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    ISCB Honors Michael S. Waterman and Mathieu Blanchette - Mathieu Blanchette

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    ISCB Honors Michael S. Waterman and Mathieu Blanchette - Mathieu Blanchett

    World War I record of service survey for William A. Blanchette, signed 17 September 1926

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    Questionnaire about William Aldrich Blanchette's service in World War I, 1917-1919, signed by Blanchette on 17 September 1926.Questionnaire originally part of a survey of Norwich University alumni conducted by a “Norwich in the World War” committee consisting of Charles N. Barber (chairman), Carl V. Woodbury, K.R.B. Flint, and Gustaf A. Nelson. Data from these questionnaires may have been used in a chapter of "Vermont in the world war, 1917-1919" by Harold P. Sheldon (1928). Transcription by Abigail Lumpkin. Transcriptions may be subject to error

    [Affiches de Mathieu Parent]

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    Affiche de l'artiste Mathieu Parent

    ISCB Honors Michael S. Waterman and Mathieu Blanchette - Michael S. Waterman

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    ISCB Honors Michael S. Waterman and Mathieu Blanchette - Michael S. Waterma

    New Upper Bounds for Mathieu-Type Series

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    The Mathieu’s series S(r) was considered firstly by É.L. Mathieu in 1890; its alternating variant Š(r) has been recently introduced by Pogány et al. [Some families of Mathieu a-series and alternating Mathieu a-series, 2006] where various bounds have been established for S, Š. In this note we obtain new upper bounds over S(r), Š(r) with the help of Hardy–Hilbert double integral inequality

    Integral Representation of a Series Which One Includes the Mathieu A-Series

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    AbstractIntegral expression is deduced for the series S(r,μ,ν,a)=∑n=1∞2F1ν−μ+12,ν−μ2+1;ν+1;−r2a(n)2a(n)ν−μ+1(a(n)2+r2)μ−1/2, where r>0, μ>1/2, ν+1<μ and a:0<a(1)<a(2)<⋯<a(n)↑∞, and 2F1 is the Gauß hypergeometric function. The result precizes the integral expression for the generalized Qi type Mathieu a-series S(r,p,a)=∑n=0∞a(n)(a(n)2+r2)−p−1 given in [J. Inequal. Pure Appl. Math. 4 (2003), (4.5)] generalizing some other results by Cerone and Lenard, Tomovski and Qi as well. Bounding inequalities are given for S(r,μ,ν,a) using the derived integral expression

    Mathieu Beauséjour : Anti-©

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    Torsion units in integral group ring of the Mathieu simple group M22

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    AbstractWe investigate the possible character values of torsion units of the normalized unit group of the integral group ring of the Mathieu sporadic group M22. We confirm the Kimmerle conjecture on prime graphs for this group and specify the partial augmentations for possible counterexamples to the stronger Zassenhaus conjecture.</jats:p

    Conférence de Mme Séverine Mathieu

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    Mathieu Séverine. Conférence de Mme Séverine Mathieu. In: École pratique des hautes études, Section des sciences religieuses. Annuaire. Tome 111, 2002-2003. 2002. pp. 375-376
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