Poincaré–Lelong equation
the partial differential equation i∂∂̄u=ρ where ρ is a positive (1,1)‐form on a Kähler manifold
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Poincaré–Lelong equation
Summary
Poincaré–Lelong equation is a mathematical concept[1].
Key Facts
- Poincaré–Lelong equation's instance of is recorded as mathematical concept[2].
- Pierre Lelong is named after Poincaré–Lelong equation[3].
- Henri Poincaré is named after Poincaré–Lelong equation[4].
- Poincaré–Lelong equation's subclass of is recorded as partial differential equation[5].
- Poincaré–Lelong equation's subclass of is recorded as second order differential equation[6].
- Poincaré–Lelong equation's Freebase ID is recorded as /m/0j3fb3d[7].
- Poincaré–Lelong equation's defining formula is recorded as \mathrm i\partial\bar\partial u=\rho[8].
- Poincaré–Lelong equation's maintained by WikiProject is recorded as WikiProject Mathematics[9].
- Poincaré–Lelong equation's in defining formula is recorded as \mathrm i[10].
- Poincaré–Lelong equation's in defining formula is recorded as \rho[11].
- Poincaré–Lelong equation's in defining formula is recorded as u[12].