Monge-Ampère equation

A Monge-Ampère equation , or Monge-Ampère differential equation , is a special nonlinear second order partial differential equation in variables. ${\ displaystyle n}$

It was introduced by Gaspard Monge at the beginning of the 19th century in order to solve a mass transport problem ( "Problem du remblai- déblai") for military purposes. Despite its fairly simple shape, it is generally difficult to solve. The equation is also named after André-Marie Ampère , who dealt with it around 1820.

Mathematical formulation

In general, a Monge-Ampère equation over an open area has the form ${\ displaystyle \ Omega \ subset \ mathbb {R} ^ {n}}$

{\ displaystyle \ det \, D ^ {2} u = f}

where , where is the unknown function, a given function , and ${\ displaystyle u \ colon \ Omega \ to \ mathbb {R}}$ ${\ displaystyle u = u (x_ {1}, \ ldots, x_ {n})}$ ${\ displaystyle f \ colon \ Omega \ times \ mathbb {R} ^ {n + 1} \ to \ mathbb {R}}$ ${\ displaystyle f = f (x_ {1}, \ ldots, x_ {n}, u, u_ {x_ {1}}, \ ldots u_ {x_ {n}})}$

{\ displaystyle D ^ {2} u = {\ begin {pmatrix} u_ {x_ {1} x_ {1}} & \ cdots & u_ {x_ {1} x_ {n}} \\\ vdots & \ ddots & \ vdots \\ u_ {x_ {n} x_ {1}} & \ cdots & u_ {x_ {n} x_ {n}} \ end {pmatrix}} \ qquad {\ mbox {with}} u_ {x_ {i} x_ {j}} = {\ frac {\ partial ^ {2} u} {\ partial x_ {i} \ partial x_ {j}}}.}

the Hessian matrix of . The simple shape results especially for the two-dimensional case ${\ displaystyle u}$ ${\ displaystyle n = 2}$

{\ displaystyle u_ {xx} u_ {yy} -u_ {xy} ^ {2} = f}

with and the functions and . In the case of n = 2, however, the following representation is often referred to as a general Monge-Ampère equation: ${\ displaystyle (x, y) \ in \ Omega \ subset \ mathbb {R} ^ {2}}$ ${\ displaystyle u (x, y)}$ ${\ displaystyle f (x, y, u, u_ {x}, u_ {y})}$

{\ displaystyle Ar + 2Bs + Ct + (rt-s ^ {2}) = E, \ qquad {\ mbox {with}} r = u_ {xx}, \ s = u_ {xy}, \ t = u_ {yy }, \ p = u_ {x}, \ q = u_ {y},}

where and are functions of ( ). One immediately recognizes that with and the above simpler shape results. ${\ displaystyle A, B, C}$ ${\ displaystyle E}$ ${\ displaystyle x, y, u, p, q}$ ${\ displaystyle A = B = C = 0}$ ${\ displaystyle E = f}$

Concrete example

Be and . Then there is a solution of the Monge-Ampère differential equation, because and therefore ${\ displaystyle n = 2}$ ${\ displaystyle f (x, y) = 4 (1-y ^ {2}) (1-x ^ {2}) - 16x ^ {2} y ^ {2}}$ ${\ displaystyle u (x, y) = (1-x ^ {2}) (1-y ^ {2})}$ ${\ displaystyle u_ {xx} = - 2 (1-y ^ {2}),}$ ${\ displaystyle u_ {yy} = - 2 (1-x ^ {2}),}$ ${\ displaystyle u_ {xy} = u_ {yx} = - 4xy,}$ ${\ displaystyle \ det \, D ^ {2} u = \ det {\ begin {pmatrix} -2 (1-y ^ {2}) & - 4xy \\ - 4xy & -2 (1-x ^ {2} ) \ end {pmatrix}} = f (x, y).}$

Classification as a partial differential equation

A Monge-Ampère equation is a fully nonlinear partial differential equation of the second order in variables. Explanations: ${\ displaystyle n}$

"Partial differential equation", because we are looking for a function that depends on several variables and whose partial derivatives must obey the given equation. ${\ displaystyle u}$

"fully non-linear", since all terms appear with second (i.e. the highest) derivatives of quadratically. ${\ displaystyle u}$

An important class are the elliptical Monge-Ampère equations, which satisfy the conditions and , or in the simpler form simple . ${\ displaystyle n = 2}$ ${\ displaystyle AC-B ^ {2} + E> 0}$ ${\ displaystyle t + A> 0}$ ${\ displaystyle f> 0}$

Applications

Most of the applications of the Monge-Ampère equation are of an intramathematical nature, especially in differential geometry. In the Minkowski problem, for example, a strictly convex hypersurface with a given Gaussian curvature is sought, which leads to a Monge-Ampère equation. The problem was solved by Nirenberg in 1953 .

An unexpected application in the field of string theory resulted from a result published by Yau in 1978 , which proved a conjecture by Calabi about the curvature of certain Kähler manifolds by solving a complex Monge-Ampère equation ( Yau's theorem ). Accordingly, one speaks today of Calabi-Yau manifolds .

Significant contributions to Monge-Ampère's equations in the course of the 20th century came from Hermann Weyl , Franz Rellich , Erhard Heinz , Louis Nirenberg , Shing-Tung Yau , Luis Caffarelli , Alexei Wassiljewitsch Pogorelow , Thierry Aubin , Sébastien Boucksom , Alessio Figalli and Guido de Philippis .

Web links

Plots of solutions of Monge-Ampèrescher equations ( Memento of February 5, 2005 in the Internet Archive )
Entry in MathWorld (Engl.)
Pogorelov Monge-Ampère equation, Encyclopedia of Mathematics, Springer