2,793 research outputs found
Description of a digital computer simulation of an Annular Momentum Control Device (AMCD) laboratory test model
A description of a digital computer simulation of an Annular Momentum Control Device (AMCD) laboratory model is presented. The AMCD is a momentum exchange device which is under development as an advanced control effector for spacecraft attitude control systems. The digital computer simulation of this device incorporates the following models: six degree of freedom rigid body dynamics; rim warp; controller dynamics; nonlinear distributed element axial bearings; as well as power driver and power supply current limits. An annotated FORTRAN IV source code listing of the computer program is included
User's guide to a system of finite-element supersonic panel flutter programs
The utilization and operation of a set of six computer programs for the prediction of panel flutter at supersonic speeds by finite element methods are described. The programs run individually to determine the flutter behavior of a flat panel where the finite elements which model the panel each have four degrees of freedom (DOF), a curved panel where the finite elements each have four DOF, and a curved panel where the finite elements each have six DOF. The panels are assumed to be of infinite aspect ratio and are subjected to either simply-supported or clamped boundary conditions. The aerodynamics used by these programs are based on piston theory. Application of the program is illustrated by sample cases where the number of beam finite elements equals four, the in-plane tension parameter is 0.0, the maximum camber to panel length ratio for a curved panel case is 0.05, and the Mach number is 2.0. This memorandum provides a user's guide for these programs, describes the parameters that are used, and contains sample output from each of the programs
On Factorization of Molecular Wavefunctions
Recently there has been a renewed interest in the chemical physics literature
of factorization of the position representation eigenfunctions \{\} of
the molecular Schr\"odinger equation as originally proposed by Hunter in the
1970s. The idea is to represent in the form where
is \textit{purely} a function of the nuclear coordinates, while must
depend on both electron and nuclear position variables in the problem. This is
a generalization of the approximate factorization originally proposed by Born
and Oppenheimer, the hope being that an `exact' representation of can be
achieved in this form with and interpretable as `electronic'
and `nuclear' wavefunctions respectively. We offer a mathematical analysis of
these proposals that identifies ambiguities stemming mainly from the
singularities in the Coulomb potential energy.Comment: Manuscript submitted to Journal of Physics A: Mathematical and
Theoretical, May 2015. Accepted for Publication August 24 201
Community architecture: an evaluation of the case for user participation in architectural design.
Examination of the literature about Community Architecture
suggested that, while there is no commonly accepted definition, the
term signifies the recognition, among some sections of the architectural
profession, of a demand from the public to play a larger part in
shaping the environment. Central to this is a belief that user
participation in architectural design will lead to buildings that will
be more satisfactory for their occupants. Such a claim is widely
made, despite the absence of empirical evidence to support it. Thus
the study was concerned with testing the proposition that, if user
clients participate in the design and development process, in building
projects, there will be greater satisfaction with the completed
buildings and environment than in projects where there has been no
user participation. User clients, here, are taken to mean organisations
of people who will occupy the buildings they have commissioned.
The levels of tenant satisfaction, in three housing co-operative
projects, were measured and compared with the levels of satisfaction
found in a previous study of local authority housing, in England and
Wales. While, high levels of satisfaction with the three Case Study
projects were found, these were not higher than the more successful
non-participatory schemes and, when combined with other data, it was
concluded that not enough evidence, to support the proposition had
been found. Furthermore, it was not clear whether the levels of
satisfaction in the Case Studies were a result of user participation
in design or related to other factors.
Three further issues were examined, which give some explanation
of these results. These were propositions that the levels of satisfaction
were related to (i) the quality of the built product, (ii) the
degree to which the participants were involved and the architect, thus
able to better interpret their requirements and (iii) the influence of
management and control which the user clients had over the projects in
general.
This revealed that user influence on the product was very
limited, that there were many unsolved problems in involving the
participants in the design process and that issues of control and
management were more significant than the role of design participation
in affecting the satisfaction of the occupants
Effects of Picrotoxin Application on the Cardiac Ganglion of the American Lobster, \u3ci\u3eHomarus americanus\u3c/i\u3e
Picrotoxin (PTX) has been employed extensively as a tool within the crustacean stomatogastric nervous system (STNS) for its efficacy in blocking K+ and Cl+ currents gated by both GABA and glutamate. Through blocking some currents in the STNS, PTX allows for examination of other components without their presence. However, effects of PTX are relatively unknown within the lobster’s cardiac ganglion (CG). As an incredibly small nervous system of only nine neurons, the lobster CG presents an excellent model system for studying neural circuits. Given that the chemical synapses in the CG are mediated by glutamate, the present study aimed to investigate the action of PTX in the lobster CG with the intent of better understanding its pharmacological impacts as a potential tool for studying the system. Therefore, this study aimed to establish the effects of PTX on CG responses to the application of exogenous GABA or glutamate. When data from both modulators were pooled, PTX applied at a concentration of 10-5M had significant effects on burst duration but not duty cycle or burst frequency of the CG. PTX did suppress GABA (5x10-5M) mediated inhibition of burst duration and duty cycle. PTX did not have any significant effects on burst duration, duty cycle, or frequency compared to exogenous glutamate application. These results indicate that glutamatergic inhibitory synapses are not present in the CG and PTX partially suppresses only GABAergic responses in this system
Analysis and simulation of a magnetic bearing suspension system for a laboratory model annular momentum control device
A linear analysis and the results of a nonlinear simulation of a magnetic bearing suspension system which uses permanent magnet flux biasing are presented. The magnetic bearing suspension is part of a 4068 N-m-s (3000 lb-ft-sec) laboratory model annular momentum control device (AMCD). The simulation includes rigid body rim dynamics, linear and nonlinear axial actuators, linear radial actuators, axial and radial rim warp, and power supply and power driver current limits
Stochastic reaction & diffusion on growing domains: understanding the breakdown of robust pattern formation
Many biological patterns, from population densities to animal coat markings, can be thought of as heterogeneous spatiotemporal distributions of mobile agents. Many mathematical models have been proposed to account for the emergence of this complexity, but, in general, they have consisted of deterministic systems of differential equations, which do not take into account the stochastic nature of population interactions. One particular, pertinent criticism of these deterministic systems is that the exhibited patterns can often be highly sensitive to changes in initial conditions, domain geometry, parameter values, etc. Due to this sensitivity, we seek to understand the effects of stochasticity and growth on paradigm biological patterning models. In this paper, we extend spatial Fourier analysis and growing domain mapping techniques to encompass stochastic Turing systems. Through this we find that the stochastic systems are able to realize much richer dynamics than their deterministic counterparts, in that patterns are able to exist outside the standard Turing parameter range. Further, it is seen that the inherent stochasticity in the reactions appears to be more important than the noise generated by growth, when considering which wave modes are excited. Finally, although growth is able to generate robust pattern sequences in the deterministic case, we see that stochastic effects destroy this mechanism for conferring robustness. However, through Fourier analysis we are able to suggest a reason behind this lack of robustness and identify possible mechanisms by which to reclaim it
Power spectra methods for a stochastic description of diffusion on deterministically growing domains
A central challenge in developmental biology is understanding the creation of robust spatiotemporal heterogeneity. Generally, the mathematical treatments of biological systems have used continuum, mean-field hypotheses for their constituent parts, which ignores any sources of intrinsic stochastic effects. In this paper we consider a stochastic space-jump process as a description of diffusion, i.e., particles are able to undergo a random walk on a discretized domain. By developing analytical Fourier methods we are able to probe this probabilistic framework, which gives us insight into the patterning potential of diffusive systems. Further, an alternative description of domain growth is introduced, with which we are able to rigorously link the mean-field and stochastic descriptions. Finally, through combining these ideas, it is shown that such stochastic descriptions of diffusion on a deterministically growing domain are able to support the nucleation of states that are far removed from the deterministic mean-field steady state
Influence of stochastic domain growth on pattern nucleation for diffusive systems with internal noise
Numerous mathematical models exploring the emergence of complexity within developmental biology incorporate diffusion as the dominant mechanism of transport. However, self-organizing paradigms can exhibit the biologically undesirable property of extensive sensitivity, as illustrated by the behavior of the French-flag model in response to intrinsic noise and Turing’s model when subjected to fluctuations in initial conditions. Domain growth is known to be a stabilizing factor for the latter, though the interaction of intrinsic noise and domain growth is underexplored, even in the simplest of biophysical settings. Previously, we developed analytical Fourier methods and a description of domain growth that allowed us to characterize the effects of deterministic domain growth on stochastically diffusing systems. In this paper we extend our analysis to encompass stochastically growing domains. This form of growth can be used only to link the meso- and macroscopic domains as the “box-splitting” form of growth on the microscopic scale has an ill-defined thermodynamic limit. The extension is achieved by allowing the simulated particles to undergo random walks on a discretized domain, while stochastically controlling the length of each discretized compartment. Due to the dependence of diffusion on the domain discretization, we find that the description of diffusion cannot be uniquely derived. We apply these analytical methods to two justified descriptions, where it is shown that, under certain conditions, diffusion is able to support a consistent inhomogeneous state that is far removed from the deterministic equilibrium, without additional kinetics. Finally, a logistically growing domain is considered. Not only does this show that we can deal with nonmonotonic descriptions of stochastic growth, but it is also seen that diffusion on a stationary domain produces different effects to diffusion on a domain that is stationary “on average.
In Fed meetings, decision making is free – but not equal.
With its ability to influence interest rates globally, the Federal Open Market Committee (FOMC) of the US Federal Reserve is arguably one of the most important decision making bodies on the planet. But how does it come to its decisions? In new research which analyses transcripts of FOMC deliberations over nearly 30 years, Joseph Gardner and John T. Woolley find that women speak less than men for nearly their entire tenure on the FOMC. While women are free to speak, they write, they do not participate equally in FOMC deliberations, and this could be influencing policy choices
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