150,192 research outputs found
Parentation Wie sie, Auf allergnädigsten Befehl, Bey einer sehr Volckreichen Versammlung gehalten worden, Von Seiner Königl. Majestät. Allerdmüthigsten Knecht D. F. Als man den, am 11. Aprilis 1731. Zu Potsdam verstorbenen, Freyherrn von Gundling, Sr. Königl. Majestät von Preussen Geheimten Rath [et]c. Den Tag nach seinem seeligen Abscheiden von der Welt, mit einer ansehnlichen und höchst-rühmlichen Leich-Procession, hinaus nach Bornstädt/ nahe bey Potsdam gelegen, gebracht, und alda in der Kirche beerdiget.
D. F. ist David FassmannSignaturformel nach Ex. der GWLB Hannover: A6 [A2 statt A3]Vorlageform des Erscheinungsvermerks: Potsdam, gedruckt bey B. Neumann, Königl Preuß. privil. Hof-Buchdrucker und Buchhändler
The COLOSS BEEBOOK Volume II, Standard methods for Apis mellifera pest and pathogen research: Introduction
The COLOSS BEEBOOK is a practical manual compiling standard methods in all fields of research on the western honey bee, Apis mellifera. The COLOSS network was founded in 2008 as a consequence of the heavy and frequent losses of managed honey bee colonies experienced in many regions of the world (Neumann and Carreck, 2010). As many of the world’s honey bee research teams began to address the problem, it soon became obvious that a lack of standardized research methods was seriously hindering scientists’ ability to harmonize and compare the data on colony losses obtained internationally. In its second year of activity, during a COLOSS meeting held in Bern, Switzerland, the idea of a manual of standardized honey bee research methods emerged. The manual, to be called the COLOSS BEEBOOK, was inspired by publications with similar purposes for fruit fly research (Lindsley and Grell, 1968; Ashburner, 1989; Roberts, 1998; Greenspan, 2004)
The COLOSS BEEBOOK Volume I, Standard methods for Apis mellifera research: Introduction
The COLOSS BEEBOOK is a practical manual compiling standard methods in all fields of research on the western honey bee, Apis mellifera. The COLOSS network was founded in 2008 as a consequence of the heavy and frequent losses of managed honey bee colonies experienced in many regions of the world (Neumann and Carreck, 2010). As many of the world’s honey bee research teams began to address the problem, it soon became obvious that a lack of standardized research methods was seriously hindering scientists’ ability to harmonize and compare the data on colony losses obtained internationally. In its second year of activity, during a COLOSS meeting held in Bern, Switzerland, the idea of a manual of standardized honey bee research methods emerged. The manual, to be called the COLOSS BEEBOOK, was inspired by publications with similar purposes for fruit fly research (Lindsley and Grell, 1968; Ashburner 1989; Roberts, 1998; Greenspan, 2004)
Equilibrio competitivo y soportes del crecimiento en el modelo de Von Neumann
This paper shows the existence of a reproducible competitive equilibrium in the general Von Neumann growth model, extending in this way a result due to Roemer.
Episteln und Evangelia auf alle Sonn-, Fest- und Feyertage durchs ganze Jahr : Nebst der Historie vom Leiden und Sterben unsers Herrn Jesu Christi, Zerstörung der Stadt Jerusalem, die drey Hauptsymbola des christlichen Glaubens, die unveränderte augspurgische Confeßion, und Herrn D. Martin Luthero kleinen Catechismo
Autopsie nach dem Ex. der ULB Sachsen-AnhaltVorlageform des Erscheinungsvermerks: Erfurt, Verlegts Wilhelm Neumann, Buchbinder an der Neuenstraße 1793
Three nontrivial solutions for the p-Laplacian Neumann problems with a concave nonlinearity near the origin
We consider a nonlinear Neumann problem driven by the p-
Laplacian, with a right-hand side nonlinearity which is concave near the
origin. Using variational techniques, combined with the method of upper-lower
solutions and with Morse theory, we show that the problem has at least three
nontrivial smooth solutions, two of which have a constant sign (one positive
and one negative).FCTPOCI/MAT/55524/200
Kochen-Specker theorem for von Neumann algebras
The Kochen-Specker theorem has been discussed intensely ever since its original proof in 1967. It is one of the central no-go theorems of quantum theory, showing the non-existence of a certain kind of hidden states models. In this paper, we first offer a new, non-combinatorial proof for quantum systems with a type I_n factor as algebra of observables, including I_infinity. Afterwards, we give a proof of the Kochen-Specker theorem for an arbitrary von Neumann algebra R without summands of types I_1 and I_2, using a known result on two-valued measures on the projection lattice P(R). Some connections with presheaf formulations as proposed by Isham and Butterfield are made
The electroporation hysteresis
Neumann E. The electroporation hysteresis. Ferroelectrics. 1988;86(1):325-333
Irrational behavior in the Brown-von Neumann-Nash dynamics
We present a class of games with a pure strategy being strictly dominated by another pure strategy such that the former survives along most solutions of the Brown-von Neumann-Nash dynamics.Nash map, BNN dynamics, Dominated strategies
Mean Curvature Flow with a Neumann Boundary Condition in Flat Spaces
In this thesis I study mean curvature flow in both Euclidean and Minkowski space with a Neumann boundary condition. In Minkowski space I show that for a convex timelike cone boundary condition, with compatible spacelike initial data, mean curvature flow with a perpendicular Neumann boundary condition exists for all time. Furthermore, by a blowdown argument I show convergence as t →∞ to a homothetically expanding hyperbolic hyperplane. I also study the case of graphs over convex domains in Minkowski space. I obtain long time existence for spacelike initial graphs which are taken by mean curvature flow with a Neumann boundary condition to a constant function as t →∞. In Euclidean space I consider boundary manifolds that are rotational tori where I write t for the unit vector field in the direction of the rotation. If the initial manifold M₀ is compatible with the boundary condition, and at no point has t as a tangent vector, then mean curvature flow with a perpendicular Neumann boundary condition exists for all time and converges to a flat cross-section of the boundary torus. I also discuss other constant angle boundary conditions
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