Frame of reference: Difference between revisions

Browse history interactively

← Previous edit

Content deleted Content added

VisualWikitext

Revision as of 04:50, 15 January 2023 edit 5.250.108.153 (talk) No edit summary Tags: Visual edit Mobile edit Mobile web edit ← Previous edit		Latest revision as of 04:17, 31 August 2025 edit undo Randy Kryn (talk \| contribs) Extended confirmed users 310,656 edits →Measurement apparatus: uppercase per direct link (Standard Model)
(19 intermediate revisions by 17 users not shown)
Line 1: {{short description\|Abstract coordinate system}} ~~{{distinguish\|Inertial frame of reference}}~~ {{Other uses\|Frame of reference (disambiguation)}} ~~{{Merge from\|Observer (special relativity)\|discuss=Talk:Frame of reference#Proposed merge of Observer (special relativity) into Frame of reference\|date=November 2022}}~~ {{Classical mechanics \|Fundamentals}} In [[physics]] and [[astronomy]], a '''frame of reference''' (or '''reference frame''') is an abstract [[coordinate system]], whose [[origin (mathematics)\|origin]], [[orientation (geometry)\|orientation]], and [[scale (geometry)\|scale]] ~~are~~have been specified byin [[physical space]]. It is based on a set of '''reference points'''―, defined as [[point (geometry)\|geometric points]] whose [[position (geometry)\|position]] is identified both mathematically (with numerical coordinate values) and physically (signaled by conventional markers).<ref name="Kovalevsky Mueller 1989 pp. 1–12">{{cite book \| last1=Kovalevsky \| first1=J. \| last2=Mueller \|author-link=Jean Kovalevsky \|first2=Ivan I. \|author-link2=Ivan I. Mueller \|title=Reference Frames \| chapter=Introduction \| series=Astrophysics and Space Science Library \| publisher=Springer Netherlands \| publication-place=Dordrecht \| year=1989 \| volume=154 \| issn=0067-0057 \| doi=10.1007/978-94-009-0933-5_1 \| pages=1–12\| isbn=978-94-010-6909-0 }}</ref> An important special case is that of an ''[[inertial reference frame]]'', a stationary or uniformly moving frame. For ''n'' dimensions, {{nowrap\|''n'' + 1}} reference points are sufficient to fully define a reference frame. Using [[Cartesian coordinate system\|rectangular Cartesian coordinates]], a reference frame may be defined with a reference point at the origin and a reference point at one unit distance along each of the ''n'' coordinate [[~~Axis~~Cartesian ~~(mathematics)~~coordinate system\|axes]].{{Citation needed\|date=December 2020}} In [[Theory of relativity\|Einsteinian relativity]], reference frames are used to specify the relationship between a moving [[Observer (special relativity)\|observer]] and the phenomenon under observation. In this context, the term often becomes '''observational frame of reference''' (or '''observational reference frame'''), which implies that the observer is at rest in the frame, although not necessarily located at its [[origin (mathematics)\|origin]]. A relativistic reference frame includes (or implies) the [[coordinate time]], which does not equate across different reference frames [[relative motion\|moving relatively]] to each other. The situation thus differs from [[Galilean invariance\|Galilean relativity]], in which all possible coordinate times are essentially equivalent.{{Citation needed\|date=December 2020}} Line 19 ⟶ 18: * A coordinate system is a mathematical concept, amounting to a choice of language used to describe observations.<ref name =Pontriagin> In very general terms, a coordinate system is a set of arcs ''x''<sup>i</sup> = ''x''<sup>i</sup> (''t'') in a complex [[Lie group]]; see {{cite book \|author=Lev Semenovich Pontri͡agin \|title=L.S. Pontryagin: Selected Works Vol. 2: Topological Groups \|page= 429 \|year= 1986\|url=https://books.google.com/books?id=JU0DT_wXu2oC&q=algebra+%22coordinate+system%22&pg=PA429\|isbn=2-88124-133-6 \|publisher=Gordon and Breach\|edition=3rd }}. Less abstractly, a coordinate system in a space of n-dimensions is defined in terms of a basis set of vectors {'''e'''<sub>1</sub>, '''e'''<sub>2</sub>,…... '''e'''<sub>n</sub>}; see {{cite book \|title=Linear Algebra: A Geometric Approach \|author1=Edoardo Sernesi \|author2=J. Montaldi \|page=95 \|url=https://books.google.com/books?id=1dZOuFo1QYMC&q=algebra+%22coordinate+system%22&pg=PA95\|isbn=0-412-40680-2 \|year=1993 \|publisher=CRC Press}} As such, the coordinate system is a mathematical construct, a language, that may be related to motion, but has no necessary connection to motion.</ref> Consequently, an observer in an observational frame of reference can choose to employ any coordinate system (Cartesian, polar, curvilinear, generalized, …...) to describe observations made from that frame of reference. A change in the choice of this coordinate system does not change an observer's state of motion, and so does not entail a change in the observer's ''observational'' frame of reference. This viewpoint can be found elsewhere as well.<ref name=Johansson> {{cite book \|title=Unification of Classical, Quantum and Relativistic Mechanics and of the Four Forces \|author1=J X Zheng-Johansson \|author2=Per-Ivar Johansson \|page=13 \|url=https://books.google.com/books?id=I1FU37uru6QC&q=frame+coordinate+johansson&pg=PA13\|isbn=1-59454-260-0 Line 63 ⟶ 62: : <math> x^j (x, y, z, \dots) = \mathrm{constant},\quad j = 1,\ \dots,\ n.</math> The intersection of these surfaces define '''coordinate lines'''. At any selected point, tangents to the intersecting coordinate lines at that point define a set of '''basis vectors''' {'''e'''<sub>1</sub>, '''e'''<sub>2</sub>, …..., '''e'''<sub>n</sub>} at that point. That is:<ref name=Papapetrou>{{cite book \|title=Lectures on General Relativity \|author=Achilleus Papapetrou \|page=5 \|url=https://books.google.com/books?id=SWeOggyp1ZsC&q=relativistic++%22general+coordinates%22&pg=PA3 \|isbn=90-277-0540-2 \|year=1974 \|publisher=Springer}}</ref> Line 96 ⟶ 95: In physics experiments, the frame of reference in which the laboratory measurement devices are at rest is usually referred to as the [[laboratory frame]] or simply "lab frame." An example would be the frame in which the detectors for a particle accelerator are at rest. The lab frame in some experiments is an inertial frame, but it is not required to be (for example the laboratory on the surface of the Earth in many physics experiments is not inertial). In particle physics experiments, it is often useful to transform energies and momenta of particles from the lab frame where they are measured, to the [[center of momentum frame]] "COM frame" in which calculations are sometimes simplified, since potentially all kinetic energy still present in the COM frame may be used for making new particles. In this connection it may be noted that the clocks and rods often used to describe observers' measurement equipment in thought, in practice are replaced by a much more complicated and indirect [[metrology]] that is connected to the nature of the [[vacuum]], and uses [[atomic clocks]] that operate according to the [[~~standard~~Standard ~~model~~Model]] and that must be corrected for [[gravitational time dilation]].<ref name= Wolfson>{{cite book \|author= Richard Wolfson \|title=Simply Einstein \|url=https://books.google.com/books?id=OUJWKdlFKeQC&q=%22gravitational+time+dilation+%22&pg=PA216\|page=216 \|isbn=0-393-05154-4 \|publisher=W W Norton & Co. \|year=2003}}</ref> (See [[second]], [[meter]] and [[kilogram]]). In fact, Einstein felt that clocks and rods were merely expedient measuring devices and they should be replaced by more fundamental entities based upon, for example, atoms and molecules.<ref name=Rizzi>See {{cite book \|title=Relativity in rotating frames \|page=33 \|url=https://books.google.com/books?id=_PGrlCLkkIgC&q=centrifugal+%22+%22+relativity+OR+relativistic&pg=PA226 Line 102 ⟶ 101: ==Generalization== The discussion is taken beyond simple space-time coordinate systems by [[Katherine Brading\|Brading]] and Castellani.<ref name=Brading>{{cite book \|title=Symmetries in Physics: Philosophical Reflections \|author1=Katherine Brading\|author1-link=Katherine Brading \|author2=Elena Castellani \|page=417 \|url=https://books.google.com/books?id=SnmBN64cAdYC&q=%22idea+of+a+reference+frame%22&pg=PA417\|isbn=0-521-82137-1 \|year=2003 \|publisher=Cambridge University Press}}</ref> Extension to coordinate systems using generalized coordinates underlies the [[Hamilton's principle\|Hamiltonian]] and [[Lagrangian mechanics\|Lagrangian]] formulations<ref name=Johns>{{cite book \|title=Analytical Mechanics for Relativity and Quantum Mechanics \|page=Chapter 16 \|author=Oliver Davis Johns \|url=https://books.google.com/books?id=PNuM9YDN8CIC&q=coordinate+observer&pg=PA318 \|isbn=0-19-856726-X \|year=2005 \|publisher=Oxford University Press \|no-pp=true }}</ref> of [[quantum field theory]], [[classical mechanics\|classical relativistic mechanics]], and [[quantum gravity]].<ref name=Greenwood>{{cite book \|title=Classical dynamics \|author=Donald T Greenwood \|page=313 \|year=1997 \|edition=Reprint of 1977 edition by Prentice-Hall \|publisher=Courier Dover Publications \|url=https://books.google.com/books?id=x7rj83I98yMC&q=%22relativistic+%22+Lagrangian+OR+Hamiltonian&pg=RA2-PA314 \|isbn=0-486-69690-1 }}</ref><ref name=Trump>{{cite book \|title=Classical Relativistic Many-Body Dynamics \|author1=Matthew A. Trump \|author2=W. C. Schieve \|page= 99 \|url=https://books.google.com/books?id=g2yfLOp0IzwC&q=relativity+%22generalized+coordinates%22&pg=PA99 Line 117 ⟶ 116: * [[Moving frame\|Moving frame in mathematics]] == See also == <div style="column-count: 2; column-width: 20em;"> ~~{{div col}}~~ * [[Analytical mechanics]] * [[Applied mechanics]] Line 147 ⟶ 146: * [[Principle of relativity]] * [[Quantum reference frame]] {{</div ~~end}}~~> <div style="clear: both;"></div> {{Relativity}}▼ {{Authority control}}▼ == Notes == Line 157 ⟶ 154: == References == {{reflist}} ▲{{Relativity}} ▲{{Authority control}} [[Category:Frames of reference\|*]]