Let ${\displaystyle T_{1}(z),T_{2}(z),T_{3}(z)}$  be three matrix-valued meromorphic functions of a complex variable ${\displaystyle z}$ . The Nahm equations are a system of matrix differential equations

${\displaystyle {\begin{aligned}{\frac {dT_{1}}{dz}}&=[T_{2},T_{3}]\\[3pt]{\frac {dT_{2}}{dz}}&=[T_{3},T_{1}]\\[3pt]{\frac {dT_{3}}{dz}}&=[T_{1},T_{2}],\end{aligned}}}$ 

together with certain analyticity properties, reality conditions, and boundary conditions. The three equations can be written concisely using the Levi-Civita symbol, in the form

${\displaystyle {\frac {dT_{i}}{dz}}={\frac {1}{2}}\sum _{j,k}\epsilon _{ijk}[T_{j},T_{k}]=\sum _{j,k}\epsilon _{ijk}T_{j}T_{k}.}$ 

More generally, instead of considering ${\displaystyle N}$  by ${\displaystyle N}$  matrices, one can consider Nahm's equations with values in a Lie algebra ${\displaystyle g}$ .

Additional conditions

The variable ${\displaystyle z}$  is restricted to the open interval ${\displaystyle (0,2)}$ , and the following conditions are imposed:

1. ${\displaystyle T_{i}^{*}=-T_{i};}$ 
2. ${\displaystyle T_{i}(2-z)=T_{i}(z)^{T};\,}$ 
3. ${\displaystyle T_{i}N}$  can be continued to a meromorphic function of ${\displaystyle z}$  in a neighborhood of the closed interval ${\displaystyle [0,2]}$ , analytic outside of ${\displaystyle 0}$  and ${\displaystyle 2}$ , and with simple poles at ${\displaystyle z=0}$  and ${\displaystyle z=2}$ ; and
4. At the poles, the residues of ${\displaystyle T_{1},T_{2},T_{3}}$  form an irreducible representation of the group SU(2).

There is a natural equivalence between

1. the monopoles of charge ${\displaystyle K}$  for the group ${\displaystyle SU(2)}$ , modulo gauge transformations, and
2. the solutions of Nahm equations satisfying the additional conditions above, modulo the simultaneous conjugation of ${\displaystyle T_{1},T_{2},T_{3}}$  by the group ${\displaystyle O(k,R)}$ .

The Nahm equations can be written in the Lax form as follows. Set

${\displaystyle {\begin{aligned}&A_{0}=T_{1}+iT_{2},\quad A_{1}=-2iT_{3},\quad A_{2}=T_{1}-iT_{2}\\[3pt]&A(\zeta )=A_{0}+\zeta A_{1}+\zeta ^{2}A_{2},\quad B(\zeta )={\frac {1}{2}}{\frac {dA}{d\zeta }}={\frac {1}{2}}A_{1}+\zeta A_{2},\end{aligned}}}$ 

then the system of Nahm equations is equivalent to the Lax equation

${\displaystyle {\frac {dA}{dz}}=[A,B].}$ 

As an immediate corollary, we obtain that the spectrum of the matrix ${\displaystyle A}$  does not depend on ${\displaystyle z}$ . Therefore, the characteristic equation

${\displaystyle \det(\lambda I+A(\zeta ,z))=0,}$ 

which determines the so-called spectral curve in the twistor space ${\displaystyle TP^{1}}$ is invariant under the flow in ${\displaystyle z}$ .

• Bogomolny equation
• Yang–Mills–Higgs equations

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• – a wiki about the Nahm equations and related topics