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Extended Huckel

An extended Huckel calculation is a simple means for modeling the valence orbitals based on the orbital overlaps and experimental electron affinities and ionization potentials. In some of the physics literature, this is referred to as a tight binding calculation. Orbital overlaps can be obtained from a simplified single STO representation based on the atomic radius. The advantage of extended Huckel calculations over Huckel calculations is that they model all the valence orbitals. [Pg.33]

The primary reason for interest in extended Huckel today is because the method is general enough to use for all the elements in the periodic table. This is not an extremely accurate or sophisticated method however, it is still used for inorganic modeling due to the scarcity of full periodic table methods with reasonable CPU time requirements. Another current use is for computing band structures, which are extremely computation-intensive calculations. Because of this, extended Huckel is often the method of choice for band structure calculations. It is also a very convenient way to view orbital symmetry. It is known to be fairly poor at predicting molecular geometries. [Pg.33]

The Pariser Parr Pople (PPP) method is an extension of the Huckel method that allows heteroatoms other than hydrogen. It is still occasionally used when [Pg.33]


As mentioned above, HMO theory is not used much any more except to illustrate the principles involved in MO theory. However, a variation of HMO theory, extended Huckel theory (EHT), was introduced by Roald Hof nann in 1963 [10]. EHT is a one-electron theory just Hke HMO theory. It is, however, three-dimensional. The AOs used now correspond to a minimal basis set (the minimum number of AOs necessary to accommodate the electrons of the neutral atom and retain spherical symmetry) for the valence shell of the element. This means, for instance, for carbon a 2s-, and three 2p-orbitals (2p, 2p, 2p ). Because EHT deals with three-dimensional structures, we need better approximations for the Huckel matrix than... [Pg.379]

Hoffman s extended Huckel theory, EHT (Hoffman, 1963), includes all bonding orbitals in the secular matrix rather than just all n bonding orbitals. This inclusion increases the complexity of the calculations so that they are not practical without a computer. The basis set is a linear combination that includes only valence orbitals... [Pg.221]

Molecular mechanics and semiempirical calculations are all relativistic to the extent that they are parameterized from experimental data, which of course include relativistic effects. There have been some relativistic versions of PM3, CNDO, INDO, and extended Huckel theory. These relativistic semiempirical calculations are usually parameterized from relativistic ah initio results. [Pg.263]

TheHiickel constant (k) scales the interaction energy between two atomic orbitals (see Extended Huckel Method on page 125). HyperChem uses the default value of 1.75 (see the second part of this book. Theory and Methods). You should use this value for most cases. A suggested range for experimental adjustment of this constant is 1.6-2.0. ... [Pg.117]

Extended Huckel is the simplest and fastest semi-empirical method included in HyperChem, but it is also the least accurate. It is particularly simple in its treatment of electron-electron interactions it has no explicit treatment of these interactions, although it may include some of their effects by parameterization. [Pg.125]

Extended Huckel provides the approximate shape and energy ordering of molecular orbitals. It also yields the approximate form of an electron density map. This is the only requirement for many qualitative applications of quantum mechanics calculations, such as Frontier Orbital estimates of chemical reactivity (see Frontier Molecular Orbitals on page 141). [Pg.125]

A key part to an extended Huckel treatment is the calculation of overlap integrals. You might like to read the classic work ... [Pg.131]

More sophisticated procedures involve taking the start MO coefficients from a semi-empirical calculation, such as Extended HUckel Theory (EHT) or Intermediate Neglect of Differential Overlap (INDO) (Sections 3.12 and 3.9). The EHT method has the advantage that it is readily parameterized for all elements, and it can provide start orbitals for systems involving elements from essentially the whole periodic table. An INDO calculation normally provides better start orbitals, but at a price. The INDO... [Pg.76]

The Huckel methods perform the parameterization on the Fock matrix elements (eqs. (3.50) and (3.51)), and not at the integral level as do NDDO/INDO/CNDO. This means that Huckel methods are non-iterative, they only require a single diagonalization of the Fock (Huckel) matrix. The Extended Huckel Theory (EHT) or Method (EHM), developed primarily by Hoffmann again only considers the valence electrons. It makes use of Koopmans theorem (eq. (3.46)) and assigns the diagonal elements in the F... [Pg.92]

AuCN has a similar structure to AgCN and likewise dissolves in excess cyanide to form Au(CN)J this is important in the extraction of gold. It has been characterized as various salts (Tl, K, Bu4N, Cs) with Au-C 1.964A (Bu4N salt [91]). The thallium salt has short Au-Au (3.10A) and Au-Tl (3.50 A) interactions extended-Huckel calculations indicate the importance of relativistic effects in these covalent interactions. Isocyanides form stable complexes ... [Pg.296]

MD simulations have been used for water at Pt(100) and (111 ),880-882 as well as at Ag(l 11 ).883 The stmcture of water is predicted to conform to a hexagonal pattern and the metal-water interaction is probably stronger for the (111) than the (100) surface.882 On the basis of the extended Huckel theory, Estiu et a/.884,885 have reached different conclusions in favor of the... [Pg.172]

These arguments go hand in hand with Extended Huckel Theory (EHT), both being based on overlap (symmetry) considerations. In fact, an EHT calculation will provide almost exactly the same results as a skilful use of the qualitative MO building scheme we have provided in this section. [Pg.8]

Simonetta, M., Gavezzotti, A. Extended Huckel Investigation of Reaction Mechanisms. Vol. 27, pp. 1-43. [Pg.196]

The conformational properties of various 1,1 -diheteroferrocenes (7-10) have been the subject of three computational studies using extended Huckel methods.19,46 471,1 -Diphosphaferrocene has also been studied using the Fenske-Hall approach.48 and an MS Xa method.46 Where they overlap, the four treatments are in reasonable qualitative agreement. [Pg.341]

Other approximate, more empirical methods are the extended Huckel 31> and hybrid-based Hiickel 32. 3> approaches. In these methods the electron repulsion is not taken into account explicitly. These are extensions of the early Huckel molecular orbitals 4> which have successfully been used in the n electron system of planar molecules. On account of the simplest feature of calculation, the Hiickel method has made possible the first quantum mechanical interpretation of the classical electronic theory of organic chemistry and has given a reasonable explanation for the chemical reactivity of sizable conjugated molecules. [Pg.10]

CNDO/2 and extended Huckel calculations 74> of 13 (X = S) revealed a small difference in energy between the planar and nonplanar structure, both with bond alternation. These results can be translated into the valence bond structure corresponding to a cyclic thioether. [Pg.66]

Fig. 10. Schemes of MO s for technetium compounds according to the results of extended Huckel calculations [58]... Fig. 10. Schemes of MO s for technetium compounds according to the results of extended Huckel calculations [58]...

See other pages where Extended Huckel is mentioned: [Pg.219]    [Pg.221]    [Pg.223]    [Pg.33]    [Pg.325]    [Pg.325]    [Pg.117]    [Pg.125]    [Pg.816]    [Pg.129]    [Pg.131]    [Pg.92]    [Pg.93]    [Pg.54]    [Pg.298]    [Pg.304]    [Pg.13]    [Pg.9]    [Pg.13]    [Pg.59]    [Pg.467]    [Pg.360]    [Pg.88]    [Pg.470]   
See also in sourсe #XX -- [ Pg.33 ]

See also in sourсe #XX -- [ Pg.385 , Pg.390 , Pg.414 ]

See also in sourсe #XX -- [ Pg.129 ]

See also in sourсe #XX -- [ Pg.33 ]




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Alkali extended Huckel

Bonding extended Huckel calculations

Debye-Huckel theory extended form

Debye-Huckel, extended theory

EHMO (Extended Huckel Molecular

Energy extended Huckel

Energy levels extended Huckel calculations

Extended Debye-Huckel equation

Extended Debye-Huckel law

Extended Huckel (EH)

Extended Huckel Schemes

Extended Huckel Theory and

Extended Huckel Theory—Hoffmans EHT Method

Extended Huckel Theory—Whelands Method

Extended Huckel approximation

Extended Huckel band structure

Extended Huckel calculation, illustration

Extended Huckel method

Extended Huckel method applications

Extended Huckel method band calculations

Extended Huckel method hamiltonian matrix

Extended Huckel method overlap matrix

Extended Huckel method strengths

Extended Huckel method total energy

Extended Huckel method, description

Extended Huckel molecular orbital

Extended Huckel molecular orbital EHMO)

Extended Huckel molecular orbital calculations, transition metal

Extended Huckel theory

Extended Huckel theory method

Fock matrix extended Huckel method

Huckel

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Huckel molecular orbital analysis, extended

Huckel molecular orbital calculations, extended

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Iterative Extended Huckel

Iterative extended Huckel theory

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Semiempirical Extended Huckel

Total extended Huckel energy

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