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In mathematics, the musical isomorphism is an isomorphism between the tangent bundle ${\displaystyle TM}$ and the cotangent bundle ${\displaystyle T^{*}M}$ of a Riemannian manifold given by its metric.

A metric g on a Riemannian manifold M is a tensor field ${\displaystyle g\in {\mathcal {T}}_{2}(M)}$. If we fix one parameter as a vector ${\displaystyle v_{p}\in T_{p}M}$, we have an isomorphism of vector spaces:

${\displaystyle {\hat {g}}_{p}:T_{p}M\longrightarrow T_{p}^{*}M}$

${\displaystyle {\hat {g}}_{p}(v_{p})=g(v_{p},-)}$

${\displaystyle <{\hat {g}}_{p}(v_{p}),\omega _{p}>=g_{p}(v_{p},\omega _{p})}$

And globally,

${\displaystyle {\hat {g}}:TM\longrightarrow T^{*}M}$ is a diffeomorphism.

The isomorphism ${\displaystyle {\hat {g}}}$ and its inverse ${\displaystyle {\hat {g}}^{-1}}$ are called musical isomorphisms because they move up and down the indexes of the vectors. For instance, a vector of TM is written as ${\displaystyle \alpha ^{i}{\frac {\partial }{\partial x}}}$ and a covector as ${\displaystyle \alpha _{i}dx^{i}}$, so the index i is moved up and down in ${\displaystyle \alpha }$ just as the symbols sharp (${\displaystyle \sharp }$) and flat (${\displaystyle \flat }$) move up and down the pitch of a tone.

The musical isomorphisms can be used to define the gradient of a smooth function over a manifold M as follows:

${\displaystyle \mathrm {grad} \;f={\hat {g}}^{-1}\circ df=(df)^{\sharp }}$