the industry with regard to both selling wine and overall growth

    01 ”Mädchens Klage” R 248/2 (Franz Schubert/Franz Liszt) [4:21] (KD 20, CD 2)

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    Werk: ”Mädchens Klage” R 248/2 Komposition: Franz Schubert (1797 - 1828) / Franz Liszt (1811 - 1886) Interpret: Michael WENDEBERG (Deutschland) Album: 4. Internationaler Wettbewerb "Franz Schubert und die Musik der Moderne", 23. Februar - 3. März 2000; Graz , Austria - Live-Mitschnitte; (KUG KD 20, 2 CDs) © Kunstuniversität Gra

    Prix Schubert.

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    R. R. Prix Schubert. . In: Bulletin astronomique, tome 4, 1887. p. 523

    William K. Schubert M.D.

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    This oral history may be streamed from the Winkler Center websiteWilliam K. Schubert M.D. interviewed by Clark D. West and Herbert C. Flessa, June 26, 1991. This video was a part of the Oral History of Medicine in Cincinnati series

    Staendchen. (Serenade.) Lied de Fr. Schubert Transcrit pour Piano

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    STAENDCHEN. (SERENADE.) LIED DE FR. SCHUBERT TRANSCRIT POUR PIANO Staendchen. (Serenade.) Lied de Fr. Schubert Transcrit pour Piano ([1]r) Titelseite ([1]r) Leise flehen meine Lieder, / Durch die Nacht zu dir, / In den stillen Hain hernieder, / ... ([1]v) Ständchen ([2]r

    Schubert Eisenstein series and Poisson summation for Schubert varieties

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    The first author and Bump defined Schubert Eisenstein series by restricting the summation in a degenerate Eisenstein series to a particular Schubert variety. In the case of GL3\mathrm{GL}_3 over Q\mathbb{Q} they proved that these Schubert Eisenstein series have meromorphic continuations in all parameters and conjectured the same is true in general. We revisit their conjecture and relate it to the program of Braverman, Kazhdan, Lafforgue, Ngô, and Sakellaridis aimed at establishing generalizations of the Poisson summation formula. We prove the Poisson summation formula for certain schemes closely related to Schubert varieties and use it to refine and establish the conjecture of the first author and Bump in many cases.Accepted by the American Journal of Mathematics. Final versio

    La Rose. Poésie de Schlegel. Musique de Schubert, transcrite

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    LA ROSE. POÉSIE DE SCHLEGEL. MUSIQUE DE SCHUBERT, TRANSCRITE La Rose. Poésie de Schlegel. Musique de Schubert, transcrite (1) Titelseite mit Stempel: Liszt-Museum Weimar R 2 (1) Noten (3) Advertising ( -

    Geologische Spezialkarte der im Reichsrate vertretenen Königreiche und Länder der österreichisch-ungarischen Monarchie 1:75 000 / 2812 Pago

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    für die Spezialkarte im Masse 1:75.000 neu aufgenommen von Dr. R. J. Schubert (1906-1907) und Dr. L. Waage

    LS algebras and application to Schubert varieties

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    In this paper we introduce LS algebras. We study their general properties and apply these results to Schubert varieties. Our main achievement is that any Schubert variety admits a flat deformation to a union of normal toric varieties. A new proof of Cohen-Macaulayness (and thus normality) for Schubert varieties is also obtained

    Schubert functors and Schubert polynomials

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    AbstractWe construct a family of functors assigning an R-module to a flag of R-modules, where R is a commutative ring. As particular instances, we get flagged Schur functors and Schubert functors, the latter family being indexed by permutations. We identify Schubert functors for vexillary permutations with some flagged Schur functors, thus establishing a functorial analogue of a theorem of Lascoux and Schützenberger from C. R. Acad. Sci. Paris Sér. I Math. 294 (1982) 447 and of Wachs from J. Combin. Theory Ser. A 40 (1985) 276. Over an infinite field, we study the trace of a Schubert module, which is a cyclic module over a Borel subgroup B, restricted to the maximal torus. The main result of the paper says that this trace is equal to the corresponding Schubert polynomial of Lascoux and Schützenberger (C. R. Acad. Sci. Paris Sér. I Math. 294 (1982) 447). We also investigate filtrations of B-modules associated with the Monk formula (Proc. London Math. Soc. 9 (1959) 253) and transition formula from Lett. Math. Phys. 10 (1985) 111
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