17. Problem Decomposition Techniques in Quantum Mechanical Reactive Scattering

David W. Schwenke; Donald G Truhlar

doi:10.1137/1.9781611971507.ch17

Abstract

1 min read

In this chapter we discuss strategies for efficiently solving quantum mechanical reactive and inelastic scattering problems using algebraic variational methods. First we review the outgoing wave variational principle. Then we review three aspects of its implementation where problem decomposition techniques are used to make the calculations efficient. The first of these involves partitioning the Hamiltonian into a distortion part that is solved numerically and a coupling part that is treated by expanding the difference of the full outgoing wave and the distortion-potential-induced part of the outgoing wave in a basis. The second involves problem decomposition in channel space or physical space in order to obtain efficient basis functions for the fully coupled problem. In this section we also propose a new pre-diagonalization technique that may be used as the basis of a divide-and-conquer approach. Finally, we consider schemes for partitioning basis functions into Hilbert subspaces as direct analogs of domain decomposition in physical subspaces.

17. Problem Decomposition Techniques in Quantum Mechanical Reactive Scattering

Abstract

Discussion(0)

Related publications

Preconditioned complex generalized minimal residual algorithm for dense algebraic variational equations in quantum reactive scattering

Improved techniques for outgoing wave variational principle calculations of converged state-to-state transition probabilities for chemical reactions

Dynamical basis sets for algebraic variational calculations in quantum-mechanical scattering theory

Complex generalized minimal residual algorithm for iterative solution of quantum-mechanical reactive scattering equations

Contracted basis functions for variational solutions of quantum mechanical reactive scattering problems

Related publications

Article1993
Preconditioned complex generalized minimal residual algorithm for dense algebraic variational equations in quantum reactive scattering
Article1993

Article1991
Improved techniques for outgoing wave variational principle calculations of converged state-to-state transition probabilities for chemical reactions
Article1991

Article1990
Dynamical basis sets for algebraic variational calculations in quantum-mechanical scattering theory
Article1990

Article1992
Complex generalized minimal residual algorithm for iterative solution of quantum-mechanical reactive scattering equations
Article1992

Article1990
Contracted basis functions for variational solutions of quantum mechanical reactive scattering problems
Article1990