133,531 research outputs found

    [Typed Statement by D. L. Pate]

    No full text
    Typed statement by D. L. Pate concerning officer's assignments and the murder of Lee Harvey Oswald

    [Statement by D. L. Pate concerning his assignment and the murder of Lee Harvey Oswald]

    No full text
    Statement by D. L. Pate concerning his assignment, the murder of Lee Harvey Oswald, and familiarity with Jack Ruby. Pate describes his assignment on the day of the shooting of Oswald and states that he knew Ruby, but did not see him at City Hall

    [Report from D. L. Pate to Chief J. E. Curry, November 26, 1963]

    No full text
    Report from D. L. Pate to Chief J. E. Curry concerning officer's assignments and the murder of Lee Harvey Oswald

    Chinese Public Attitudes Toward Epilepsy (PATE) scale: translation and psychometric evaluation

    No full text
    None of the quantitative scale for public attitudes toward epilepsy was translated to Chinese language. This study aimed to translate and test the validity and reliability of a Chinese version of the Public Attitudes Toward Epilepsy (PATE) scale. Methods: The translation was performed according to standard principles and tested in 140 Chinese-speaking adults aged more than 18 years for psychometric validation. Results: The items in each domain had similar standard deviations (equal item variance), ranged from 0.85-0.95 in personal domain and 0.75-1.04 in general domain. The correlation between an item and its domain was 0.4 and above for all, and higher than the correlation with the other domain. Multitrait analysis showed the Chinese PATE had a similar variance, floor and ceiling effects, and relative relationship between the domains, as the original PATE. The Chinese PATE scale showed a similar correlation with almost all demographic variable except age. Item means were generally clustered in the factor analysis as hypothesized. The Cronbach’s α values was within acceptable range (0.773) in the personal domain and satisfactory range (0.693) in the general domain. Conclusion: The Chinese PATE scale is a validated and reliable translated version in measuring the public attitudes toward epilepsy

    Pate, D.

    No full text

    Hattie Pate

    No full text
    Hattie Pate is the daughter of D. A. Pate and Ellen Pate Rix. Hattie attended Wilcox Academy

    Immunolocalization of rat PATE and PATE-F in the epididymis.

    No full text
    <p>Serial sections of the rat tissues were subjected to antigen retrieval in citrate buffer pH 6.0. They were then probed with polyclonal antibodies (1∶250 dilution) raised in rabbit against PATE and PATE-F followed by TRIC (for PATE) or FITC (for PATE-F) conjugated secondary antibody (1∶500 dilution) against rabbit IgG raised in goat. Sections were counter-stained with DAPI. Panels A–C – preimmune serum; D–F – immune serum. Magnification – 10×.</p

    [Report concerning the murder of Lee Harvey Oswald]

    No full text
    Report to Chief J. E. Curry by D. L. Pate concerning his assignment and the murder of Lee Harvey Oswald. Pate describes his activities and observations on the day of the shooting of Oswald

    Immunofluorescence detection of PATE and PATE-F on rat sperm.

    No full text
    <p>Cauda epididymides from adult rats were dissected out and the spermatozoa collected were air dried and fixed on glass slides by methanol. PATE and PATE-F localization was carried out by incubating with PATE and PATE-F polyclonal antibodies raised in rabbit followed by FITC conjugated secondary antibodies against rabbit IgG raised in goat. Counter staining was carried out using DAPI. <b>A–C</b>, preimmune serum. <b>D–F</b>, immune serum. Magnification – 60×.</p

    Hölder type matrix inequalities of Pate, Blakley, and Roy extended to the inner product of Frobenius

    No full text
    AbstractSuppose m, n, and k are positive integers, and let 〈·,·〉 be the standard inner product on the spaces Rp, p>0. Recently Pate has shown that if D is an m×n non-negative real matrix, and u and v are non-negative unit vectors in Rn and Rm, respectively, then〈(DDt)kDu,v〉⩾〈Du,v〉2k+1,with equality if and only if 〈(DDt)kDu,v〉=0, or there exists α>0 such that Du=αv and Dtv=αu. This extends to non-symmetric non-square matrices a 1965 result of Blakley and Roy, and resolves a special case of a graph theoretic inequality conjectured by Sidorenko. We generalize the above, obtaining pure matrix inequalities involving the Frobenius inner product, 〈·,·〉f. In particular, we show that if k is a positive integer, and D, X, and Y are non-negative matrices that are m×n,n×p, and m×p, respectively, then∑i=1p‖xi‖‖yi‖2k〈D(DtD)kX,Y〉f⩾(〈DX,Y〉f)2k+1,where X has columns x1,x2,…,xp, Y has columns y1,y2,…,yp, and ‖·‖ is the 2-norm. Necessary and sufficient conditions for equality are also given
    corecore