Length scale: Difference between revisions
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{{Short description|Particular length or distance determined with the precision of a few orders of magnitude}} |
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{{References needed|date=September 2020}} |
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⚫ | In [[physics]], '''length scale''' is a particular [[length]] or [[distance]] determined with the precision of |
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⚫ | In [[physics]], '''length scale''' is a particular [[length]] or [[distance]] determined with the precision of at most a few [[orders of magnitude]]. The concept of length scale is particularly important because physical phenomena of different length scales cannot affect each other{{citation needed|date=March 2016}}{{clarify|date=May 2016}} and are said to [[coupling (physics)|decouple]]. The decoupling of different length scales makes it possible to have a self-consistent theory that only describes the relevant length scales for a given problem. [[Scientific reductionism]] says that the physical laws on the shortest length scales can be used to derive the effective description at larger length scales. |
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The idea that one can derive descriptions of physics at different length scales from one another can be quantified with the [[renormalization group]]. |
The idea that one can derive descriptions of physics at different length scales from one another can be quantified with the [[renormalization group]]. |
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In [[quantum mechanics]] the length scale of a given phenomenon is related to its [[de Broglie wavelength]] |
In [[quantum mechanics]] the length scale of a given phenomenon is related to its [[de Broglie wavelength]] |
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{{nowrap|1=''ℓ'' = ''ħ''/''p''}}, where ''ħ'' is the [[reduced Planck constant]] and ''p'' is the momentum that is being probed. In [[relativistic mechanics]] time and length scales are related by the [[speed of light]]. In [[relativistic quantum mechanics]] or [[relativistic quantum field theory]], length scales are related to momentum, time and energy scales through the Planck constant and the speed of light. Often in [[high energy physics]] [[natural units]] are used where length, time, energy and momentum scales are described in the same units (usually with units of energy such as [[GeV]]). |
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Length scales are usually the operative scale (or at least one of the scales) in [[dimensional analysis]]. For instance, in [[scattering theory]], the most common quantity to calculate is a [[cross section (physics)|cross section]] which has units of length squared and is measured in [[barn (unit)|barn]]s. The cross section of a given process is usually the square of the length scale. |
Length scales are usually the operative scale (or at least one of the scales) in [[dimensional analysis]]. For instance, in [[scattering theory]], the most common quantity to calculate is a [[cross section (physics)|cross section]] which has units of length squared and is measured in [[barn (unit)|barn]]s. The cross section of a given process is usually the square of the length scale. |
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==Examples== |
== Examples == |
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*The atomic length scale is < |
* The atomic length scale is {{nowrap|ℓ<sub>a</sub> ~ {{val|e=-10|u=m}}}} and is given by the size of hydrogen atom (''i.e.'', the [[Bohr radius]], approximately {{val|53|ul=pm}}). |
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⚫ | * The length scale for the [[strong interaction]]s (or the one derived from [[Quantum chromodynamics|QCD]] through [[dimensional transmutation]]) is around {{nowrap|ℓ<sub>s</sub> ~ {{val|e=-15|u=m}}}}, and the "radii" of strongly interacting particles (such as the [[proton]]) are roughly comparable. This length scale is determined by the range of the [[Yukawa potential]]. The lifetimes of strongly interacting particles, such as the [[rho meson]], are given by this length scale divided by the speed of light: {{val|e=-23|u=s}}. The masses of strongly interacting particles are several times the associated energy scale ({{val|500|u=MeV/c2}} to {{val|3000|u=MeV/c2}}). |
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⚫ | * The [[electroweak]] length scale is shorter, roughly {{nowrap|ℓ<sub>w</sub> ~ {{val|e=-18|u=m}}}} and is set by the rest mass of the [[W and Z bosons|weak vector bosons]], which is roughly {{val|100|u=GeV/c2}}. This length scale would be the distance where a Yukawa force is mediated by the weak vector bosons. The magnitude of weak length scale was initially inferred by the [[Fermi's interaction|Fermi constant]] measured by [[neutron]] and [[muon]] decay. |
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⚫ | *The length scale for the [[strong interaction]]s (or the one derived from [[Quantum chromodynamics|QCD]] through [[dimensional transmutation]]) is around < |
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⚫ | *The [[electroweak]] length scale is shorter, roughly < |
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==See also== |
== See also == |
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*[[Orders of magnitude (length)]] |
* [[Orders of magnitude (length)]] |
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*[[Extragalactic |
* [[Extragalactic distance scale]] |
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*[[Scale height]] |
* [[Scale height]] |
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==References== |
== References == |
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{{ |
{{reflist}} |
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{{DEFAULTSORT:Length Scale}} |
{{DEFAULTSORT:Length Scale}} |
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[[Category: |
[[Category:Orders of magnitude (length)]] |
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[[Category:Particle physics]] |
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[[Category:Renormalization group]] |
Latest revision as of 16:49, 22 April 2024
In physics, length scale is a particular length or distance determined with the precision of at most a few orders of magnitude. The concept of length scale is particularly important because physical phenomena of different length scales cannot affect each other[citation needed][clarification needed] and are said to decouple. The decoupling of different length scales makes it possible to have a self-consistent theory that only describes the relevant length scales for a given problem. Scientific reductionism says that the physical laws on the shortest length scales can be used to derive the effective description at larger length scales. The idea that one can derive descriptions of physics at different length scales from one another can be quantified with the renormalization group.
In quantum mechanics the length scale of a given phenomenon is related to its de Broglie wavelength ℓ = ħ/p, where ħ is the reduced Planck constant and p is the momentum that is being probed. In relativistic mechanics time and length scales are related by the speed of light. In relativistic quantum mechanics or relativistic quantum field theory, length scales are related to momentum, time and energy scales through the Planck constant and the speed of light. Often in high energy physics natural units are used where length, time, energy and momentum scales are described in the same units (usually with units of energy such as GeV).
Length scales are usually the operative scale (or at least one of the scales) in dimensional analysis. For instance, in scattering theory, the most common quantity to calculate is a cross section which has units of length squared and is measured in barns. The cross section of a given process is usually the square of the length scale.
Examples
[edit]- The atomic length scale is ℓa ~ 10−10 m and is given by the size of hydrogen atom (i.e., the Bohr radius, approximately 53 pm).
- The length scale for the strong interactions (or the one derived from QCD through dimensional transmutation) is around ℓs ~ 10−15 m, and the "radii" of strongly interacting particles (such as the proton) are roughly comparable. This length scale is determined by the range of the Yukawa potential. The lifetimes of strongly interacting particles, such as the rho meson, are given by this length scale divided by the speed of light: 10−23 s. The masses of strongly interacting particles are several times the associated energy scale (500 MeV/c2 to 3000 MeV/c2).
- The electroweak length scale is shorter, roughly ℓw ~ 10−18 m and is set by the rest mass of the weak vector bosons, which is roughly 100 GeV/c2. This length scale would be the distance where a Yukawa force is mediated by the weak vector bosons. The magnitude of weak length scale was initially inferred by the Fermi constant measured by neutron and muon decay.
- The Planck length (Planck scale) is much shorter yet – about ℓP ~ 10−35 m, and is derived from the Newtonian constant of gravitation.
- The mesoscopic scale is the length at which quantum mechanical behaviours in liquids or solid can be described by macroscopic concepts.