Symplectic resolution

In mathematics, particularly in representation theory, a symplectic resolution is a morphism that combines symplectic geometry and resolution of singularities. == Definition == Let π : Y → X {\displaystyle \pi :Y\to X} be a morphism between complex algebraic varieties, where Y {\displaystyle Y} is smooth and carries a symplectic structure, and X {\displaystyle X} is affine, normal, and carries a Poisson structure.

Source: Wikipedia — Symplectic resolution (CC BY-SA 4.0)

Symplectic resolution

In mathematics, particularly in representation theory, a symplectic resolution is a morphism that combines symplectic geometry and resolution of singularities. == Definition == Let π : Y → X {\displaystyle \pi :Y\to X} be a morphism between complex algebraic varieties, where Y {\displaystyle Y} is smooth and carries a symplectic structure, and X {\displaystyle X} is affine, normal, and carries a Poisson structure.

Source: Wikipedia "Symplectic resolution" · CC BY-SA 4.0

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