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Symmetries and conservation laws Pierre-Hugues Beauchemin PHY 006 –Talloire, May 2013 Symmetries in nature Many objects in nature presents a high level of symmetry, indicating that the forces that produced these objects feature the same symmetries ⇒ Learn structure of Nature by studying symmetries it features Transformations and symmetries What is a symmetry? It is a transformation that leaves an observable aspect of a system unchanged The unchanged quantity is called an invariant E.g.: Any rotation of the needle of a clock change the orientation of the needle, but doesn’t change is length The length of a clock needle is invariant under rotation transformations Physics law can also be left invariant under transformation of symmetries E.g. Coulomb’s law giving the electric force of two charged particle on each other Discrete symmetries A symmetry is discrete when there is a finite number of transformations that leave an observable quantity invariant discrete and finite symmetries discrete and finite symmetries E.g. The set of transformation that leave a triangle invariant Rotation !!! !!!by 120º and by 240º ! !respect to axis starting from a summit and Reflection with •!!!symmetry!group!of!a!square!! •!!!symmetry!group!of!a!triangle!! bisecting the opposite segment in two equal parts This can be used to describe microscopic systems Continuous symmetries Characterized by an invariance following a continuous change in the transformation of a system Infinite (uncountable) numbers of transformation leave the system unchanged E.g.: continuous The rotation of a disk by groups any angle q with respect to an axis symmetry All these transformation are of a given kind and so can be easily characterized by a small set of parameters E.g.: All the transformations that leaves the disk invariant can be characterized by the axis of rotation and the angle of rotation q External symmetries These are the symmetries that leave a system invariant under space-time transformations The external symmetries are: Spatial rotations Spatial translations Properties of a system unchanged under a continuous change of location Time translations Physics systems keep same properties over time Lorentz transformations Physics systems remain unchanged regardless of the speed at which they moves with respect to some observer This is central to special relativity Internal symmetries Symmetries internal to a system but which get manifest through the various processes Parity transformation (P-Symmetry) Things look the same in a mirror image Same physics for left- and right-handed systems Time reversal (T-Symmetry) Laws of physics would be the same if they were running backward in time Charge conjugation (C-Symmetry) Same laws of physics for particle and antiparticles Gauge transformation Laws of physics are invariant under changes of redundant degrees of freedom E.g.: Rising the voltage uniformly through a circuit Internal symmetries can be global or local depending on if the transformation that leaves the system invariant is the same on each point of space-time or varies with space-time coordinates Symmetries breaking BROKEN symmetry Transformations or external effects often break the symmetry of a system The system is still symmetric but the symmetry is hidden to observation Can be inferred by looking at many systems Residual symmetries can survive the breaking A symmetry can be: Explicitly broken: the laws of physics don’t exhibit the symmetry The symmetry can be spotted when the breaking effect is weak and the system is approximately symmetric Spontaneously broken: the equations of motion are symmetric but the state of lowest energy of the system is not The system prefer to break the symmetry to get into a more stable energy state Group theory discrete Consider the setfinite of permutation of 1, 2, 3: and symmetries !!! (1,2,3), (2,3,1), (3,1,2), (2,1,3), (1,3,2), (3,2,1) ! !!!symmetry!group!of!a!triangle!! •Now, consider the symmetries of a triangle again : We can see that: • For the 120º rotation A->B, B->C, C->A • For the 240º rotation A->C, C->B, B->A Replace A, B, C for 1, 2, 3 and we have that the symmetries of the triangle are exactly the same as the permutations of 1, 2, 3 There is a fundamental structure underlying symmetries: group theory Invariance and conservation A quantity is conserved when it doesn’t vary during a given process E.g. Money changes hands in a transaction, but the total amount of money before and after the transaction is the same In 1918, Emmy Noether published the proof of two theorems now central to modern physics: each continuous symmetry of a system is equivalent to a measurable conserve quantity This is formulated in group theory and applies to physics theory that are realizations of these groups By studying quantities that are conserved in physics collision processes, we can learn what are the fundamental symmetries determining the underlying fundamental interactions without knowing all the state of the system Energy, momentum and angular momentum (I) Energy is, in classical physics, the quantity needed to perform mechanical work It can take various forms The total energy of an isolated system is conserved In HEP it describes the state of motion of a particle Momentum is another quantity describing the state of motion of a particle It has a magnitude and a direction In Newton physics it corresponds to It each component of the momentum are conserved in a particle collision process Energy, momentum and angular momentum (II) Angular momentum characterizes the state of rotating motion of a system It also has a magnitude and a direction Particles have an extrinsic angular momentum when in rotating motion, and an intrinsic angular momentum when they have a spin In Newton physics, it is defined as The total angular momentum is conserved in a particle collision These conservation rules proceed from fundamental symmetries satisfied by the physics laws governing the fundamental interactions of nature: Invariance of the system with time conservation of energy Invariance with translation conservation of momentum Invariance with rotation conservation of angular momentum Symmetries in HEP (I) The Standard Model Lagrangian is the equation describing the dynamics of all known particles This equation corresponds to the most general equation giving finite and stable observable predictions concerning all know particles, and which satisfies a set of fundamental symmetries: It must be invariant under space translation, time translation, rotations and Lorentz transformation The laws of physics are independent of the state of motion and the position of observers This equation must satisfies three local gauge invariance on the internal space of the particles (quantum fields): SUC(3): invariance of the theory under rotations in the 3-dimensional local internal color space (b, r, g) SUL(2): invariance of the theory under rotations in the 2-dimensional local internal weak charge space UY(1): invariance of the theory under rotations in the 1-dimensional local internal hypercharge space Requiring these invariances in the theory is sufficient to generate all terms describing the fundamental interactions of Nature Symmetries in HEP (II) While the SUC(3) part of the symmetry of the Standard Model remains unbroken when particles acquires a mass via the Higgs mechanism, the SUL(2)xUY(1) part get broken to the Uem(1) weaker symmetry of the electromagnetism The SM is summarized by SUC(3) x SUL(2) x UY(1) SUC(3) x Uem(1) The SM features some more symmetries: CPT: the mirror image of our universe filled of anti-particle rather than particle and running backward in time would be exactly the same as our universe This has been shown to be equivalent to Lorentz invariance Bring Feynman to interpret anti-particles as particles running backward in time… Accidental symmetries such as Baryon (⅓ ×(nq-naq)) and lepton (nl-nal, l=e, m, t) numbers conservation Approximate symmetries such as CP invariance The little CP-violating phase is crucial for matter domination over antimatter