Search results for "Numerical Analysis"

showing 10 items of 883 documents

Electroelastic Analysis of Piezoelectric Composite Laminates by Boundary Integral Equations

2004

A boundary integral representation for the electroelastic state in piezoelectric composite laminates subjected to axial extension, bending, torsion, shear/bending, and electric loadings is proposed. The governing equations are presented in terms of electromechanical generalized variables by the use of a suitable matrix notation. Thus, the three-dimensional electroelasticity solution for piezoelectric composite laminates is generated from a set of two partially coupled differential equations defined on the cross section of each individual ply within the laminate. These ply equations are linked through the interface conditions, which allow restoration of the model of the laminate as a whole. …

Materials sciencebusiness.industryNumerical analysisPiezoelectricityAerospace EngineeringTorsion (mechanics)Mechanical engineeringStructural engineeringFiber-reinforced compositeComposite laminatesPiezoelectricitylaminates boundary element methodMethod of characteristicsSettore ING-IND/04 - Costruzioni E Strutture AerospazialibusinessActuatorBoundary element methodAIAA Journal
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Numerical analysis of light soaking phenomenon in Ruthenium based Dye Sensitized Solar Cells

2017

Dye Sensitized Solar Cells (DSSCs) are widely considered one of the most promising third generation photovoltaic devices, especially thanks to their relatively low cost if compared to conventional solar cells. An interesting phenomenon affecting such devices is the so-called light soaking effect, consisting in the increase of cell main electrical parameters after the exposition to solar light. In this work, starting from the experimental characterization carried out on Ruthenium-based DSSCs, we report on a series of numerical analysis performed to better describe the above-mentioned light soaking effect in order to show the relationship between such phenomenon and the main physical paramete…

Materials sciencebusiness.industryRenewable Energy Sustainability and the Environment020209 energyNumerical analysisPhotovoltaic systemDye Sensitized Solar Cellchemistry.chemical_elementEnergy Engineering and Power TechnologySettore ING-INF/02 - Campi Elettromagnetici02 engineering and technologylight soakingSettore ING-INF/01 - ElettronicaThird generationRutheniumphotovoltaicDye-sensitized solar cellnumerical modelingchemistrySimulated dataSolar light0202 electrical engineering electronic engineering information engineeringOptoelectronicsSpontaneous emissionbusiness
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Limits of the Open-Die Forward Extrusion: Numerical Analysis and Experimental Tests

1992

In the paper the open-die forward extrusion process is analysed in order to determine the influence of the most important geometrical and frictional parameters on the practical suitability of the operation. Experimental tests have been carried out and their results have been compared with the numerical ones derived by FEA.

Materials sciencebusiness.product_categoryNumerical analysisProcess (computing)Mechanical engineeringDie (manufacturing)ExtrusionbusinessFinite element method
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A numerical approach to Blow-up issues for dispersive perturbations of Burgers' equation

2014

We provide a detailed numerical study of various issues pertaining to the dynamics of the Burgers equation perturbed by a weak dispersive term: blow-up in finite time versus global existence, nature of the blow-up, existence for "long" times, and the decomposition of the initial data into solitary waves plus radiation. We numerically construct solitons for fractionary Korteweg-de Vries equations.

Mathematical analysisMathematics::Analysis of PDEsStatistical and Nonlinear PhysicsNumerical Analysis (math.NA)Condensed Matter PhysicsBurgers' equationDispersionless equationNonlinear Sciences::Exactly Solvable and Integrable SystemsMathematics - Analysis of PDEsFOS: MathematicsMathematics - Numerical AnalysisFinite timeNonlinear Sciences::Pattern Formation and SolitonsMathematicsAnalysis of PDEs (math.AP)
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Drilling Systems: Stability and Hidden Oscillations

2013

There are many mathematical models of drilling systems Despite, huge efforts in constructing models that would allow for precise analysis, drilling systems, still experience breakdowns. Due to complexity of systems, engineers mostly use numerical analysis, which may lead to unreliable results. Nowadays, advances in computer engineering allow for simulations of complex dynamical systems in order to obtain information on the behavior of their trajectories. However, this simple approach based on construction of trajectories using numerical integration of differential equations describing dynamical systems turned out to be quite limited for investigation of stability and oscillations of these s…

Mathematical modelDynamical systems theoryDifferential equationComputer scienceNumerical analysisStability (learning theory)Applied researchControl engineeringHidden oscillationNumerical integration
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Determination of Torsional Stresses in Shafts: From Physical Analogies to Mathematical Models

2015

This paper presents the historical development of methods used for the study of torsional stresses in shafts. In particular, the paper covers both analog methods, especially those based on electrical analogies proposed circa 1925, and numerical methods, especially finite difference methods (FDM), finite element methods (FEM) and boundary element methods (BEM).

Mathematical modelbusiness.industryNumerical analysisElectrical analogTorsional stress analysis BEM FEMFinite difference methodStructural engineeringMechanicsFinite element methodSettore ING-IND/14 - Progettazione Meccanica E Costruzione Di MacchineDevelopment (topology)businessBoundary element methodMathematics
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Optimality conditions for shakedown design of trusses

1995

This paper deals with optimal shakedown design of truss structures constituted by elastic perfectly plastic material. The design problem is formulated by means of a statical approach on the grounds of the shakedown lower bound theorem, and by means of a kinematical approach on the grounds of the shakedown upper bound theorem. In both cases two different types of design problem are formulated: one searches for the minimum volume design whose shakedown limit load is assigned; the other searches for the maximum shakedown limit load design whose volume is assigned. The Kuhn-Tucker equations of the four problems here above mentioned are found by utilizing a variational approach; these equations …

Mathematical optimizationApplied MathematicsMechanical EngineeringNumerical analysisComputational MechanicsTrussOcean EngineeringUpper and lower boundsShakedownComputational MathematicsComputational Theory and MathematicsSearch problemLimit loadCalculus of variationsMathematicsUpper bound theoremComputational Mechanics
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On Equivalent Random Traffic method extension

2011

The key result of the paper is the Equivalent Random Traffic (ERT) method extension for estimation of the throughput for schemes with traffic splitting. The excellent accuracy (relative error is less than 1%) is shown in numerical example. A numerical algorithm is given — how to estimate the throughput for schemes at traffic splitting and merging. The paper also contains new Erlang-B formula algorithm for non-integer number of channels based on parabolic approximation.

Mathematical optimizationApproximation errorTelecommunication channelsNumerical analysisComputer Science::Networking and Internet ArchitectureKey (cryptography)Integrated opticsExtension (predicate logic)Throughput (business)Erlang (unit)AlgorithmMathematics2011 Baltic Congress on Future Internet and Communications
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Scatter search for the profile minimization problem

2014

We study the problem of minimizing the profile of a graph and develop a solution method by following the tenets of scatter search. Our procedure exploits the network structure of the problem and includes strategies that produce a computationally efficient and agile search. Among several mechanisms, our search includes path relinking as the basis for combining solutions to generate new ones. The profile minimization problem PMP is NP-Hard and has relevant applications in numerical analysis techniques that rely on manipulating large sparse matrices. The problem was proposed in the early 1970s but the state-of-the-art does not include a method that could be considered powerful by today's compu…

Mathematical optimizationBasis (linear algebra)ExploitComputer Networks and CommunicationsComputer scienceNumerical analysisHardware and ArchitecturePath (graph theory)Graph (abstract data type)MetaheuristicSoftwareInformation SystemsSparse matrixEnvelope (motion)Networks
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A New ESO-Based Method to Find the Optimal Topology of Structures Subject to Multiple Load Conditions

2014

In the field of topology optimization problems, the Evolutionary Structural Optimization (ESO) method is one of the most popular and easy to use. When dealing with problems of reasonable difficulty, the ESO method is able to give very good results in reduced times and with a limited request of computational resources. Generally, main applications of this method are addressed to the definition of the optimal topology of a component subjected to a single load condition. In this work, a new methodology, based on the ESO approach, is introduced for the study of the optimal topology of a component subjected to multiple load conditions. The new procedure, entirely developed in the APDL programmin…

Mathematical optimizationComponent (UML)Numerical analysisTopology optimizationWork (physics)Subject (grammar)Topology (electrical circuits)General MedicineTopologyAlgorithmField (computer science)Finite element methodMathematicsApplied Mechanics and Materials
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