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Magnetic Monopoles and the Homotopy Groups

Solitons. Finite-energy, non-dissipative solutions of the classical wave equationsCannot arise in linear theories such as electrodynamics, because there is dispersionNon linear theories allow cancelation of dispersive effects. Solitons in Field Theory . M is the set of vacuum field configurations:

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Magnetic Monopoles and the Homotopy Groups

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    1. Magnetic Monopoles and the Homotopy Groups Physics 251 Jonathan Cornell 6/8/2011

    2. Solitons Finite-energy, non-dissipative solutions of the classical wave equations Cannot arise in linear theories such as electrodynamics, because there is dispersion Non linear theories allow cancelation of dispersive effects

    3. Solitons in Field Theory M is the set of vacuum field configurations: Define a topological quantum number pd-2(G/H), where G maps one vacuum to another and H is the isotopy group (G/H is the manifold of the vacuum)

    4. Solitons in 1+1 Dimensions Euler—Lagrange Equations give us the equation of motion This has static solutions at zero and the potential minimum

    5. Equation of motion can also be satisfied by the soliton kink solution: Kinky Soliton Solutions

    6. Topological Charge The scalar fields in 2D have a conserved current, leading to a topological charge: For the kink solution: Charge Topological Quantum Number

    7. To construct a magnetic monopole, you can have A of the form Magnetic Monopole with charge g Dirac Monopoles Discuss singularity at ?=Pi and how it corresponds to an infinitely long solenoid (Dirac string).Discuss singularity at ?=Pi and how it corresponds to an infinitely long solenoid (Dirac string).

    8. Dirac Quantization Condition Singularities at ?=0 and ?=p correspond to Dirac string Moving in a circle around string, particle wave function picks up a phase (e-ieg) This phase factor must be equal to 1 for string to be undetectable e-ieg = 1 eg = 2pn

    9. From previous calculation we see that charge is quantized Monopoles require a compact U(1) gauge group Can be embedded in a larger compact gauge group i.e. SU(2) Also can arise in Kaluza-Klein theories Dirac Quantization Condition

    10. Soliton in 2+1 Dimensions (Nielsen-Olsen Model) Here Dµ=?µ – ieAµ and F is a complex valued field Vacuum is identified with Fµ?=0, Dµ?=0, The vacuum fields have the values

    11. Boundary Conditions As r?8, we need to have vacuum states. Working in gauge where A0=0 and considering the requirements on vacuum solution: Defining ?(?)=n? where refers to a homotopy class we find that magnetic field through (x,y) plane is quantized.

    12. Fa are scalar fields in the adjoint representation of SU(2) (a=1,2,3). The vacuum state manifold is a 2 sphere with radius ‘t Hooft-Polyakov Model (3+1 dimensions)

    13. Boundary Conditions r?8, need vacuum state, Dµ?a=0 Shown by ‘t Hooft that Wµa and Fµ? are related by (F={?a}): Working out electric and magnetic fields using the r?8 limit value of Wµa

    14. Quantization of Magnetic Charge This is same as Dirac quantization condition (eg = 2pn) with n = 2! Considering all possible solutions of the equations of motion for this theory, it can be shown we get the Dirac quantization condition with n even Agrees with result for possible homotopy classes

    15. Mass of Monopoles t’ Hooft showed , where MV is gauge boson mass Monopoles arise in GUTs, with mass of the scale of the symmetry breaking of the theory SU(5): GUT monopoles are too massive to be produced in accelerators, but could have been produced in early universe Monopole searches focus on accelerators, cosmic rays, and on monopoles possibly bound in matter To date, nothing found

    16. References Boya L. et al. “Homotopy and Solitons.” Fortschritte der Physik 26, 175-214 (1978). Coleman, S. “Magnetic Monopole Fifty Years Later.” from The Unity of the Fundamental Interactions, A. Zichichi, ed. European Physical Society, 1981. Dine, Michael. Supersymmetry and String Theory. Cambridge University Press, 2007. Goddard P. and D.I. Olive, “Magnetic monopoles in gauge field theories.” Rep. Prog. Phys., 41, 1357-1437 (1978). Harvey, Jeffrey A. “Magnetic Monopoles, Duality, and Supersymmetry.” arXiv: hep-th/9603086 Milstead, D. and E.J. Weinberg. “Magnetic Monopoles.” from K. Nakamura et al. (Particle Data Group), JPG 37, 075021 (2010).

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