Digital Signal Processing Reference
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[163] Brandas, E., and Goscinski, O., Variationperturbation expansions
and Pade approximants to energy, Phys. Rev. A, 1, 552 - 560, 1970.
[164] Goscinski, O., and Brandas, E., Pade approximants to physical
properties via inner projections, Int. J. Quantum Chem., 5, 131 - 156,
1971.
[165] Brandas, E., and Bartlett, R.J., Reduced partitioning technique for
configuration interaction calculations using Pade approximants and
innerprojections, Chem. Phys. Lett., 8, 153 - 156, 1971.
[166] Micha, D.A., and Brandas, E., Variational methods in wave operator
formalism - unified treatment for bound and quasibound electronic
and molecular states, J. Chem. Phys., 55, 4792 - 4797, 1971.
[167] Brandas, E., and Micha, D.A., Variational methods in wave operator
formalism - applications in variationperturbation theory and theory
of energy bounds, J. Math. Phys., 13, 155 - 160, 1972.
[168] Bartlett, R.J., and Brandas, E., Reduced partitioning procedure in
configuration interaction studies: 1. Groundstates, J. Chem. Phys.,
56, 5467 - 5477, 1972.
[169] Brandas, E., and Goscinski, O., Darboux functions and power series
expansions with examples from isoelectronic sequences, Int. J.
Quantum Chem., 6, 59 -72, 1972.
[170] Bartlett, R.J., and Brandas, E., Reduced partitioning procedure in
configuration interaction studies: 2. Excited states, J. Chem. Phys.,
59, 2032 - 2042 , 1973.
[171] Baker, G.A., and Gammel, J.L., The Pade Approximant in Theoretical
Physics, Academic, New York, 1970.
[172] Baker, G.A., Essentials of the Pade Approximants, Academic, New
York, 1975.
[173] Baker, G.A., and GravesMorris, P., Pade Approximants Cambridge
University Press, 2nd edn, Cambridge, 1996.
[174] Longman, I.M., Computation of Pade table, Int. J. Comput. Math. B,
3, 53 - 64, 1971.
[175] Levin, D., Development of nonlinear transformations for improving
convergence of sequences, Int. J. Comput. Math., 3, 371 - 388, 1973.
[176] Belkic, Dz., New hybrid nonlinear transformations of divergent
perturbation series for quadratic Zeeman effects, J. Phys. A, 22, 3003
- 3010, 1989.
[177] Weniger, E.J., Nonlinear sequence transformations for the acceleration
of convergence and the summation of divergent series, Comput. Phys.
Rep., 10, 191 - 371, 1989.
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