Twistor correspondence

In mathematical physics, the twistor correspondence (also known as Penrose–Ward correspondence) is a bijection between instantons on complexified Minkowski space and holomorphic vector bundles on twistor space, which as a complex manifold is ${\displaystyle {\mathbb{P}}^3}$, or complex projective 3-space. Twistor space was introduced by Roger Penrose, while Richard Ward formulated the correspondence between instantons and vector bundles on twistor space.

There is a bijection between

1. Gauge equivalence classes of anti-self dual Yang–Mills (ASDYM) connections on complexified Minkowski space ${\displaystyle M_{ℂ}\cong {ℂ}^4}$ with gauge group ${\displaystyle \mathrm{G}\mathrm{L}(n,ℂ)}$ (the complex general linear group)
2. Holomorphic rank n vector bundles ${\displaystyle E}$ over projective twistor space ${\displaystyle 𝒫𝒯\cong {\mathbb{P}}^3-{\mathbb{P}}^1}$ which are trivial on each degree one section of ${\displaystyle 𝒫𝒯\to {\mathbb{P}}^1}$.^[1][2]

where ${\displaystyle {\mathbb{P}}^n}$ is the complex projective space of dimension ${\displaystyle n}$.

On the anti-self dual Yang–Mills side, the solutions, known as instantons, extend to solutions on compactified Euclidean 4-space. On the twistor side, the vector bundles extend from ${\displaystyle 𝒫𝒯}$ to ${\displaystyle {\mathbb{P}}^3}$, and the reality condition on the ASDYM side corresponds to a reality structure on the algebraic bundles on the twistor side. Holomorphic vector bundles over ${\displaystyle {\mathbb{P}}^3}$ have been extensively studied in the field of algebraic geometry, and all relevant bundles can be generated by the monad construction^[3] also known as the ADHM construction, hence giving a classification of instantons.

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