Monge equation

In the mathematical theory of partial differential equations, a Monge equation, named after Gaspard Monge, is a type of first-order partial differential equation. A Monge equation is a function of type F ( u , q 1 : n , p 1 : n ) : R 2 n + 1 → R {\displaystyle F(u,q^{1:n},p_{1:n}):\mathbb {R} ^{2n+1}\to \mathbb {R} } .

Source: Wikipedia — Monge equation (CC BY-SA 4.0)

Monge equation

In the mathematical theory of partial differential equations, a Monge equation, named after Gaspard Monge, is a type of first-order partial differential equation. A Monge equation is a function of type F ( u , q 1 : n , p 1 : n ) : R 2 n + 1 → R {\displaystyle F(u,q^{1:n},p_{1:n}):\mathbb {R} ^{2n+1}\to \mathbb {R} } .

Source: Wikipedia "Monge equation" · CC BY-SA 4.0

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