Madelung constant

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Madelung constant

The Madelung constant is used in determining the energy

Energy

In physics, energy is a scalar physical quantity that describes the amount of Work_ that can be performed by a force. Energy is an attribute of objects and systems that is subject to a conservation law....
of a single ion

Ion

An ion is an atom or molecule which has lost or gained one or more electrons, giving it a positive or negative electrical charge. According to the Bohr_model this will be from or in the outer shield 'n'....
in a crystal

Crystal

A crystal or crystalline solid is a solid material whose constituent atoms, molecules, or ions are arranged in an orderly repeating pattern extending in all three spatial dimensions....
. It is named after Erwin Madelung

Erwin Madelung

Erwin Madelung was a Germany physicist. He was born in 1881 in Frankfurt/Main. His father was the surgeon Otto Wilhelm Madelung.He earned a doctorate in 1905 from the University of Goettingen, specializing in crystal structure, and eventually became a professor....
, a German physicist.

Because the anions and cations in an ionic solid

Ionic compound

In chemistry, an ionic compound is a chemical compound in which ions are held together in a lattice structure by ionic bonds. Usually, the positively charged portion consists of metal cations and the negatively charged portion is an anion or polyatomic ion....
are attracted to each other by virtue of their opposing charges, separating the ions requires a certain amount of energy. This energy must be given to the system in order to break the anion-cation bonds. The energy required to break these bonds for one mole of an ionic solid under standard conditions is the lattice energy

Lattice energy

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The Madelung constant is used in determining the energy

Energy

Ion

Crystal

Erwin Madelung

Ionic compound

Lattice energy

The lattice energy of an Ionic bond solid is a measure of the strength of bonds in that ionic compound. It is usually defined as the enthalpy of formation of the ionic compound from gaseous ions and as such is invariably exothermic....
.

The lattice energy describes the amount of energy for a whole crystal but it doesn't describe the energy contribution of a single ion in the crystal. The energy of a specific ion would depend on how close it was to other ions, how many had the same charge, and how many had the opposite charge.

Since charges in ions are based on the electric energy of an electron

Electron

The electron is a subatomic particle that carries a negative electric charge. It has elementary particle and is believed to be a point particle....
, we can use the energy of the electron and then modify it to see how close the other electrons are.

where = charge of ions = 1.6022 C

Coulomb

The coulomb is the SI unit of electric charge. It is named after Charles-Augustin de Coulomb....
= 1.112 C²/(J m) = Madelung's constant, which is representative of the distance of the ions from one another in a specific type of crystal.

The Madelung's constant depends on the geometric arrangement of the constituent ions in the crystal structure.

where = distance to closest ion.

For example, for the ionic crystal NaCl

Sodium chloride

Sodium chloride, also known as common salt, table salt, or halite, is a chemical compound with the chemical formula SodiumChlorine....
:

,

the prime indicating that the term is to be left out. Since this sum is conditionally convergent it is not suitable as definition of Madelung's constant unless the order of summation is also specified. There are two "obvious" methods of summing this series, by expanding cubes or expanding spheres. The latter, though devoid of a meaningful physical interpretation (there are no spherical crystals) is rather popular because of its simplicity. Thus, the following expansion is often found in the literature:

However, this is wrong as this series diverges as was shown by Emersleben in 1951. The summation over expanding cubes converges to the correct value. An unambiguous mathematical definition is given by Borwein

David Borwein

David Borwein is a Canada mathematics of Ashkenazi Jewish ancestry, known for his research in the summability theory of series and integrals. He has also done work in measure theory and probability theory, number theory, and approximate subgradients and coderivatives....
, Borwein

Jonathan Borwein

Jonathan Michael Borwein is a Canada mathematics noted for his prolific and creative work throughout the international mathematical community. He is a close associate of David H....
and Taylor by means of analytic continuation

Analytic continuation

In complex analysis, a branch of mathematics, analytic continuation is a technique to extend the domain of definition of a given analytic function....
of an absolutely convergent series.

There are many practical methods for calculating Madelung's constant using either direct summation (for example, the Evjen method) or integral transform

Integral transform

In mathematics, an integral transform is any list of transforms T of the following form:The input of this transform is a function f, and the output is another function TF....
s, which are used in the Ewald method

Ewald summation

Ewald summation, named after Paul Peter Ewald, is a method for computing the interaction energies of periodic systems , particularly electrostatic energies....
.

Madelung constant

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