169,480 research outputs found
Le Portrait : fleurs d'opéra pour piano / par W. Cramer ; [orn. par] Æmmerique ; [d'après l'opéra-comique de Théodore de Lajarte]
Titre uniforme : Cramer, W. (18..-18.. ; compositeur). Compositeur. [Arrangement. Lajarte, Théodore de. Le Portrait, Piano]Piano, Musique de -- +* 1800......- 1899......+:19e siècle
Albert W. Al Cramer Interview, July 22, 1984
Albert Cramer discusses his 30-year career, which began in 1943, as a smokejumper and program administrator in Missoula, Montana, and Alaska. He talks about the training and equipment, as well as the changes to both. He describes specific jumps and fires, including the 1949 Mann Gulch Fire and the 1949 jump onto the White House lawn. Cramer contrasts working with the U.S. Forest Service as a smokejumper in Montana with working with the U.S. Bureau of Land Management (BLM) as a smokejumper in Alaska.https://scholarworks.umt.edu/smokejumpers/1031/thumbnail.jp
Le Bravo : fantaisie pour piano : deux suites. [1re suite] / par W. Cramer ; [d'après l']opéra de G. Salvayre
Titre uniforme : Cramer, W. (18..-18.. ; compositeur). Compositeur. [Arrangement. Salvayre, Gaston. Le Bravo. Piano. 1re suite]Fantaisies (piano) -- +* 1800......- 1899......+:19e siècle:Piano, Musique de -- +* 1800......- 1899......+:19e siècle
Computing the Cramer-Rao bound of Markov random field parameters: Application to the Ising and the Potts models
This letter considers the problem of computing the Cramer–Rao bound for the parameters of a Markov random field. Computation of the exact bound is not feasible for most fields of interest because their likelihoods are intractable and have intractable derivatives. We show here how it is possible to formulate the computation of the bound as a statistical inference problem that can be solve approximately, but with arbitrarily high accuracy, by using a Monte Carlo method. The proposed methodology is successfully applied on the Ising and the Potts models
[Freundschaftsbuch von Carl Eduard Cramer (1831-1901)] : 78 Porträts / 34 W. Wis s/m C. Cramer z. fdr. Er
Dedikationssilhouette nach rechts von einem Herr Wiss [?], gewidmet Carl Eduard Cramer (1831-1901)Anonyme/r Künstler/inHandschriftliche Widmung mit Bleistift unterhalb des Bildes "W. Wiss s[einem] C. Cramer z. fdr. Er. [i.e.: zur freundschaftlichen Erinnerung]"Aus der Sammlung Carl Eduard Cramer Exemplar der Zentralbibliothek Zürich, Graphische Sammlung und Fotoarchi
Cramer-von Mises and Anderson-Darling goodness of fit tests for extreme value distributions with unknown parameters
The use of goodness of fit tests based on Cramer-von Mises and Anderson-Darling statistics is discussed, with reference to the composite hypothesis that a sample of observations comes from a distribution, FH, whose parameters are unspecified. When this is the case, the critical region of the test has to be redetermined for each hypothetical distribution FH. To avoid this difficulty, a transformation is proposed that produces a new test statistic which is independent of FH. This transformation involves three coefficients that are determined using the asymptotic theory of tests based on the empirical distribution function. A single table of coefficients is thus sufficient for carrying out the test with different hypothetical distributions; a set of probability models of common use in extreme value analysis is considered here, including the following: extreme value 1 and 2, normal and lognormal, generalized extreme value, three-parameter gamma, and log-Pearson type 3, in all cases with parameters estimated using maximum likelihood. Monte Carlo simulations are used to determine small sample corrections and to assess the power of the tests compared to alternative approaches
QUANTUM-OPTICAL VERSION OF CRAMER THEOREM
Cramer's theorem is formulated in the context of quantum optics. A physical meaning for the theorem is given and is illustrated by the generation of thermal noise from a pure quantum state.open110sciescopu
Paul Cramer
Portrait, head and shoulders. (On verso: Paul Cramer. Math. [engraving instructions.] Return to w. k. rose. fay'ville.
Engineering of diffraction-quality crystals of the NF-κB P52 homodimer:DNA complex
AbstractThe eukaryotic transcription factors NF-κB P50 and NF-κB P52 are closely related members of the Rel family. Growth of diffraction-quality NF-κB P52:DNA co-crystals crucially depended on (a) extensive screens for the DNA fragment of optimal length and (b) engineering of the protein based on the two known NF-κB P50:DNA co-crystal structures [Müller et al. (1995) Nature 373, 311–317; Ghosh et al. (1995) Nature 373, 303–310]; namely, deletion of 12 C-terminal amino acid residues. These residues are part of the Rel homology region and comprise the nuclear localization signal. The approach might be of general use for the crystallization of other Rel protein:DNA complexes and in our case yielded co-crystals which diffract beyond 2.0 Å resolution.© 1997 Federation of European Biochemical Societies
Cramer (Birth, 1891-08-03)
Address: 52 Ludlow Ave4998/Pg. 142/1891/F W/Phila. Pa/Pa/Dr. W E RickeyOriginal record filed in drawer labeled 'CRAMER-CRUSE'
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