Translinear circuit

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In the mathematical theory of partial differential equations, a Monge equation, named after Gaspard Monge, is a first-order partial differential equation for an unknown function u in the independent variables x1,...,xn

F(u,x1,x2,,xn,ux1,,uxn)=0

that is a polynomial in the partial derivatives of u. Any Monge equation has a Monge cone.

Classically, putting u = x0, a Monge equation of degree k is written in the form

i0++in=kPi0in(x0,x1,,xk)dx0i0dx1i1dxnin=0

and expresses a relation between the differentials dxk. The Monge cone at a given point (x0, ..., xn) is the zero locus of the equation in the tangent space at the point.

The Monge equation is unrelated to the (second-order) Monge–Ampère equation.


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