189,642 research outputs found
Benner et al. (2024), Microstructural analysis of P
No full textSupplementary information and model data associated with Benner et al. (2024).THIS DATASET IS ARCHIVED AT DANS/EASY, BUT NOT ACCESSIBLE HERE. TO VIEW A LIST OF FILES AND ACCESS THE FILES IN THIS DATASET CLICK ON THE DOI-LINK ABOV
Benner et al. (2024), Microstructural analysis of P
No full textSupplementary information and model data associated with Benner et al. (2024).THIS DATASET IS ARCHIVED AT DANS/EASY, BUT NOT ACCESSIBLE HERE. TO VIEW A LIST OF FILES AND ACCESS THE FILES IN THIS DATASET CLICK ON THE DOI-LINK ABOV
World War I record of service survey for Fred W. Benner, signed 11 October 1922
No full textQuestionnaire about Fred Webster Benner's service in World War I, 1917-1919, signed by Benner on 11 October 1922.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
On the Solution of the Nonsymmetric T-Riccati Equation
Full text linkThe nonsymmetric T-Riccati equation is a quadratic matrix equation where the linear part corresponds to the so-called T-Sylvester or T-Lyapunov operator that has previously been studied in the literature. It has applications in macroeconomics and policy dynamics. So far, it presents an unexplored problem in numerical analysis, and both theoretical results and computational methods are lacking in the literature. In this paper we provide some sufficient conditions for the existence and uniqueness of a nonnegative minimal solution, namely the solution with component-wise minimal entries. Moreover, the efficient computation of such a solution is analyzed. Both the small-scale and large-scale settings are addressed, and Newton-Kleinman-like methods are derived. The convergence of these procedures to the minimal solution is proven, and several numerical results illustrate the computational efficiency of the proposed methods
Estimating the Inf-Sup Constant in Reduced Basis Methods for Time-Harmonic Maxwell's Equations
No full textA Reduced Basis Method for Microwave Semiconductor Devices with Geometric Variations
No full textPurpose - The Reduced Basis Method (RBM) generates low-order models of parametrized PDEs to allow for efficient evaluation of parametrized models in many-query and real-time contexts. The purpose of this paper is to investigate the performance of the RBM in microwave semiconductor devices, governed by Maxwell's equations. Design/methodology/approach - The paper shows the theoretical framework in which the RBM is applied to Maxwell's equations and present numerical results for model reduction under geometry variation. Findings - The RBM reduces model order by a factor of $1,000 and more with guaranteed error bounds. Originality/value - Exponential convergence speed can be observed by numerical experiments, which makes the RBM a suitable method for parametric model reduction (PMOR). © Emerald Group Publishing Limited
Towards an alternative to Benner’s theory of expert intuition in nursing: A discussion paper
No full textSeveral authors have highlighted the role of intuition in expertise. In particular, a large amount of data has been collected about intuition in expert nursing, and intuition plays an important role in the influential theory of nursing expertise developed by Benner (1984). We discuss this theory, and highlight both data that support it and data that challenge it. Based on this assessment, we propose a new theory of nursing expertise and intuition, which emphasizes how perception and conscious problem solving are intimately related. In the discussion, we propose that this theory opens new avenues of enquiry for research into nursing expertise
Guide to MS164 Archie V. Benner, Sr. Engineering Files
Full text linkArchie V. Benner, Sr., architectural engineer, was born in 1897, and worked in El Paso, Texas for 55 years, as part of the firms of Benner, Bynum, and Dinsmoor; Hartger and Benner; and also Frasier and Benner. He was a member of the Texas Society of Professional Engineers. He died on July 7, 1979, at age 82, and was survived by his wife, Ann P. Benner, three sons, and two step-sons. The collection consists mainly of office files from the years 1920 to 1967 for Benner’s jobs in and around the El Paso, Texas area, including New Mexico. Although Benner’s projects included residences, most of the files are for the construction of commercial buildings, hospitals, schools, and churches. Materials in the collection include contracts, reports, correspondence, notes, plans, books, photographs, drawings, and blueprints
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