196,729 research outputs found

    Bernard and Millie Haas Family

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    Mildred (Millie) Rose Haas, 88, Bradenton, died August 15, 2014. Millie was born March 10, 1926 in Perrysburg, Ohio, the daughter of Everett A. Mahler and Bertha Pratt Mahler and came to Bradenton in August of 1960. She was a homemaker and mother of 12 children and a long time member of St. Joseph Catholic Church. She was a homemaker and mother of 12 children and a long time member of St. Joseph Catholic Church. She is survived by her sister, Doris Shiple and predeceased by her sisters, Dorothy Hoffman, Virginia Twinning , Florence Trzeciak and Eileen Mahler. She was preceded in death by husband of 54 years, Bernard P. Haas and her son, Gregory E. Haas. Millie is survived by her children, Sandra K. Haas-Martens, Holmes Beach, Dale A. Haas, Sarasota, Gerald A. Haas, Ft. Myers, Mark E. Haas, Tampa, James J. Haas, Bradenton, Elaine M. Haas, Bradenton, Francis J. Haas, Bradenton, Douglas P. Haas, Palmetto, Cheryl A. Gonzales, Albuquerque, New Mexico, Bonnie R. Haas-Cumber, Tamp

    Data for: Mining Matters: Natural Resource Extraction and Firm-Level Constraints

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    Dataset for "Mining Matters: Natural Resource Extraction and Firm-Level Constraints" (Journal of International Economics) by Ralph De Haas and Steven Poelhekk

    Migration and development. A theoretical perspective

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    de Haas H. Migration and development. A theoretical perspective. COMCAD Arbeitspapiere - working papers, 29. Bielefeld: COMCAD - Center on Migration, Citizenship and Development; 2007

    de Haas-van Alphen and Shubnikov-de Haas oscillations in RAgSb2 (R = Y, La-Nd, Sm)

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    de Haas-van Alphen and Shubnikov-de Haas oscillations have been used to study the Fermi surface of the simple tetragonal RAgSb2 series of compounds with R = Y, La-Nd, and Sm. The high quality of the flux-grown single crystals, coupled with very small extremal cross sections of Fermi surface, allow the observation of quantum oscillations at modest fields (H<30 kG) and high temperatures (up to 25 K in SmAgSb2). For H parallel to c, the effective masses, determined from the temperature dependence of the amplitudes, are quite small, typically between 0.07 and 0.5m(0). The topology of the Fermi surface was determined from the angular dependence of the frequencies for R = Y, La, and Sm. In SmAgSb2, antiferromagnetic ordering below 8.8 K is shown to dramatically alter the Fermi surface. For LaAgSb2 and CeAgSb2, the effect of applied hydrostatic pressure on the frequencies was also studied. Finally, the experimental data were compared to the Fermi surface calculated within the tight-binding linear muffin-tin orbital approximation. Overall, the calculated electronic structure was found to be consistent with the experimental data.This article is published as Myers, K. D., S. L. Bud’ko, V. P. Antropov, B. N. Harmon, P. C. Canfield, and A. H. Lacerda. "de Haas–van Alphen and Shubnikov–de Haas oscillations in R AgSb 2 (R= Y, La-Nd, Sm)." Physical Review B 60, no. 19 (1999): 13371. DOI: 10.1103/PhysRevB.60.13371. Copyright 1999 American Physical Society. Posted with permission

    Germany -- 1962-67 -- Correspondence, OPV International -- letter, 1962-09-04

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    Letter from Haas, R. to Sabin, Albert B. dated 1962-09-04.Sabin Collection Fair Use Policy</a

    Balancing metabolism in genetic and drug-induced energy deficiencies

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    Contains fulltext : 219327.pdf (Publisher’s version ) (Open Access)Radboud University, 23 juni 2020Promotores : Russel, F.G.M., Smeitink, J.A.M. Co-promotores : Schirris, T.J.J., Haas, R. d

    Elise Haas, (1880-1955), purchased by Mr. Gustave H. Haas on July 9, 1955.

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    Documents regarding the double headstone for Elise Haas, (1880-1955), buried with Gustave H. Haas (1874), purchased by Mr. Gustave H. Haas. The marker was placed at Mt. Carmel Cemetery, Lot 176, Section 9 in Toledo, Ohio. The stone is made of Barre R. O. A. with Sandblast letters. Obituary is included

    Shaping a Lfe of Significance for Retirement by R. Jack Hansen and Jerry P. Haas

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    The article reviews the book Shaping a Life of Significance for Retirement, by R. Jack Hansen and Jerry P. Haas

    Haas-Molnar Continued Fractions and Metric Diophantine Approximation.

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    Haas–Molnar maps are a family of maps of the unit interval introduced by A. Haas and D. Molnar. They include the regular continued fraction map and A. Renyi’s backward continued fraction map as important special cases. As shown by Haas and Molnar, it is possible to extend the theory of metric diophantine approximation, already well developed for the Gauss continued fraction map, to the class of Haas–Molnar maps. In particular, for a real number x, if (p n /q n )n≥1 denotes its sequence of regular continued fraction convergents, set θ n (x) = q 2n|x − p n /q n |, n = 1, 2.... The metric behaviour of the Cesàro averages of the sequence (θ n (x))n≥1 has been studied by a number of authors. Haas and Molnar have extended this study to the analogues of the sequence (θ n (x))n≥1 for the Haas–Molnar family of continued fraction expansions. In this paper we extend the study of (θkn(x))({\theta _{{k_n}}}(x))n≥1 for certain sequences (k n )n≥1, initiated by the second named author, to Haas–Molnar maps
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