torsion angle

A dihedral angle is the angle between two intersecting planes or half-planes. In chemistry, it is the clockwise angle between half-planes through two sets of three atoms, having two atoms in common. In solid geometry, it is defined as the union of a line and two half-planes that have this line as a common edge. In higher dimensions, a dihedral angle represents the angle between two hyperplanes.
The planes of a flying machine are said to be at positive dihedral angle when both starboard and port main planes (commonly called wings) are upwardly inclined to the lateral axis. When downwardly inclined they are said to be at a negative dihedral angle.

Mathematical background

When the two intersecting planes are described in terms of Cartesian coordinates by the two equations
:$a_1 x + b_1 y + c_1 z + d_1 = 0$
:$a_2 x + b_2 y + c_2 z + d_2 = 0$
the dihedral angle, $\varphi$ between them is given by:
:$\cos \varphi = \frac$
and satisfies $0\le \varphi \le \pi/2.$

Alternatively, if and are normal vector to the planes, one has
:$\cos \varphi = \frac$
where is the dot product of the vectors and is the product of their lengths.

The absolute value is required in above formulas, as the planes are not changed when changing all coefficient signs in one equation, or replacing one normal vector by its opposite.

However the absolute values can be and should be avoided when considering the dihedral angle of two half planes whose boundaries are the same line. In this case, the half planes can be described by a point of their intersection, and three vectors , and such that , and belong respectively to the intersection line, the first half plane, and the second half plane. The ''dihedral angle of these two half planes'' is defined by
:$\cos\varphi = \frac$,
and satisfies $0\le\varphi <\pi.$ In this case, switching the two half-planes gives the same result, and so does replacing $\mathbf b_0$ with $-\mathbf b_0.$ In chemistry (see below), we define a dihedral angle such that replacing $\mathbf b_0$ with $-\mathbf b_0$ changes the sign of the angle, which can be between and .

In polymer physics

In some scientific areas such as polymer physics, one may consider a chain of points and links between consecutive points. If the points are sequentially numbered and located at positions , , , etc. then bond vectors are defined by =−, =−, and =−, more generally. This is the case for kinematic chains or amino acids in a protein structure. In these cases, one is often interested in the half-planes defined by three consecutive points, and the dihedral angle between two consecutive such half-planes. If , and are three consecutive bond vectors, the intersection of the half-planes is oriented, which allows defining a dihedral angle that belongs to the interval . This dihedral angle is defined by
:$\begin \cos \varphi&=\frac\\ \sin \varphi&=\frac, \end$
or, using the function atan2,
:$\varphi=\operatorname(\mathbf_2 \cdot((\mathbf_1 \times \mathbf_2) \times (\mathbf_2 \times \mathbf_3)), , \mathbf_2, \,(\mathbf_1 \times \mathbf_2) \cdot (\mathbf_2 \times \mathbf_3)).$

This dihedral angle does not depend on the orientation of the chain (order in which the point are considered) — reversing this ordering consists of replacing each vector by its opposite vector, and exchanging the indices 1 and 3. Both operations do not change the cosine, but change the sign of the sine. Thus, together, they do not change the angle.

A simpler formula for the same dihedral angle is the following (the proof is given below)
:$\begin \cos \varphi&=\frac\\ \sin \varphi&=\frac, \end$
or equivalently,
:$\varphi=\operatorname( , \mathbf_2, \,\mathbf_1 \cdot(\mathbf_2 \times \mathbf_3) , (\mathbf_1 \times \mathbf_2) \cdot (\mathbf_2 \times \mathbf_3)).$

This can be deduced from previous formulas by using the vector quadruple product formula, and the fact that a scalar triple product is zero if it contains twice the same vector:
:
(\mathbf_1\times\mathbf_2)\times(\mathbf_2\times\mathbf_3) = \mathbf_2\times\mathbf_3)\cdot\mathbf_1mathbf_2 - \mathbf_2\times\mathbf_3)\cdot\mathbf_2mathbf_1
= \mathbf_2\times\mathbf_3)\cdot\mathbf_1mathbf_2

Given the definition of the cross product, this means that $\varphi$ is the angle in the clockwise direction of the fourth atom compared to the first atom, while looking down the axis from the second atom to the third. Special cases (one may say the usual cases) are $\varphi = \pi$, $\varphi = +\pi/3$ and $\varphi = -\pi/3$, which are called the ''trans'', ''gauche⁺'', and ''gauche⁻'' conformations.

In stereochemistry

In stereochemistry, a torsion angle is defined as a particular example of a dihedral angle, describing the geometric relation of two parts of a molecule joined by a chemical bond. Every set of three non-colinear atoms of a molecule defines a half-plane. As explained above, when two such half-planes intersect (i.e., a set of four consecutively-bonded atoms), the angle between them is a dihedral angle. Dihedral angles are used to specify the molecular conformation. Stereochemical arrangements corresponding to angles between 0° and ±90° are called ''syn'' (s), those corresponding to angles between ±90° and 180° ''anti'' (a). Similarly, arrangements corresponding to angles between 30° and 150° or between −30° and −150° are called ''clinal'' (c) and those between 0° and ±30° or ±150° and 180° are called ''periplanar'' (p).

The two types of terms can be combined so as to define four ranges of angle; 0° to ±30° synperiplanar (sp); 30° to 90° and −30° to −90° synclinal (sc); 90° to 150° and −90° to −150° anticlinal (ac); ±150° to 180° antiperiplanar (ap). The synperiplanar conformation is also known as the ''syn''- or ''cis''-conformation; antiperiplanar as ''anti'' or ''trans''; and synclinal as ''gauche'' or ''skew''.

For example, with ''n''-butane two planes can be specified in terms of the two central carbon atoms and either of the methyl carbon atoms. The ''syn''-conformation shown above, with a dihedral angle of 60° is less stable than the ''anti''-conformation with a dihedral angle of 180°.

For macromolecular usage the symbols T, C, G⁺, G⁻, A⁺ and A⁻ are recommended (ap, sp, +sc, −sc, +ac and −ac respectively).

Proteins

A Ramachandran plot (also known as a Ramachandran diagram or a 'φ'',''ψ''plot), originally developed in 1963 by G. N. Ramachandran, C. Ramakrishnan, and V. Sasisekharan, is a way to visualize energetically allowed regions for backbone dihedral angles ''ψ'' against ''φ'' of amino acid residues in protein structure.
In a protein chain three dihedral angles are defined:
* ω (omega) is the angle in the chain C^α − C' − N − C^α,
* φ (phi) is the angle in the chain C' − N − C^α − C'
* ψ (psi) is the angle in the chain N − C^α − C' − N (called ''φ′'' by Ramachandran)

The figure at right illustrates the location of each of these angles (but it does not show correctly the way they are defined).

The planarity of the peptide bond usually restricts ''ω'' to be 180° (the typical ''trans'' case) or 0° (the rare '' cis'' case). The distance between the C^α atoms in the ''trans'' and ''cis'' isomers is approximately 3.8 and 2.9 Å, respectively. The vast majority of the peptide bonds in proteins are ''trans'', though the peptide bond to the nitrogen of proline has an increased prevalence of ''cis'' compared to other amino-acid pairs.

The side chain dihedral angles are designated with ''χ_n'' (chi-''n''). They tend to cluster near 180°, 60°, and −60°, which are called the ''trans'', ''gauche⁻'', and ''gauche⁺'' conformations. The stability of certain sidechain dihedral angles is affected by the values ''φ'' and ''ψ''. For instance, there are direct steric interactions between the C''γ'' of the side chain in the ''gauche⁺'' rotamer and the backbone nitrogen of the next residue when ''ψ'' is near -60°. This is evident from statistical distributions in backbone-dependent rotamer libraries.

Converting from dihedral angles to Cartesian coordinates in chains

It is common to represent polymers backbones, notably proteins, in internal coordinates; that is, a list of consecutive dihedral angles and bond lengths. However, some types of computational chemistry instead use cartesian coordinates. In computational structure optimization, some programs need to flip back and forth between these representations during their iterations. This task can dominate the calculation time. For processes with many iterations or with long chains, it can also introduce cumulative numerical inaccuracy. While all conversion algorithms produce mathematically identical results, they differ in speed and numerical accuracy.

Geometry

Every polyhedron has a dihedral angle at every edge describing the relationship of the two faces that share that edge. This dihedral angle, also called the ''face angle'', is measured as the internal angle with respect to the polyhedron. An angle of 0° means the face normal vectors are antiparallel and the faces overlap each other, which implies that it is part of a degenerate polyhedron. An angle of 180° means the faces are parallel, as in a tiling. An angle greater than 180° exists on concave portions of a polyhedron.

Every dihedral angle in an edge-transitive polyhedron has the same value. This includes the 5 Platonic solids, the 13 Catalan solids, the 4 Kepler–Poinsot polyhedra, the two quasiregular solids, and two quasiregular dual solids.

Given 3 faces of a polyhedron which meet at a common vertex P and have edges AP, BP and CP, the cosine of the dihedral angle between the faces containing APC and BPC is:

:$\cos\varphi = \frac$

See also

*Atropisomer

References

{{Reflist

External links

The Dihedral Angle in Woodworking at Tips.FM


gives a step-by-step derivation of these exact values.

Stereochemistry
Protein structure
Euclidean solid geometry
Angle