# Physics:Time translation symmetry

__: Hypothesis that physics experiments will behave the same regardless of when they are conducted__

**Short description****Time translation symmetry** or **temporal translation symmetry** (**TTS**) is a mathematical transformation in physics that moves the times of events through a common interval. Time translation symmetry is the law that the laws of physics are unchanged (i.e. invariant) under such a transformation. Time translation symmetry is a rigorous way to formulate the idea that the laws of physics are the same throughout history. Time translation symmetry is closely connected, via the Noether theorem, to conservation of energy.^{[1]} In mathematics, the set of all time translations on a given system form a Lie group.

There are many symmetries in nature besides time translation, such as spatial translation or rotational symmetries. These symmetries can be broken and explain diverse phenomena such as crystals, superconductivity, and the Higgs mechanism.^{[2]} However, it was thought until very recently that time translation symmetry could not be broken.^{[3]} Time crystals, a state of matter first observed in 2017, break time translation symmetry.^{[4]}

## Overview

Group theory → Lie groupsLie groups |
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Symmetries are of prime importance in physics and are closely related to the hypothesis that certain physical quantities are only relative and unobservable.^{[5]} Symmetries apply to the equations that govern the physical laws (e.g. to a Hamiltonian or Lagrangian) rather than the initial conditions, values or magnitudes of the equations themselves and state that the laws remain unchanged under a transformation.^{[1]} If a symmetry is preserved under a transformation it is said to be *invariant*. Symmetries in nature lead directly to conservation laws, something which is precisely formulated by the Noether theorem.^{[6]}

Symmetry | Transformation | Unobservable | Conservation law |
---|---|---|---|

Space-translation | [math]\displaystyle{ \mathbf{r} \rightarrow \mathbf{r} + \delta\mathbf{r} }[/math] | absolute position in space | momentum |

Time-translation | [math]\displaystyle{ t \rightarrow t + \delta t }[/math] | absolute time | energy |

Rotation | [math]\displaystyle{ \mathbf{r} \rightarrow \mathbf{r}' }[/math] | absolute direction in space | angular momentum |

Space inversion | [math]\displaystyle{ \mathbf{r} \rightarrow - \mathbf{r} }[/math] | absolute left or right | parity |

Time-reversal | [math]\displaystyle{ t \rightarrow - t }[/math] | absolute sign of time | Kramers degeneracy |

Sign reversion of charge | [math]\displaystyle{ e \rightarrow - e }[/math] | absolute sign of electric charge | charge conjugation |

Particle substitution | distinguishability of identical particles | Bose or Fermi statistics | |

Gauge transformation | [math]\displaystyle{ \psi \rightarrow e^{iN\theta}\psi }[/math] | relative phase between different normal states | particle number |

### Newtonian mechanics

To formally describe time translation symmetry we say the equations, or laws, that describe a system at times [math]\displaystyle{ t }[/math] and [math]\displaystyle{ t + \tau }[/math] are the same for any value of [math]\displaystyle{ t }[/math] and [math]\displaystyle{ \tau }[/math].

For example, considering Newton's equation:

- [math]\displaystyle{ m\ddot{x}=-\frac{dV}{dx}(x) }[/math]

One finds for its solutions [math]\displaystyle{ x=x(t) }[/math] the combination:

- [math]\displaystyle{ \frac{1}{2}m\dot{x}(t)^2 + V(x(t)) }[/math]

does not depend on the variable [math]\displaystyle{ t }[/math]. Of course, this quantity describes the total energy whose conservation is due to the time translation invariance of the equation of motion. By studying the composition of symmetry transformations, e.g. of geometric objects, one reaches the conclusion that they form a group and, more specifically, a Lie transformation group if one considers continuous, finite symmetry transformations. Different symmetries form different groups with different geometries. Time independent Hamiltonian systems form a group of time translations that is described by the non-compact, abelian, Lie group [math]\displaystyle{ \mathbb R }[/math]. TTS is therefore a dynamical or Hamiltonian dependent symmetry rather than a kinematical symmetry which would be the same for the entire set of Hamiltonians at issue. Other examples can be seen in the study of time evolution equations of classical and quantum physics.

Many differential equations describing time evolution equations are expressions of invariants associated to some Lie group and the theory of these groups provides a unifying viewpoint for the study of all special functions and all their properties. In fact, Sophus Lie invented the theory of Lie groups when studying the symmetries of differential equations. The integration of a (partial) differential equation by the method of separation of variables or by Lie algebraic methods is intimately connected with the existence of symmetries. For example, the exact solubility of the Schrödinger equation in quantum mechanics can be traced back to the underlying invariances. In the latter case, the investigation of symmetries allows for an interpretation of the degeneracies, where different configurations to have the same energy, which generally occur in the energy spectrum of quantum systems. Continuous symmetries in physics are often formulated in terms of infinitesimal rather than finite transformations, i.e. one considers the Lie algebra rather than the Lie group of transformations

### Quantum mechanics

The invariance of a Hamiltonian [math]\displaystyle{ \hat{H} }[/math] of an isolated system under time translation implies its energy does not change with the passage of time. Conservation of energy implies, according to the Heisenberg equations of motion, that [math]\displaystyle{ [ \hat{H}, \hat{H} ]=0 }[/math].

- [math]\displaystyle{ [ e^{i\hat{H}t/\hbar}, \hat{H} ]=0 }[/math]

or:

- [math]\displaystyle{ [ \hat{T}(t), \hat{H} ]=0 }[/math]

Where [math]\displaystyle{ \hat{T}(t)=e^{i\hat{H}t/\hbar} }[/math] is the time translation operator which implies invariance of the Hamiltonian under the time translation operation and leads to the conservation of energy.

### Nonlinear systems

In many nonlinear field theories like general relativity or Yang–Mills theories, the basic field equations are highly nonlinear and exact solutions are only known for ‘sufficiently symmetric’ distributions of matter (e.g. rotationally or axially symmetric configurations). Time translation symmetry is guaranteed only in spacetimes where the metric is static: that is, where there is a coordinate system in which the metric coefficients contain no time variable. Many general relativity systems are not static in any frame of reference so no conserved energy can be defined.

## Time translation symmetry breaking (TTSB)

Time crystals, a state of matter first observed in 2017, break discrete time translation symmetry.^{[4]}

## See also

- Absolute time and space
- Mach's principle
- Spacetime
- Time reversal symmetry

## References

- ↑
^{1.0}^{1.1}Wilczek, Frank (16 July 2015). "3".*A Beautiful Question: Finding Nature's Deep Design*. Penguin Books Limited. ISBN 978-1-84614-702-9. https://books.google.com/books?id=Oh3ICAAAQBAJ. - ↑ Richerme, Phil (18 January 2017). "Viewpoint: How to Create a Time Crystal".
*Physics*(APS Physics)**10**. doi:10.1103/Physics.10.5. http://physics.aps.org/articles/v10/5. - ↑ Else, Dominic V.; Bauer, Bela; Nayak, Chetan (2016). "Floquet Time Crystals".
*Physical Review Letters***117**(9): 090402. doi:10.1103/PhysRevLett.117.090402. ISSN 0031-9007. PMID 27610834. Bibcode: 2016PhRvL.117i0402E. - ↑
^{4.0}^{4.1}Gibney, Elizabeth (2017). "The quest to crystallize time".*Nature***543**(7644): 164–166. doi:10.1038/543164a. ISSN 0028-0836. PMID 28277535. Bibcode: 2017Natur.543..164G. - ↑
^{5.0}^{5.1}Feng, Duan; Jin, Guojun (2005).*Introduction to Condensed Matter Physics*. Singapore: World Scientific. p. 18. ISBN 978-981-238-711-0. https://books.google.com/books?id=-iuYN5arHwoC. - ↑ Cao, Tian Yu (25 March 2004).
*Conceptual Foundations of Quantum Field Theory*. Cambridge:*Cambridge University Press*. ISBN 978-0-521-60272-3. https://books.google.com/books?id=d0wS0EJHZ3MC.

## External links

Original source: https://en.wikipedia.org/wiki/Time translation symmetry.
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