6,317 research outputs found

    C. James Gleason Contact Sheets Inventory, circa 2005

    No full text
    Inventory for the contact sheets and negatives of the College of William and Mary photographs of James Gleason.The Excel file was extracted from a database at the time of transfer from Publications.Found In: C. James Gleason Photographs, 1983-200

    Harold Gleason Correspondence

    No full text
    Entries include a letter from Gleason\u27s wife, a brief biography, and a photocopied newspaper obituary . Date range: 1976-05-0

    The gleason distance РАССТОЯНИЕ ГЛИСОНА

    No full text
    First, some basic concepts are considered in the paper, including the Mobius transformation, the unit ball in the space of related analytical functions in the unit circle, and the Gleason distance. The author proves a theorem (demonstrated without any proof) that makes it possible to calculate the Gleason distance between the two opposite points in the pre-set unit circle. The extremum feature appears in the calculation of the Gleason distance, which coincides with the identity map of the unit circle. The Gleason distance between the two points coincides with the regular Euclidean distance between these points. Further, the author considers the Gleason distance in the simply connected domain. The simply connected domain is conformally represented in the unit circle. The two points in the simply connected domain are represented as the corresponding points in the unit circle. The author has proven that the Gleason distance between the two points in the simply connected domain coincide with the Gleason distance between two corresponding points in the unit circle. Then, the author presents a lemma (a statement without proof). It is applied to the problem of the Gleason distance between the two points in the simply connected domain. Next, the author presents several special cases: the Gleason distance as calculated between the two points in the unit circle and between the two points in the upper half-space. The two points are located (with both points being positive numbers) in the unit circle.Приведена теорема для вычисления расстояния Глисона между двумя противоположными точками, лежащими в единичном круге, а также лемма о получении экстремальной функции в этой задаче. Разобраны частные случаи вычисления расстояния Глисона в единичном круге и в верхней полуплоскости

    Relação do antígeno prostático específico, escore do gleason e da percentagem de tumor na biópsia com estadiamento patológico no câncer de próstata.

    No full text
    Trabalho de Conclusão de Curso - Universidade Federal de Santa Catarina. Curso de Medicina. Dapartamento de Clínica Cirúrgica

    Gleason, John C.

    No full text
    Body cremated. Jessie T. Gleason - wifehttps://stars.library.ucf.edu/cfm-ch-memoranda-1939/1148/thumbnail.jp

    Rogers and Gleason biographies

    No full text
    Set of several typescript biographies by Lenora S. Rogers: Sketch of the Life of Andrew Locy Rogers; Life Sketch of Clara Maria Gleason Rogers; a sketch of Desdemona Chase Gleason, Clara\u27s mother; a one-page sketch of Eliza Malin Gleason (1820-1888, second wife of John S. Gleason); a 3-page sketch of Mary Ann Sutherland Gleason (1834-1921, third wife of John S. Gleason); and another sketch of Clara Gleason Rogers, "Incidents taken from the life of Mrs. A. L. Rogers, one of Arizona\u27s pioneer women," by Mrs. Florence C. McCarthy (both a transcript and the original handwritten account). First item is a transcript of a letter by Andrew Locy Rogers dated December 31, 1932, addressed to daughter Thora Franklin and conveying an account of the life of her mother, Clara Gleason Rogers

    The Pool (K. Gleason)

    No full text
    Titre :  The Pool (c) Kate Gleason - film produit dans le cadre du diplôme de fin d'études de la UCLA’s School of Theater, Film and Television. Image reproduite avec l'aimable autorisation de la réalisatrice. Réalisateur : Kate Gleason Scénariste : Kate Gleason Année : 2016 Durée : 9' Pays : Etats-Unis Langue : anglais Genre : fiction Couleur/Noir et blanc : Couleur Distribution/casting : Gavin Scott, Sarah Jean Kruchowski Synopsis : C'est le dernier jour pour avant la fermeture pour une pis..

    Nebenhülle and the Gleason problem

    No full text
    This article concerns the Gleason property as a local phenomenon. We prove that there always exists an open set where the domain D (sic) C(2) has the Gleason beta property whenever the boundary of the Nebenhulle of D coincides with a C(2) smooth part of the boundary bD; here beta is either one of the Banach algebras, H(infinity) or A. As an easy consequence of this, we see that if the extremal boundary points are C(2)-smooth, then D has the Gleason beta property close to those points. Also a partial derivative-problem for locally supported forms is solved.</p

    L.L. Berger, c.1970 (1)

    No full text
    https://digitalcommons.buffalostate.edu/gleason/1000/thumbnail.jp
    corecore