Bogomol'nyi–Prasad–Sommerfield Bound
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The Bogomol'nyi–Prasad–Sommerfield bound (named after Evgeny Bogomolny, M.K. Prasad, and Charles Sommerfield) is a series of
inequalities Inequality may refer to: Economics * Attention inequality, unequal distribution of attention across users, groups of people, issues in etc. in attention economy * Economic inequality, difference in economic well-being between population groups * ...
for solutions of partial differential equations depending on the
homotopy class In topology, a branch of mathematics, two continuous functions from one topological space to another are called homotopic (from grc, ὁμός "same, similar" and "place") if one can be "continuously deformed" into the other, such a deforma ...
of the solution at infinity. This set of inequalities is very useful for solving
soliton In mathematics and physics, a soliton or solitary wave is a self-reinforcing wave packet that maintains its shape while it propagates at a constant velocity. Solitons are caused by a cancellation of nonlinear and dispersive effects in the medi ...
equations. Often, by insisting that the bound be satisfied (called "saturated"), one can come up with a simpler set of partial differential equations to solve the Bogomolny equations. Solutions saturating the bound are called "
BPS state BPS, Bps or bps may refer to: Science and mathematics *Plural of bp, base pair, a measure of length of DNA *Plural of bp, basis point, one one-hundredth of a percentage point - ‱ *Battered person syndrome, a physical and psychological condition ...
s" and play an important role in field theory and string theory.


Example

In a theory of non-abelian Yang–Mills–Higgs, the energy at a given time ''t'' is given by :E=\int d^3x\, \left frac\pi^T \pi + V(\varphi) + \frac\operatorname\left[\vec\cdot\vec+\vec\cdot\vec\rightright] where \pi is the covariant derivative of the Higgs field and ''V'' is the potential. If we assume that ''V'' is nonnegative and is zero only for the Higgs vacuum and that the Higgs field is in the
adjoint representation In mathematics, the adjoint representation (or adjoint action) of a Lie group ''G'' is a way of representing the elements of the group as linear transformations of the group's Lie algebra, considered as a vector space. For example, if ''G'' is G ...
, then, by virtue of the Yang–Mills Bianchi identity, : \begin E & \geq \int d^3x\, \left \frac\operatorname\left[\overrightarrow_\cdot_\overrightarrow\right+_\frac\operatorname\left[\vec\cdot\vec\right.html" ;"title="overrightarrow \cdot \overrightarrow\right">\frac\operatorname\left[\overrightarrow \cdot \overrightarrow\right+ \frac\operatorname\left[\vec\cdot\vec\right">overrightarrow \cdot \overrightarrow\right">\frac\operatorname\left[\overrightarrow \cdot \overrightarrow\right+ \frac\operatorname\left[\vec\cdot\vec\right\right] \\ & \geq \int d^3x\, \operatorname\left[ \frac\left(\overrightarrow\mp\frac\vec\right)^2 \pm\frac\overrightarrow\cdot \vec\right] \\ & \geq \pm \frac\int d^3x\, \operatorname\left[\overrightarrow\cdot \vec\right] \\ & = \pm\frac\int_ \operatorname\left varphi \vec\cdot d\vec\right \end Therefore, :E\geq \left\, \int_ \operatorname\left varphi \vec\cdot d\vec\rightright \, . Saturation of the inequality is obtained when the Bogomolny equations are satisfied. :\overrightarrow\mp\frac\vec = 0, The other condition for saturation is that the Higgs mass and self-interaction are zero, which is the case in N=2 supersymmetric theories. This quantity is the absolute value of the magnetic flux. A slight generalization applying to dyons also exists. For that, the Higgs field needs to be a complex adjoint, not a real adjoint.


Supersymmetry

In supersymmetry, the BPS bound is saturated when half (or a quarter or an eighth) of the SUSY generators are unbroken. This happens when the mass is equal to the central extension, which is typically a topological charge.Weinberg, Steven (2000). ''The Quantum Theory of Fields: Volume 3,'' p 53. Cambridge University Press, Cambridge. . In fact, most bosonic BPS bounds actually come from the bosonic sector of a supersymmetric theory and this explains their origin.


References

{{DEFAULTSORT:Bogomol'nyi-Prasad-Sommerfield bound Partial differential equations Quantum field theory Solitons