The h, p and h-p versions of the finite element method in 1 dimension. I. The error analysis of the p-version

Exponential convergence of the \textit{hp}-version of the composite Gauss-Legendre quadrature for integrals with endpoint singularities ⋮ Optimal error estimates for Legendre expansions of singular functions with fractional derivatives of bounded variation ⋮ The a posteriori error estimates of Chebyshev-Petrov-Galerkin methods for second-order equations ⋮ Nonlinear free vibration of non-prismatic single-walled carbon nanotubes by a non-local shear deformable beam \(p\)-element ⋮ DIRECT AND INVERSE APPROXIMATION THEOREMS FOR THE p-VERSION OF THE FINITE ELEMENT METHOD IN THE FRAMEWORK OF WEIGHTED BESOV SPACES PART II: OPTIMAL RATE OF CONVERGENCE OF THE p-VERSION FINITE ELEMENT SOLUTIONS ⋮ The h-p version of the finite element method for elliptic equations of order 2m ⋮ Interpolation in Jacobi-weighted spaces and its application to a posteriori error estimations of the \(p\)-version of the finite element method ⋮ Convergence of quasi-optimal sparse-grid approximation of Hilbert-space-valued functions: Application to random elliptic PDEs ⋮ Aphmesh refinement method for optimal control ⋮ The method of auxiliary mapping for the finite element solutions of elasticity problems containing singularities ⋮ Convergence of an adaptive \( hp\) finite element strategy in one space dimension ⋮ A three-dimensional self-adaptive \(hp\) finite element method for the characterization of waveguide discontinuities ⋮ Application of \(hp\)-adaptive finite element method to two-scale computation ⋮ The h-p version of the finite element method for parabolic equations. Part I. The p-version in time ⋮ WAMR: an adaptive wavelet method for the simulation of compressible reacting flow. Part I: Accuracy and efficiency of algorithm ⋮ Adaptive mesh refinement method for optimal control using nonsmoothness detection and mesh size reduction ⋮ Stream function-vorticity driven cavity solution using \(p\) finite elements ⋮ An \(hp\)-Galerkin method with fast solution for linear peridynamic models in one dimension ⋮ The treatment of nonhomogeneous Dirichlet boundary conditions by the p- version of the finite element method ⋮ Galerkin methods for stationary radiative transfer equations with uncertain coefficients ⋮ Error estimates of spectral element methods with generalized Jacobi polynomials on an interval ⋮ $hp$-Version Space-Time Discontinuous Galerkin Methods for Parabolic Problems on Prismatic Meshes ⋮ On the suboptimality of the \(p\)-version interior penalty discontinuous Galerkin method ⋮ Efficient Spectral and Spectral Element Methods for Eigenvalue Problems of Schrödinger Equations with an Inverse Square Potential ⋮ Bernstein-type constants for approximation of \(| x |^\alpha\) by partial Fourier-Legendre and Fourier-Chebyshev sums ⋮ hp‐Version finite elements for geometrically non‐linear problems ⋮ Stochastic Galerkin methods for time-dependent radiative transfer equations with uncertain coefficients ⋮ An adaptive wavelet method for nonlinear partial differential equations with applications to dynamic damage modeling ⋮ An $hp$-version Legendre-Jacobi spectral collocation method for Volterra integro-differential equations with smooth and weakly singular kernels ⋮ A posteriori error estimation of finite element approximations in fluid mechanics ⋮ Error estimates of spectral Legendre-Galerkin methods for the fourth-order equation in one dimension ⋮ A spectral collocation method for a weakly singular Volterra integral equation of the second kind ⋮ EVALUATION OF FLUX INTEGRAL OUTPUTS FOR THE REDUCED BASIS METHOD ⋮ Bernstein-Bézier based finite elements for efficient solution of short wave problems ⋮ An hp‐adaptive pseudospectral method for solving optimal control problems ⋮ How much faster does the best polynomial approximation converge than Legendre projection? ⋮ Modular hp-FEM system HERMES and its application to Maxwell's equations ⋮ Arbitrary-level hanging nodes and automatic adaptivity in the \(hp\)-FEM ⋮ LOCAL CHEBYSHEV PROJECTION–INTERPOLATION OPERATOR AND APPLICATION TO THE h–p VERSION OF THE FINITE ELEMENT METHOD IN THREE DIMENSIONS ⋮ On the exponent of exponential convergence of \(p\)-version FEM spaces ⋮ The \(p\)-version of the finite element method for the elliptic boundary value problems with interfaces ⋮ An improved a posteriori error estimate for the Galerkin spectral method in one dimension ⋮ ISOGEOMETRIC DIVERGENCE-CONFORMING B-SPLINES FOR THE DARCY–STOKES–BRINKMAN EQUATIONS ⋮ Parallel adaptive mesh refinement for first‐order system least squares ⋮ An \(hp\) symplectic pseudospectral method for nonlinear optimal control ⋮ An automatic node-adaptive scheme applied with a RBF-collocation meshless method ⋮ An adaptive mesh method for 1D hyperbolic conservation laws ⋮ A systematic strategy for simultaneous adaptive \(hp\) finite element mesh modification using nonlinear programming ⋮ The optimal rate of convergence of the \(p\)-version of the boundary element method in two dimensions ⋮ The optimal convergence of the \(h\)-\(p\) version of the boundary element method with quasiuniform meshes for elliptic problems on polygonal domains ⋮ Adaptive space-time finite element methods for the wave equation on unbounded domains ⋮ Error estimates for inconsistent load lumping approach in finite element solution of differential equations ⋮ \(hp\)-discontinuous Galerkin time stepping for parabolic problems ⋮ Spectral element method with geometric mesh for two-sided fractional differential equations ⋮ An explicit second order spectral element method for acoustic waves ⋮ On the accuracy ofp-version elements for the Reissner-Mindlin plate problem ⋮ Thehp finite element method for singularly perturbed problems in nonsmooth domains ⋮ Superconvergence of the \(h\)-\(p\) version of the finite element method in one dimension ⋮ Asymptotics of the generalized Gegenbauer functions of fractional degree ⋮ Regularity and hp discontinuous Galerkin finite element approximation of linear elliptic eigenvalue problems with singular potentials ⋮ A numerical study on Neumann-Neumann methods forhpapproximations on geometrically refined boundary layer meshes II. Three-dimensional problems ⋮ Optimal error estimates for Chebyshev approximations of functions with limited regularity in fractional Sobolev-type spaces ⋮ The multi-level \(hp\)-method for three-dimensional problems: dynamically changing high-order mesh refinement with arbitrary hanging nodes ⋮ The h, p and h-p versions of the finite element method in 1 dimension. II. The error analysis of the h- and h-p versions ⋮ The h, p and h-p versions of the finite element method in 1 dimension. III. The adaptive h-p version ⋮ Analysis and implementation issues for the numerical approximation of parabolic equations with random coefficients ⋮ A fully automatic \(hp\)-adaptivity for elliptic PDEs in three dimensions ⋮ A two-dimensional self-adaptivehpfinite element method for the characterization of waveguide discontinuities. I: Energy-norm based automatichp-adaptivity ⋮ Higher Order Global Differentiability Local Approximations for 2-D Distorted Quadrilateral Elements ⋮ The \(hp\)-mortar finite-element method for the mixed elasticity and Stokes problems ⋮ Data structures and load balancing for parallel adaptive \(hp\) finite-element methods ⋮ Convergence rate for a Radau hp collocation method applied to constrained optimal control ⋮ New numerical analysis method in computational mechanics: Composite element method ⋮ \(hp\) submeshing via non-conforming finite element methods ⋮ Unnamed Item ⋮ Basic principles of feedback and adaptive approaches in the finite element method ⋮ The \(hp\)-MITC finite element method for the Reissner-Mindlin plate problem ⋮ Optimal error estimates of a time-spectral method for fractional diffusion problems with low regularity data ⋮ Solving elliptic boundary value problems with uncertain coefficients by the finite element method: the stochastic formulation

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• The h-p version of the finite element method. I. The basic approximation results
• Error estimates for the combined h and p versions of the finite element method
• Approximation Results for Orthogonal Polynomials in Sobolev Spaces
• The Approximation Theory for thep-Version of the Finite Element Method
• Computation of sress field parameters in areas of steep stress gradients
• Thep-Version of the Finite Element Method
• The Approximation of Solutions of Elliptic Boundary-Value Problems via the p-Version of the Finite Element Method