Advanced Numerical Methods in Applied Sciences
Iavernaro, Felice||Brugnano, Luigi
Advanced Numerical Methods in Applied Sciences
English[eng]
structured matrices||numerical methods||time fractional differential equations||hierarchical splines||finite difference methods||null-space||highly oscillatory problems||stochastic Volterra integral equations||displacement rank||constrained Hamiltonian problems||hyperbolic partial differential equations||higher-order finite element methods||continuous geometric average||spectral (eigenvalue) and singular value distributions||generalized locally Toeplitz sequences||Volterra integro–differential equations||B-spline||discontinuous Galerkin methods||adaptive methods||Cholesky factorization||energy-conserving methods||order||collocation method||Poisson problems||time harmonic Maxwell’s equations and magnetostatic problems||tree||multistep methods||stochastic differential equations||optimal basis||finite difference method||elementary differential||gradient system||curl–curl operator||conservative problems||line integral methods||stochastic multistep methods||Hamiltonian Boundary Value Methods||limited memory||boundary element method||convergence||analytical solution||preconditioners||asymptotic stability||collocation methods||histogram specification||local refinement||Runge–Kutta||edge-preserving smoothing||numerical analysis||THB-splines||BS methods||barrier options||stump||shock waves and discontinuities||mean-square stability||Volterra integral equations||high order discontinuous Galerkin finite element schemes||B-splines||vectorization and parallelization||initial value problems||one-step methods||scientific computing||fractional derivative||linear systems||Hamiltonian problems||low rank completion||ordinary differential equations||mixed-index problems||edge-histogram||Hamiltonian PDEs||matrix ODEs||HBVMs||floating strike Asian options||Hermite–Obreshkov methods||generalized Schur algorithm||Galerkin method||symplecticity||high performance computing||isogeometric analysis||discretization of systems of differential equations
Advanced Numerical Methods in Applied Sciences
English[eng]
structured matrices||numerical methods||time fractional differential equations||hierarchical splines||finite difference methods||null-space||highly oscillatory problems||stochastic Volterra integral equations||displacement rank||constrained Hamiltonian problems||hyperbolic partial differential equations||higher-order finite element methods||continuous geometric average||spectral (eigenvalue) and singular value distributions||generalized locally Toeplitz sequences||Volterra integro–differential equations||B-spline||discontinuous Galerkin methods||adaptive methods||Cholesky factorization||energy-conserving methods||order||collocation method||Poisson problems||time harmonic Maxwell’s equations and magnetostatic problems||tree||multistep methods||stochastic differential equations||optimal basis||finite difference method||elementary differential||gradient system||curl–curl operator||conservative problems||line integral methods||stochastic multistep methods||Hamiltonian Boundary Value Methods||limited memory||boundary element method||convergence||analytical solution||preconditioners||asymptotic stability||collocation methods||histogram specification||local refinement||Runge–Kutta||edge-preserving smoothing||numerical analysis||THB-splines||BS methods||barrier options||stump||shock waves and discontinuities||mean-square stability||Volterra integral equations||high order discontinuous Galerkin finite element schemes||B-splines||vectorization and parallelization||initial value problems||one-step methods||scientific computing||fractional derivative||linear systems||Hamiltonian problems||low rank completion||ordinary differential equations||mixed-index problems||edge-histogram||Hamiltonian PDEs||matrix ODEs||HBVMs||floating strike Asian options||Hermite–Obreshkov methods||generalized Schur algorithm||Galerkin method||symplecticity||high performance computing||isogeometric analysis||discretization of systems of differential equations