7,167 research outputs found
An improved method for obtaining a normalized junction temperature for semiconductors: A concept
Failure rate for given semiconductor device is simply determined by reading value of normalized junction temperature from printout for any given combination of ambient temperature, stress ratio, and maximum rated junction temperature, and obtaining corresponding failure rate from graph
Supergravity with Self-dual B fields and Instantons in Noncommutative Gauge Theory
We study Type IIB supergravity in the presence of (euclidean) D3 branes and
nonzero self-dual B-fields. We point out that the Einstein frame metric is
identical to the full geometry for D3 branes without B fields turned on.
Furthermore, in a decoupling limit in which the theory is conjectured to be
dual to noncommutative Yang-Mills theory, the entire Einstein metric remains
intact, and in particular, is asymptotically flat. We construct D-instanton
solutions in this geometry. We show that in the decoupling limit the
D-instanton action agrees with the action of the corresponding instanton in the
noncommutative Yang-Mills theory and is expressed in terms of the open string
coupling. Some other aspects of this correspondence, which have unusual
features because the underlying metric is asymptotically flat, are explored.Comment: 25 pages, harvma
On a method for mending time to failure distributions
Many software reliability growth models assume that the time to next failure may be infinite; i.e., there is a chance that no failure will occur at all. For most software products this is too good to be true even after the testing phase. Moreover, if a non-zero probability is assigned to an infinite time to failure, metrics like the mean time to failure do not exist. In this paper, we try to answer several questions: Under what condition does a model permit an infinite time to next failure? Why do all finite failures non-homogeneous Poisson process (NHPP) models share this property? And is there any transformation mending the time to failure distributions? Indeed, such a transformation exists; it leads to a new family of NHPP models. We also show how the distribution function of the time to first failure can be used for unifying finite failures and infinite failures NHPP models. --software reliability growth model,non-homogeneous Poisson process,defective distribution,(mean) time to failure,model unification
Bosons in a double-well potential: Understanding the interplay between disorder and interaction in a simple model
We propose an exactly solvable model to reveal the physics of the interplay
between interaction and disorder in bosonic systems. Considering interacting
bosons in a double-well potential, in which disorder is mimicked by taking the
energy level mismatch between the two wells to be randomly distributed, we find
"two negatives make a positive" effect. While disorder or interaction by itself
suppresses the phase coherence between the two wells, both together enhance the
phase coherence. This model also captures several striking features of the
disordered Bose-Hubbard model found in recent numerical simulations. Results at
finite temperatures may help explain why a recent experiment did not find any
evidence for the enhancement of phase coherence in a disordered bosonic system.Comment: Published version, 4 pages, 4 figure
A tutorial on the CARE III approach to reliability modeling
The CARE 3 reliability model for aircraft avionics and control systems is described by utilizing a number of examples which frequently use state-of-the-art mathematical modeling techniques as a basis for their exposition. Behavioral decomposition followed by aggregration were used in an attempt to deal with reliability models with a large number of states. A comprehensive set of models of the fault-handling processes in a typical fault-tolerant system was used. These models were semi-Markov in nature, thus removing the usual restrictions of exponential holding times within the coverage model. The aggregate model is a non-homogeneous Markov chain, thus allowing the times to failure to posses Weibull-like distributions. Because of the departures from traditional models, the solution method employed is that of Kolmogorov integral equations, which are evaluated numerically
Attitudes, Incentives and Tax Compliance
Our study examines whether combining experimental economics and economics psychology techniques can provide a better understanding of individuals’ tax compliance decisions in the laboratory. We find that considering individuals’ attitudinal, personality and intention measures in addition to economic based variables provides a richer understanding of individuals’ actual tax compliance decisions in the laboratory in the face of monetary incentives. We also find that hypothetical and actual compliance decisions in the laboratory are significantly different from each other. Specifically, we find that actual (hypothetical) compliance decisions are significantly influenced by their moral reasoning (anti-establishment) views. Finally, we find that individuals’ actual compliance decisions in the laboratory correlate more significantly with their admission of prior evasion than either their hypothetical compliance decisions or their responses to case scenarios. The latter result, coupled with the lack of appropriate field data on tax compliance, indicates that actual compliance decisions in the laboratory in the face of monetary incentives and with the use of tax terms in the instructions may be an ideal method of obtaining data on individuals’ tax compliance.
An application of the multivariate extended Poisson distribution in 2 times 2 contingency tables Final report
Application of multivariate extended Poisson distribution
Validation Methods Research for Fault-Tolerant Avionics and Control Systems Sub-Working Group Meeting. CARE 3 peer review
A computer aided reliability estimation procedure (CARE 3), developed to model the behavior of ultrareliable systems required by flight-critical avionics and control systems, is evaluated. The mathematical models, numerical method, and fault-tolerant architecture modeling requirements are examined, and the testing and characterization procedures are discussed. Recommendations aimed at enhancing CARE 3 are presented; in particular, the need for a better exposition of the method and the user interface is emphasized
Radiative interactions in laminar duct flows
Analyses and numerical procedures are presented for infrared radiative energy transfer in gases when other modes of energy transfer occur simultaneously. Two types of geometries are considered, a parallel plate duct and a circular duct. Fully developed laminar incompressible flows of absorbing-emitting species in black surfaced ducts are considered under the conditions of uniform wall heat flux. The participating species considered are OH, CO, CO2, and H2O. Nongray as well as gray formulations are developed for both geometries. Appropriate limiting solutions of the governing equations are obtained and conduction-radiation interaction parameters are evaluated. Tien and Lowder's wide band model correlation was used in nongray formulation. Numerical procedures are presented to solve the integro-differential equations for both geometries. The range of physical variables considered are 300 to 2000 K for temperature, 0.1 to 100.0 atm for pressure, and 0.1 to 100 cm spacings between plates/radius of the tube. An extensive parametric study based on nongray formulation is presented. Results obtained for different flow conditions indicate that the radiative interactions can be quite significant in fully developed incompressible flows
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