Tucker Carrington, Richard Dawes, and Xiao-Gang Wang University of Montreal
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Transcript of Tucker Carrington, Richard Dawes, and Xiao-Gang Wang University of Montreal
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Tucker Carrington,Richard Dawes, and Xiao-Gang Wang
University of Montreal
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Two options:
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To go beyond four atoms we mustuse better basis sets
Two obvious strategies:
•(i) Contracted basis functions
•(ii) Pruned direct product basis sets
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Contracted basis functions
• Contracted basis functions are eigenfunctions of reduced-dimension Hamiltonians
• Key: coupling is included into the basis functions.
• Break coordinates into groups and solve sub-problems
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There are two types of contracted basis sets
(1) Adiabatic contracted functions
• Contract the bend basis for every DVR stretch point
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• Bacic, Light, Bowman (direct diagonalisation)• Friesner, Leforestier Carrington (Lanczos)
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(2) Simply contracted basis functions
Carter and Handy (direct diagonalisation)Carrington, Yu (Lanczos)
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Using contracted basis functions with an iterative methods is not simple:
• Contracted matrix-vector products may be more costly than direct-product matrix-vector products
• The most obvious way to do matrix-vector products for the coupling terms is
contracted vector product vector apply coupling contracted vector
which entails storing a large vector
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We solve the bend and stretch problems with the Lanczos algorithm (computing both eigenvalues and eigenvectors).
For our purposes simply contracted functions are better than adiabatic contracted functions because
• Matrix-vector products are less expensive
• There are far fewer reduced dimension eigenproblems to solve. To use adiabatic contracted functions for methane it would be necessary to solve the 5D bend problem thousands of times. Using simply contracted functions it is solved once. It would be impossible to store the adiabatic contracted bend functions.
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A good way to do the V matrix-vector product
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• The V matrix-vector product is
• It is best done in three steps
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Advantages of the simply-contracted basisLanczos combination
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For J=0 and J=1 basis size reduced by factor of 106
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Parts of the contracted-basis Lanczos approach are similar to
MCTDH
• Memory cost is reduced by storing matrices in the contracted bend basis (cf. storing the mean field matrices in MCTDH).
• Basis size is reduced by contraction (cf. “mode combination” in MCTDH)
• When we use PODVR for the stretches no DVR approximation is made for the 1-D separable parts (cf. CDVR)
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Two options:Prune a direct product basis:
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Nc Nr
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EFSD
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Another Hamiltonian
• Easily computable numerically exact energy levels
• Kinetic coupling
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1 a a a a a a 1 a a a a a a 1 a a a a a a 1 a a a a a a 1 a a a a a a 1
T=
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A good way to make Hamiltonians to test methods for solving the Schroedinger equation:
• Exact levels are known
• Bound states and not resonances
• Easy to choose coefficients to get a molecule-like potential
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8-D Results Basis type Basis size States to within 0.1
without/with perturbation theory States to within 1.0 (without perturbation theory)
EF 40’000 0/0 5360 SD 40’000 7/518 8135
16-D Results Basis type Basis size States to within 0.1
without/with perturbation theory States to within 1.0 (without perturbation theory)
EF 6’000 0 883 SD 6’000 1 1688 EF 10’000 0/0 1265 SD 10’000 1/17 1835
With 10’000 SD functions and with perturbation theory we get 13 levels to 0.01
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Advantages of SD basis functions
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