Search results for "Boundary"

showing 10 items of 1626 documents

A two-point boundary value formulation of a mean-field crowd-averse game

2014

Abstract We consider a population of “crowd-averse” dynamic agents controlling their states towards regions of low density. This represents a typical dissensus behavior in opinion dynamics. Assuming a quadratic density distribution, we first introduce a mean-field game formulation of the problem, and then we turn the game into a two-point boundary value problem. Such a result has a value in that it turns a set of coupled partial differential equations into ordinary differential equations.

education.field_of_studyMathematical optimizationPartial differential equationExample of a game without a valueOrdinary differential equationNormal-form gamePopulationApplied mathematicsBoundary value problemeducationGame theoryImplementation theoryMathematicsIFAC Proceedings Volumes
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A Side-by-Side Single Sex Age-Structured Human Population Dynamic Model: Exact Solution and Model Validation

2008

A side-by-side single sex age-structured population dynamic model is presented in this paper. The model consists of two coupled von Foerster-McKendrick-type quasi-linear partial differential equations, two initial conditions, and two boundary conditions. The state variables of the model are male and female population densities. The solutions of these partial differential equations provide explicit time and age dependence of the variables. The initial conditions define the male and female population densities at the initial time, while the boundary conditions compute the male and female births at zero-age by using fertility rates. The assumptions of the nontime-dependence of the death and fe…

education.field_of_studyState variableAlgebra and Number TheoryPartial differential equationSociology and Political ScienceTotal fertility ratePopulationExact solutions in general relativityFactorizationEconometricsQuantitative Biology::Populations and EvolutionApplied mathematicsBoundary value problemMathematical structureeducationSocial Sciences (miscellaneous)MathematicsThe Journal of Mathematical Sociology
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On the computational aspects of a symmetric multidomain BEM for elastoplastic analysis

2012

The symmetric boundary element method (SBEM) is applied to the elasto-plastic analysis of bodies subdivided into substructures. This methodology is based on the use of: a multidomain SBEMapproach, for the evaluation of the elastic predictor; a return mapping algorithm based on the extremal paths theory, for the evaluation of inelastic quantities characterizing the plastic behaviour of each substructure; and a transformation of the domain inelastic integrals of each substructure into corresponding boundary integrals. The elastic analysis is performed by using the SBEM displacement approach, which has the advantage of creating system equations that only consist of nodal kinematical unknowns a…

elastoplasticity symmetric boundary element method multidomain approach singular domain integral return mapping algorithm
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Functional a posteriori error equalities for conforming mixed approximations of elliptic problems

2014

elliptic boundary value problemerror equalitymixed formulationfunctional a posteriori error estimatecombined norm
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Optimal control in models with conductive‐radiative heat transfer

2003

In this paper an optimal control problem for the elliptic boundary value problem with nonlocal boundary conditions is considered. It is shown that the weak solutions of the boundary value problem depend smoothly on the control parameter and that the cost functional of the optimal control problem is Frechet differentiable with respect to the control parameter. Optimalus valdymas modeliuose su laidžiu-radioaktyviu šilumos pernešimu Santrauka Darbe nagrinejamas nelokalaus kraštinio uždavinio optimalaus valdymo uždavinys. Parodyta, kad silpnasis kraštinio uždavinio sprendinys tolydžiai priklauso nuo valdomojo parametro, taigi, optimalaus valdymo tikslo funkcija yra diferencijuojama Freše prasme…

elliptic equationMathematical analysisradiative heat transferMixed boundary conditionOptimal controlElliptic boundary value problemRobin boundary conditionnonlocal boundary conditionsBoundary conditions in CFDShooting methodModeling and Simulationboundary value problemFree boundary problemQA1-939Boundary value problemAnalysisMathematicsMathematicsMathematical Modelling and Analysis
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End-Triassic Extinction in a Carbonate Platform From Western Tethys: A Comparison Between Extinction Trends and Geochemical Variations

2022

The Triassic/Jurassic boundary section cropping out at Mt Sparagio in north-western Sicily (Italy) consists of a thick and continuous peritidal succession typical of a Tethyan carbonate platform. The combined chemostratigraphic and biostratigraphic study of this section allowed us to parallel the environmental variations inferred by the isotopic records and the extinction trends recorded by the benthic organisms. In the studied section, the isotope data of C, O, and S are indicative of serious environmental perturbations related to the Central Atlantic Magmatic Province (CAMP) activity, as recorded worldwide. Two negative excursions in the C-curve (Initial-CIE and Main-CIE) confirm the acid…

end Triassic extinctionlarge igneous provinceZn-Sr-Pb isotopeddc:550General Earth and Planetary SciencesTriassic-Jurassic boundary; end Triassic extinction; large igneous province; mass extinction; Zn-Sr-Pb isotope; Sicilymass extinctionSicilyTriassic-Jurassic boundaryFrontiers in Earth Science
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A fast hierarchical dual boundary element method for three-dimensional elastodynamic crack problems

2010

In this work a fast solver for large-scale three-dimensional elastodynamic crack problems is presented, implemented, and tested. The dual boundary element method in the Laplace transform domain is used for the accurate dynamic analysis of cracked bodies. The fast solution procedure is based on the use of hierarchical matrices for the representation of the collocation matrix for each computed value of the Laplace parameter. An ACA (adaptive cross approximation) algorithm is used for the population of the low rank blocks and its performance at varying Laplace parameters is investigated. A preconditioned GMRES is used for the solution of the resulting algebraic system of equations. The precond…

fast BEM solverdual boundary element methodlarge-scale computationlaplace transform methodSettore ING-IND/04 - Costruzioni E Strutture Aerospazialielastodynamics
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A fast dual boundary element method for 3D anisotropic crack problems

2009

In the present paper a fast solver for dual boundary element analysis of 3D anisotropic crack problems is formulated, implemented and tested. The fast solver is based on the use of hierarchical matrices for the representation of the collocation matrix. The admissible low rank blocks are computed by adaptive cross approximation (ACA). The performance of ACA against the accuracy of the adopted computational scheme for the evaluation of the anisotropic kernels is investigated, focusing on the balance between the kernel representation accuracy and the accuracy required for ACA. The system solution is computed by a preconditioned GMRES and the preconditioner is built exploiting the hierarchical …

fast BEM solverdual boundary element methodlarge-scale computationsanisotropic crack problemSettore ING-IND/04 - Costruzioni E Strutture Aerospaziali
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Finite element approximation for a div-rot system with mixed boundary conditions in non-smooth plane domains

1984

The authors examine a finite element method for the numerical approximation of the solution to a div-rot system with mixed boundary conditions in bounded plane domains with piecewise smooth boundary. The solvability of the system both in an infinite and finite dimensional formulation is proved. Piecewise linear element fields with pointwise boundary conditions are used and their approximation properties are studied. Numerical examples indicating the accuracy of the method are given. peerReviewed

finite element method [keyword]msc:65Z05piecewise smooth boundary [keyword]Piecewise linear element fields [keyword]numerical examples [keyword]div-rot system [keyword]msc:65N30div-rot systemmixed boundary conditions [keyword]msc:78A25Maxwell equations [keyword]msc:35Q99
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Inverse problems and invisibility cloaking for FEM models and resistor networks

2013

In this paper we consider inverse problems for resistor networks and for models obtained via the finite element method (FEM) for the conductivity equation. These correspond to discrete versions of the inverse conductivity problem of Calderón. We characterize FEM models corresponding to a given triangulation of the domain that are equivalent to certain resistor networks, and apply the results to study nonuniqueness of the discrete inverse problem. It turns out that the degree of nonuniqueness for the discrete problem is larger than the one for the partial differential equation. We also study invisibility cloaking for FEM models, and show how an arbitrary body can be surrounded with a layer …

finite element methodBoundary (topology)CloakingInverse35R30 65N30 05C5001 natural sciencesDomain (mathematical analysis)inversio-ongelmatMathematics - Analysis of PDEsFOS: MathematicsMathematics - Numerical Analysis0101 mathematicsMathematicsPartial differential equationinverse problemsApplied Mathematicsta111010102 general mathematicsMathematical analysisTriangulation (social science)Numerical Analysis (math.NA)Inverse problem16. Peace & justiceFinite element methodComputer Science::Other010101 applied mathematicselementtimenetelmäModeling and Simulationresistor networksAnalysis of PDEs (math.AP)
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