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Homepage of Mike Espig
Theses (2)
Diploma
Approximation von Resolventen des Laplace-Operators mit Hilfe hierarchischer Matrizen (Dipl. Math.)
Doctoral Thesis
Effiziente Bestapproximation mittels Summen von Elementartensoren in hohen Dimensionen (Dr. rer. nat.)
Hierarchical Matrix (1)
On the Robustness of Elliptic Resolvents Computed by means of the Technique of Hierarchical Matrices
Tensor Approximation and Decomposition (9)
Black Box Low Tensor Rank Approximation using Fibre-Crosses
Variational Calculus with Sums of Elementary Tensors of Fixed Rank
A Regularized Newton method for the Efficient Approximation of Tensors Represented in the Canonical Tensor Format
Efficient Analysis of High Dimensional Data in Tensor Formats
Optimisation Problems in Contracted Tensor Networks
A note on approximation in Tensor Chain format
Efficient low-rank approximation of the stochastic Galerkin matrix in tensor formats
Convergence of Alternating Least Squares Optimisation for Rank-One Approximation to High Order Tensors
On the Convergence of Alternating Least Squares Optimisation in Tensor Format Representations
Chemistry (6)
Related to the Hartree Fock Method (3)
Tensor product approximation with optimal rank in quantum chemistry
Canonical tensor products as a generalization of Gaussian-type orbitals
Mesh-Free Canonical Tensor Products for Six-Dimensional Density Matrix: Computation of Kinetic Energy
Related to the Coupled Cluster Method (2)
Tensor Decomposition in post-Hartree Fock Methods
Tensor Representation Techniques in post-Hartree Fock Methods: Matrix Product State Tensor Format
Related to Full Configuration Interaction (1)
Tensor Representation Techniques for Full Configuration Interaction: A Fock Space Approach Using the Canonical Product Format
Copyright © 2012 by "Mike Espig" • All Rights reserved •
E-Mail:
mike.espig@alopax.de