Return to home page
Searching: Muskingum library catalog
We are currently experiencing delivery delays for items requested from other institutions while transitioning to a new statewide delivery service. Please contact your library with questions or advice about alternative resources. Thank you for your patience!
  Previous Record Previous Item Next Item Next Record
  Reviews, Summaries, etc...
Author Khoromskaia, Venera,
Title Tensor numerical methods in quantum chemistry / Venera Khoromskaia, Boris N. Khoromskij.
Imprint Berlin ; Boston : De Gruyter, [2018]

Author Khoromskaia, Venera,
Subject Calculus of tensors.
Tensor algebra.
Quantum chemistry.
Alt Name Khoromskij, Boris N.,
Description 1 online resource (297 pages)
Contents Frontmatter -- Contents -- 1. Introduction -- 2. Rank-structured formats for multidimensional tensors -- 3. Rank-structured grid-based representations of functions in ℝd -- 4. Multiplicative tensor formats in ℝd -- 5. Multidimensional tensor-product convolution -- 6. Tensor decomposition for analytic potentials -- 7. The Hartree-Fock equation -- 8. Multilevel grid-based tensor-structured HF solver -- 9. Grid-based core Hamiltonian -- 10. Tensor factorization of grid-based two-electron integrals -- 11. Fast grid-based Hartree-Fock solver by factorized TEI -- 12. Calculation of excitation energies of molecules -- 13. Density of states for a class of rank-structured matrices -- 14. Tensor-based summation of long-range potentials on finite 3D lattices -- 15. Range-separated tensor format for many-particle systems -- Bibliography -- Index
Note In English.
Online resource; title from PDF title page (publisher's Web site, viewed 22. Jun 2018).
Summary The conventional numerical methods when applied to multidimensional problems suffer from the so-called "curse of dimensionality", that cannot be eliminated by using parallel architectures and high performance computing. The novel tensor numerical methods are based on a "smart" rank-structured tensor representation of the multivariate functions and operators discretized on Cartesian grids thus reducing solution of the multidimensional integral-differential equations to 1D calculations. We explain basic tensor formats and algorithms and show how the orthogonal Tucker tensor decomposition originating from chemometrics made a revolution in numerical analysis, relying on rigorous results from approximation theory. Benefits of tensor approach are demonstrated in ab-initio electronic structure calculations. Computation of the 3D convolution integrals for functions with multiple singularities is replaced by a sequence of 1D operations, thus enabling accurate MATLAB calculations on a laptop using 3D uniform tensor grids of the size up to 1015. Fast tensor-based Hartree-Fock solver, incorporating the grid-based low-rank factorization of the two-electron integrals, serves as a prerequisite for economical calculation of the excitation energies of molecules. Tensor approach suggests efficient grid-based numerical treatment of the long-range electrostatic potentials on large 3D finite lattices with defects. The novel range-separated tensor format applies to interaction potentials of multi-particle systems of general type opening the new prospects for tensor methods in scientific computing. This research monograph presenting the modern tensor techniques applied to problems in quantum chemistry may be interesting for a wide audience of students and scientists working in computational chemistry, material science and scientific computing.
Bibliography Note Includes bibliographical references (pages 271-285) and index.
Access Access limited to University of Wyoming-affiliated patrons.
ISBN 9783110365832 (electronic bk.)
3110365839 (electronic bk.)
9783110370157 (hbk.)
3110370158 (hbk.)
9783110391374 (EPUB)
9783110365849 (print + online)
ISBN/ISSN 10.1515/9783110365832
OCLC # 1041994386
Additional Format Print version: 9783110391374
Print version: 9783110370157

If you experience difficulty accessing or navigating this content, please contact the OPAL Support Team