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En 1999 plus de n° aux sections mais elles restent les mêmes
Building --- Construction --- Periodicals. --- Périodiques --- Building. --- #TS:WDEP --- Engineering --- Civil Engineering --- concrete structures --- building materials --- technology --- composite structures --- geotechnical engineering --- structural mechanics --- Architectural engineering --- Construction science --- Engineering, Architectural --- Structural design --- Structural engineering --- Architecture --- Construction industry --- Civil engineering. Building industry --- Buildings --- Design and construction
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Structural analysis (Engineering) --- Structural design --- Mathematical optimization --- 519.863 --- Engineering design --- Architectural design --- Strains and stresses --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Structural engineering --- Optimization (Mathematics) --- Optimization techniques --- Optimization theory --- Systems optimization --- Mathematical analysis --- Maxima and minima --- Operations research --- Simulation methods --- System analysis --- Optimization models --- 519.863 Optimization models --- Mathematical optimization. --- Structural analysis
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The finite element method (FEM) has become the most widely accepted general-purpose technique for numerical simulations in engineering and applied mathematics. Principal applications arise in continuum mechanics, fluid flow, thermodynamics, and field theory. In these areas, computational methods are essential and benefit strongly from the enormous advances in computer technology. B-splines play an important role in approximation and geometric modeling. They are used in data fitting, computer-aided design (CAD), automated manufacturing (CAM), and computer graphics. Finite Element Methods with B-Splines describes new weighted approximation techniques, combining the computational advantages of B-splines and standard finite elements. In particular, no grid generation is necessary, which eliminates a difficult and often time-consuming preprocessing step. The meshless methods are very efficient and yield highly accurate solutions with relatively few parameters. This is illustrated for typical boundary value problems in fluid flow, heat conduction, and elasticity.
Spline theory --- Structural analysis (Engineering) --- Finite element method --- Spline functions --- Approximation theory --- Interpolation --- FEA (Numerical analysis) --- FEM (Numerical analysis) --- Finite element analysis --- Numerical analysis --- Isogeometric analysis --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Structural engineering --- Finite element method. --- Spline theory. --- Structural analysis (Engineering).
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Structural analysis (Engineering) --- Finite element method --- Heat --- Conduction --- 517.96 --- -Structural analysis (Engineering) --- #KVIV --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Structural engineering --- Electromagnetic waves --- Physics --- Cold --- Combustion --- Fire --- Temperature --- Thermochemistry --- Thermodynamics --- FEA (Numerical analysis) --- FEM (Numerical analysis) --- Finite element analysis --- Numerical analysis --- Isogeometric analysis --- Finite differences. Functional and integral equations --- Finite element method. --- Conduction. --- Structural analysis (Engineering). --- 517.96 Finite differences. Functional and integral equations --- Conduction of heat --- Heat - Conduction
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Structural engineering --- Structural design --- Structural stability --- Structural frames --- Technique de la construction --- Constructions --- Charpentes --- Calcul --- Stabilité --- Structural analysis (Engineering) --- Mathematical optimization --- Architecture --- Mathematical models --- Construction de bâtiments --- Building construction --- Volume --- Stability --- Construction --- Architecture. --- Mathematical optimization. --- Mathematical models. --- Structural analysis (Engineering). --- Stabilité --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Optimization (Mathematics) --- Optimization techniques --- Optimization theory --- Systems optimization --- Mathematical analysis --- Maxima and minima --- Operations research --- Simulation methods --- System analysis --- Architecture, Western (Western countries) --- Building design --- Buildings --- Western architecture (Western countries) --- Art --- Building --- Design and construction --- Architecture, Primitive --- Structural design - Mathematical models
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Structural analysis (Engineering) --- Matrix methods --- -51-74 --- 512.64 --- 681.3*G13 --- 681.3*J2 --- Matrices --- Mathematics--?-74 --- Linear and multilinear algebra. Matrix theory --- Numerical linear algebra: conditioning; determinants; Eigenvalues; error analysis; linear systems; matrix inversion; pseudoinverses; sparse and very largesystems --- Physical sciences and engineering (Computer applications) --- 681.3*J2 Physical sciences and engineering (Computer applications) --- 681.3*G13 Numerical linear algebra: conditioning; determinants; Eigenvalues; error analysis; linear systems; matrix inversion; pseudoinverses; sparse and very largesystems --- 512.64 Linear and multilinear algebra. Matrix theory --- 51-74 Mathematics--?-74 --- 51-74 --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Structural engineering --- Matrix methods&delete& --- Congresses --- Structural analysis (Engineering) - Matrix methods
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Mathematical analysis --- Numerical approximation theory --- Mathematical physics --- Structural analysis (Engineering) --- 519.6 --- 681.3 *G18 --- Architectural engineering --- Engineering, Architectural --- Structural mechanics --- Structures, Theory of --- Structural engineering --- Computational mathematics. Numerical analysis. Computer programming --- Partial differential equations: difference methods; elliptic equations; finite element methods; hyperbolic equations; method of lines; parabolic equations (Numerical analysis) --- Structural analysis (Engineering). --- 681.3 *G18 Partial differential equations: difference methods; elliptic equations; finite element methods; hyperbolic equations; method of lines; parabolic equations (Numerical analysis) --- 519.6 Computational mathematics. Numerical analysis. Computer programming --- Éléments finis, Méthode des --- Finite element method --- Analyse numérique. --- Numerical analysis --- Finite element method. --- Numerical analysis. --- Analyse numérique --- Éléments finis, Méthode des. --- Éléments finis, Méthode des --- Elements finis et analyse numerique des milieux continus --- Mathematique de l'ingenieur --- Milieu continu --- Structural analysis (engineering)
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