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advanced_notions:topological_defects

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Topological Defects

Why is it interesting?

Topological defects are of common interest to condensed matter physics, atomic physics, astrophysics and cosmology, as well as algebraic topology. When the symmetry group $G$ spontaneously breaks down to its subgroup $H$, there are continuously connected ground states parametrized by the coset space $G/H$. The homotopy groups of the coset space then tell us what kinds of topological effects are possible. In most cases, non-trivial $\pi_d(G/H)$ implies the existence of $(2-d)$-dimensional topological defect. If the coset space has disconnected pieces ($\pi_0 (G/H) \neq 0$), we expect domain walls. For multiply-connected space ($\pi_1 (G/H)\neq 0$), there are strings/ vortices. If the boundary of space can map non-trivially to the coset space ($\pi_2(G/H)\neq 0$), we expect point-like defects such as monopoles. An exception to the rule is when the whole space is mapped non-trivially to the coset space ($\pi_3(G/H) \neq 0$), where skyrmions are stabilized by non-renormalizable terms in the low-energy effective theory. In this case, it is not the boundary condition that is topologically non-trivial, but the configuration in the bulk.

Topological Dark Matter by Hitoshi Murayama, Jing Shu


Important Topological Defects:

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Researcher

Topological defects are most easily understood by considering the scalar potential. A non-trivial vev breaks a given group $G$ to some subgroup $H$. Depending on the homotopy class of the vacuum manifold $G/H$ (speak G mod H), we get different topological defects.

  • If the homotopy class of $G/H$ is non-trivial this tells us that the vacuum manifold is not connected and thus there are domain walls between the different sectors. A domain wall is a two-dimensional object with non-zero field energy. An example, is a scalar potential with $Z_2$ symmetry that breaks to the trivial subgroup $1$. The vacuum manifold is $Z_2/1=Z_2$ and is therefore disconnected. For a surface, or domain wall, what we have said so far leads us to expect a map $S^0 \to M$ (for a d-dimensional singularity has led to a map $S^{2-d} \to M$). So, the unit sphere $S^0$ in R, consists of the two points $\pm 1$. One of the points, +1, corresponds to a point on one side of the domain wall and the other, -1, to a point on the other side."
  • If the first homotopy class of $G/H$ is non-trivial, we get one-dimensional topological defects that are called strings. An example is when a scalar potential with $U(1)$ symmetry breaks to the trivial subgroup $1$. The vacuum manifold is $U(1)/1=U(1) \simeq S^1$, which is connected, but not simply connected. This makes it possible that strings show up. (For an explanation with $S^1$ is not simply connected, see section 1.3.1 here)
  • If the second homotopy class of $G/H$ is non-trivial, we get a zero-dimensional topological defect, a "a pointlike singularity" that is called a monopole. An example is when a scalar potential with $SU(2)$ symmetry breaks to $U(1)$. The vacuum manifold is $SU(2)/U(1)\simeq S^2$.
  • If the third homotopy class of $G/H$ is non-trivial, we get so called “textures”. In fact the notion "textures" is more popular among condensed matter physicists and particle physicists call this kind of topological defect Skyrmions. "If space is a three sphere, we can have a texture wrapped around the entire three sphere and this would give a static solution in the model." (source). An example is when a scalar potential with $SU(2)$ symmetry breaks to the trivial subgroup $1$. The vacuum manifold is $SU(2)/1 =SU(2) \simeq S^3$.

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Examples

Domain Wall

Consider the possibility that φ = +η at x = +∞ and φ = −η at x = −∞. In this case, the continuous function φ(x) has to go from −η to +η as x is taken from −∞ to +∞ and so must necessarily pass through φ = 0. But then there is energy in this field configuration since the potential is non-zero when φ = 0. Also, this configuration cannot relax to either of the two vacuum configurations, say φ(x) = +η, since that involves changing the field over an infinite volume from −η to +η, which would cost an infinite amount of energy

https://arxiv.org/pdf/hep-ph/9710292.pdf

FAQ

What topological defects are present in a given model?

The problem of finding the types of topological defects present in a given model reduces to finding the homotopy groups for a certain symmetry breaking G → H. That is, we need to find πn(G/H) (n = 0, 1, 2, 3) given the groups G and H. In general, this can be quite complicated but there is an immensely useful theorem which is often applicable and simplifies matters.

https://arxiv.org/pdf/hep-ph/9710292.pdf

Why are Topological Defects Stable?

Suppose we consider a point defect and enclose it by an imaginary sphere S2. If we avoid other defects, all spheres about the point will be equivalent for our purposes, because they can be continuously deformed into one another inside V. Restricted to the sphere, cp defines a map S2+ A. If there is some topologically non-trivial aspect of this map, such as a winding number, the point defect will be topologically stable. It will not be able to just disappear leaving the medium in a uniform state with cp constant because, once it had gone, we could continuously deform the sphere to a point. The winding number, or whatever, would have had to have abruptly vanished, contradicting the assumed continuity. Similarly for a line defect, we take a circle S' about the line and obtain a map S' + A whose topological characteristics could ensure the stability of the defect.

Topological structures in field theories by Goddard and Mansfield

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History

advanced_notions/topological_defects.1513764620.txt.gz · Last modified: 2017/12/20 10:10 (external edit)