Virial theorem

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Virial theorem

In mechanics

Mechanics

Mechanics is the branch of physics concerned with the behaviour of physical body when subjected to forces or Displacement , and the subsequent effect of the bodies on their environment....
, the virial theorem provides a general equation relating the average over time of the total kinetic energy

Kinetic energy

The kinetic energy of an object is the extra energy which it possesses due to its motion. It is defined as the mechanical work needed to accelerate a body of a given mass from rest to its current velocity....
, , of a stable system, bound by potential forces, with that of the total potential energy, , where angle brackets represent the average over time of the enclosed quantity. Mathematically, the theorem

Theorem

In mathematics, a theorem is a statement Mathematical proof on the basis of previously accepted or established statements such as axioms.In formal mathematical logic, the concept of a theorem may be taken to mean a formula that can be formal proof according to the deductive system of a fixed formal system....
states

where F_k represents the force

Force

In physics, a force is that which can cause an object with mass to change its velocity. Force has both Euclidean_vector#Length of a vector and Direction , making it a Vector quantity....
on the kth particle, which is located at position r_k.

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Encyclopedia

In mechanics

Mechanics

Kinetic energy

Theorem

Force

Latin

Latin is an Italic language, historically spoken in Latium and Ancient Rome. Through the Military history of the Roman Empire, Latin spread throughout the Mediterranean and a large part of Europe....
word for "force" or "energy", and was given its technical definition by Clausius in 1870. Fritz Zwicky

Fritz Zwicky

Fritz Zwicky was a Bulgarian born, America-based Swiss astronomer. He was an original thinker, with many important contributions in theoretical and observational astronomy....
was the first to use the virial theorem to deduce the existence of unseen matter, what is now called dark matter

Dark matter

In astronomy and physical cosmology, dark matter is Hypothesis matter that is undetectable by its emitted electromagnetic radiation, but whose presence can be inferred from gravity effects on visible matter....
.

The significance of the virial theorem is that it allows the average total kinetic energy to be calculated even for very complicated systems that defy an exact solution, such as those considered in statistical mechanics

Statistical mechanics

Statistical mechanics is the application of probability theory, which includes Mathematics tools for dealing with large populations, to the field of mechanics, which is concerned with the motion of particles or objects when subjected to a force....
; this average total kinetic energy is related to the temperature

Temperature

Equipartition theorem

In classical physics statistical mechanics, the equipartition theorem is a general formula that relates the temperature of a system with its average energy....
. However, the virial theorem

Virial theorem

In mechanics, the virial theorem provides a general equation relating the average over time of the total kinetic energy, , of a stable system, bound by potential forces, with that of the total potential energy, , where angle brackets represent the average over time of the enclosed quantity....
does not depend on the notion of temperature

Temperature

In physics, temperature is a physical property of a Physical system that underlies the common notions of hot and cold; something that feels hotter generally has the greater temperature....
and holds even for systems that are not in thermal equilibrium. The virial theorem has been generalized in various ways, most notably to a tensor

Tensor

A tensor is an object which extends the notion of Scalar , Vector , and Matrix . The term has slightly different meanings in mathematics and physics....
form.

If the force between any two particles of the system results from a potential energy

Potential energy

Potential energy can be thought of as energy stored within a physical system. It is called potential energy because it has the potential to be converted into other forms of energy, such as kinetic energy, and to do Mechanical work in the process....
V(r) = arⁿ that is proportional to some power n of the inter-particle distance r, the virial theorem adopts a simple form

Thus, twice the average total kinetic energy equals n times the average total potential energy . Whereas V(r) represents the potential energy between two particles, V_TOT represents the total potential energy of the system, i.e., the sum of the potential energy V(r) over all pairs of particles in the system. A common example of such a system is a star held together by its own gravity, where n equals −1. As another example of its many applications, the virial theorem has been used to derive the Chandrasekhar limit

Chandrasekhar limit

The Chandrasekhar limit limits the mass of bodies made from electron-degenerate matter, a dense form of matter which consists of atomic nucleus immersed in a gas of electrons....
for the stability of white dwarf

White dwarf

A white dwarf, also called a degenerate dwarf, is a small star composed mostly of electron-degenerate matter. Because a white dwarf's mass is comparable to that of the Sun and its volume is comparable to that of the Earth, it is very density....
star

Star

A star is a massive, luminous ball of Plasma that is held together by its own gravity. The nearest star to Earth is the Sun, which is the source of most of the energy on Earth....
s.

Although the virial theorem depends on averaging the total kinetic and potential energies, the presentation here postpones the averaging to the last step.

Definitions of the virial and its time derivative

For a collection of N point particles, the scalar

Scalar (physics)

In physics, a scalar is a simple physical quantity that is not changed by coordinate system rotations or translations , or by Lorentz transformations or space-time translations ....
moment of inertia

Moment of inertia

Moment of inertia, also called mass moment of inertia or the angular mass, is a measure of an object's resistance to changes in its rotation rate....
I about the origin

Origin (mathematics)

In mathematics, the origin of a Euclidean space is a special Point , usually denoted by the letter O, used as a fixed point of reference for the geometry of the surrounding space....
is defined by the equation

where m_k and r_k represent the mass and position of the kth particle. The scalar virial G is defined by the equation

where p_k is the momentum

Momentum

In classical mechanics, momentum is the product of the mass and velocity of an object . For more accurate measures of momentum, see the section Momentum#Modern definitions of momentum on this page....
vector of the kth particle. Assuming that the masses are constant, the virial G is one-half the time derivative of this moment of inertia

In turn, the time derivative of the virial G can be written

or, more simply,

Here m_k is the mass of the kth particle, is the net force on that particle and T is the total kinetic energy

Kinetic energy

Connection with the potential energy between particles

The total force on particle k is the sum of all the forces from the other particles j in the system

where is the force applied by particle j on particle k. Hence, the force term of the virial time derivative can be written

Since no particle acts on itself (i.e., whenever ), we have

where we have assumed that Newton's third law of motion

Newton's laws of motion

Newton's laws of motion are three physical laws that form the basis for classical mechanics, Direct relationship the forces acting on a Physical body to the motion of the body....
holds, i.e., (equal and opposite reaction).

It often happens that the forces can be derived from a potential energy V that is a function only of the distance r_jk between the point particles j and k. Since the force is the negative gradient of the potential energy, we have in this case

which is clearly equal and opposite to , the force applied by particle on particle j, as may be confirmed by explicit calculation. Hence, the force term of the virial time derivative is

Thus, we have

Special case of power-law forces

In a common special case, the potential energy V between two particles is proportional to a power n of their distance r

where the coefficient a and the exponent n are constants. In such cases, the force term of the virial time derivative is given by the equation

where V_TOT} is the total potential energy of the system

Thus, we have

For gravitating systems and also for electrostatic systems

Electrostatics

Electrostatics is the branch of science that deals with the phenomena arising from stationary or slowly moving electric charges.Since classical antiquity it was known that some materials such as amber attract light particles after Triboelectric effect....
, the exponent n equals −1, giving Lagrange's identity

which was derived by Lagrange and extended by Jacobi.

Time averaging and the virial theorem

The average of this derivative over a time is defined as

from which we obtain the exact equation

The virial theorem states that, if , then

There are many reasons why the average of the time derivative might vanish, i.e., . One often-cited reason applies to stable bound systems, i.e., systems that hang together forever. In that case, the virial is usually bounded between two extremes, and , and the average goes to zero in the limit of very long times

Even if the average of the time derivative is only approximately zero, the virial theorem holds to the same degree of approximation.

For power-law forces with an exponent n, the general equation holds

For gravitational attraction

Gravitation

Gravitation is a natural phenomenon that gives weight to objects. In everyday life, attraction due to gravity is the result of the presence of relatively large bodies, such as the Earth and the Moon....
, n equals −1 and the average kinetic energy equals half of the average negative potential energy

This general result is useful for complex gravitating systems such as solar system

Solar System

The Solar System consists of the Sun and those Astronomical object bound to it by gravity: the eight planets and five dwarf planets, their 173 known Natural satellite, and billions of Small Solar System body....
s or galaxies

Galaxy

A galaxy is a massive, gravitation system that consists of stars and stellar remnants, an interstellar medium of gas and cosmic dust, and an important but poorly-understood component tentatively dubbed dark matter....
.

A simple application of the virial theorem concerns galaxy clusters. If a region of space is unusually full of galaxies, it is safe to assume that they have been together for a long time, and the virial theorem can be applied. Doppler measurements give lower bounds for their relative velocities, and the virial theorem gives a lower bound for the total mass of the cluster, including any dark matter.

The averaging need not be taken over time; an ensemble average

Ensemble average

In statistical mechanics, the ensemble average is defined as the mean of a quantity that is a function of the micro-state of a system , according to the distribution of the system on its micro-states in this statistical mechanics....
can also be taken, with equivalent results.

Although derived for classical mechanics, the virial theorem also holds for quantum mechanics (the quantum equivalent of the l.h.s. vanishes for energy eigenstates).

Generalizations of the virial theorem

Lord Rayleigh published a generalization of the virial theorem in 1903. Henri Poincaré

Henri Poincaré

Jules Henri Poincar? was a French mathematician and theoretical physicist, and a philosophy of science. Poincar? is often described as a polymath, and in mathematics as The Last Universalist, since he excelled in all fields of the discipline as it existed during his lifetime....
applied a form of the virial theorem in 1911 to the problem of determining cosmological stability. A variational form of the virial theorem was developed in 1945 by Ledoux. A tensor form of the virial theorem was developed by Parker, Chandrasekhar and Fermi. The following generalization of the virial theorem has been established by Pollard in 1964 for the case of the inverse square law

the statement is true if and only if

Inclusion of electromagnetic fields

The virial theorem can be extended to include electric and magnetic fields. The result is

where I is the moment of inertia

Moment of inertia

Moment of inertia, also called mass moment of inertia or the angular mass, is a measure of an object's resistance to changes in its rotation rate....
, G is the momentum density of the electromagnetic field

Poynting vector

In physics, the Poynting vector can be thought of as representing the energy flux of an electromagnetic field. It is named after its inventor John Henry Poynting....
, T is the kinetic energy

Kinetic energy

The kinetic energy of an object is the extra energy which it possesses due to its motion. It is defined as the mechanical work needed to accelerate a body of a given mass from rest to its current velocity....
of the "fluid", U is the random "thermal" energy of the particles, W^E and W^M are the electric and magnetic energy content of the volume considered. Finally, p_ik is the fluid-pressure tensor expressed in the local moving coordinate system

and T_ik is the electromagnetic stress tensor,

A plasmoid

Plasmoid

A plasmoid is a coherent structure of Plasma and magnetic fields. Plasmoids have been proposed to explain natural phenomena such as ball lightning, magnetic bubbles in the magnetosphere, and objects in cometary tails, in the solar wind, in the solar atmosphere, and in the heliospheric current sheet....
is a finite configuration of magnetic fields and plasma. With the virial theorem it is easy to see that any such configuration will expand if not contained by external forces. In a finite configuration without pressure-bearing walls or magnetic coils, the surface integral will vanish. Since all the other terms on the right hand side are positive, the acceleration of the moment of inertia will also be positive. It is also easy to estimate the expansion time t. If a total mass M is confined within a radius R, then the moment of inertia is roughly MR², and the left hand side of the virial theorem is MR²/t². The terms on the right hand side add up to about pR³, where p is the larger of the plasma pressure or the magnetic pressure. Equating these two terms and solving for t, we find

where c_s is the speed of the ion acoustic wave

Ion acoustic wave

An ion acoustic wave is a longitudinal wave oscillation of the ions much like acoustic waves traveling in neutral gas. However, because the waves propagate through positively charged ions, ion acoustic waves can interact with their electromagnetic fields, as well as simple collisions....
(or the Alfven wave

Alfvén wave

An Alfv?n wave, named after Hannes Alfv?n, is a type of Magnetohydrodynamics wave....
, if the magnetic pressure is higher than the plasma pressure). Thus the lifetime of a plasmoid is expected to be on the order of the acoustic (or Alfven) transit time.

Virial radius

In astronomy

Astronomy

Astronomy is the science of Astronomical object and Phenomenon that originate outside the Earth's atmosphere . It is concerned with the evolution, physics, chemistry, meteorology, and motion of celestial objects, as well as the physical cosmology....
, the term virial radius is used to refer to the radius of a sphere, centered on a galaxy

Galaxy

A galaxy is a massive, gravitation system that consists of stars and stellar remnants, an interstellar medium of gas and cosmic dust, and an important but poorly-understood component tentatively dubbed dark matter....
or a galaxy cluster, within which virial equilibrium holds. Since this radius is difficult to determine observationally, it is often approximated as the radius within which the average density is greater, by a specified factor, than the critical density . (Here, H is the Hubble parameter

Hubble's law

Hubble's law is the statement in physical cosmology that distant galaxy are receding from us at a velocity Proportionality to their distance from us....
and G is the gravitational constant

Gravitational constant

The gravitational constant, denoted G, is an empirical physical constant involved in the calculation of the gravitation between objects with mass....
.) A common choice for the factor is 200, in which case the virial radius is approximated as r₂₀₀.

Additional reading

External links

at MathPages

Virial theorem

Definitions of the virial and its time derivative

Connection with the potential energy between particles

Special case of power-law forces

Time averaging and the virial theorem

Generalizations of the virial theorem

Inclusion of electromagnetic fields

Virial radius

See also

Additional reading

External links