mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

, the Newtonian potential, or Newton potential, is an operator in

vector calculus Vector calculus or vector analysis is a branch of mathematics concerned with the differentiation and integration of vector fields, primarily in three-dimensional Euclidean space, \mathbb^3. The term ''vector calculus'' is sometimes used as a ...

that acts as the inverse to the negative

Laplacian In mathematics, the Laplace operator or Laplacian is a differential operator given by the divergence of the gradient of a scalar function on Euclidean space. It is usually denoted by the symbols \nabla\cdot\nabla, \nabla^2 (where \nabla is th ...

on functions that are smooth and decay rapidly enough at infinity. As such, it is a fundamental object of study in

potential theory In mathematics and mathematical physics, potential theory is the study of harmonic functions. The term "potential theory" was coined in 19th-century physics when it was realized that the two fundamental forces of nature known at the time, namely g ...

. In its general nature, it is a singular integral operator, defined by

convolution In mathematics (in particular, functional analysis), convolution is a operation (mathematics), mathematical operation on two function (mathematics), functions f and g that produces a third function f*g, as the integral of the product of the two ...

with a function having a mathematical singularity at the origin, the Newtonian kernel

\Gamma

which is the

fundamental solution In mathematics, a fundamental solution for a linear partial differential operator is a formulation in the language of distribution theory of the older idea of a Green's function (although unlike Green's functions, fundamental solutions do not ...

of the Laplace equation. It is named for

Isaac Newton Sir Isaac Newton () was an English polymath active as a mathematician, physicist, astronomer, alchemist, theologian, and author. Newton was a key figure in the Scientific Revolution and the Age of Enlightenment, Enlightenment that followed ...

, who first discovered it and proved that it was a

harmonic function In mathematics, mathematical physics and the theory of stochastic processes, a harmonic function is a twice continuously differentiable function f\colon U \to \mathbb R, where is an open subset of that satisfies Laplace's equation, that i ...

in the special case of three variables, where it served as the fundamental

gravitational potential In classical mechanics, the gravitational potential is a scalar potential associating with each point in space the work (energy transferred) per unit mass that would be needed to move an object to that point from a fixed reference point in the ...

Newton's law of universal gravitation Newton's law of universal gravitation describes gravity as a force by stating that every particle attracts every other particle in the universe with a force that is Proportionality (mathematics)#Direct proportionality, proportional to the product ...

. In modern potential theory, the Newtonian potential is instead thought of as an

electrostatic potential Electric potential (also called the ''electric field potential'', potential drop, the electrostatic potential) is defined as electric potential energy per unit of electric charge. More precisely, electric potential is the amount of work needed ...

. The Newtonian potential of a compactly supported integrable function

f

is defined as the

u(x) = \Gamma * f(x) = \int_ \Gamma(x-y)f(y)\,dy

where the Newtonian kernel

\Gamma

in dimension

d

is defined by

\Gamma(x) = \begin 
\frac \log, &  d=2, \\
\frac ,  x ,  ^, &  d \neq 2.
\end

Here ''ω''_''d'' is the volume of the unit ''d''-ball (sometimes sign conventions may vary; compare and ). For example, for

d = 3

we have

\Gamma(x) = -1/(4\pi , x, ).

The Newtonian potential ''w'' of ''f'' is a solution of the

Poisson equation Poisson's equation is an elliptic partial differential equation of broad utility in theoretical physics. For example, the solution to Poisson's equation is the potential field caused by a given electric charge or mass density distribution; with th ...

\Delta w = f,

which is to say that the operation of taking the Newtonian potential of a function is a partial inverse to the Laplace operator. Then ''w'' will be a classical solution, that is twice differentiable, if ''f'' is bounded and locally

Hölder continuous Hölder: * ''Hölder, Hoelder'' as surname * Hölder condition * Hölder's inequality In mathematical analysis, Hölder's inequality, named after Otto Hölder, is a fundamental inequality (mathematics), inequality between Lebesgue integration, in ...

as shown by Otto Hölder. It was an open question whether continuity alone is also sufficient. This was shown to be wrong by Henrik Petrini who gave an example of a continuous ''f'' for which ''w'' is not twice differentiable. The solution is not unique, since addition of any harmonic function to ''w'' will not affect the equation. This fact can be used to prove existence and uniqueness of solutions to the Dirichlet problem for the Poisson equation in suitably regular domains, and for suitably well-behaved functions ''f'': one first applies a Newtonian potential to obtain a solution, and then adjusts by adding a harmonic function to get the correct boundary data. The Newtonian potential is defined more broadly as the convolution

\Gamma*\mu(x) = \int_\Gamma(x-y) \, d\mu(y)

when ''μ'' is a compactly supported

Radon measure In mathematics (specifically in measure theory), a Radon measure, named after Johann Radon, is a measure on the -algebra of Borel sets of a Hausdorff topological space that is finite on all compact sets, outer regular on all Borel sets, and ...

. It satisfies the Poisson equation

\Delta w = \mu

in the sense of distributions. Moreover, when the measure is positive, the Newtonian potential is

subharmonic In music, the undertone series or subharmonic series is a sequence of notes that results from inverting the intervals of the overtone series. While overtones naturally occur with the physical production of music on instruments, undertones mus ...

on R^''d''. If ''f'' is a compactly supported

continuous function In mathematics, a continuous function is a function such that a small variation of the argument induces a small variation of the value of the function. This implies there are no abrupt changes in value, known as '' discontinuities''. More preci ...

(or, more generally, a finite measure) that is rotationally invariant, then the convolution of ''f'' with satisfies for ''x'' outside the support of ''f''

f*\Gamma(x) =\lambda \Gamma(x),\quad \lambda=\int_ f(y)\,dy.

In dimension ''d'' = 3, this reduces to Newton's theorem that the potential energy of a small mass outside a much larger spherically symmetric mass distribution is the same as if all of the mass of the larger object were concentrated at its center. When the measure ''μ'' is associated to a mass distribution on a sufficiently smooth hypersurface ''S'' (a Lyapunov surface of Hölder class ''C''^1,α) that divides R^''d'' into two regions ''D''₊ and ''D''₋, then the Newtonian potential of ''μ'' is referred to as a simple layer potential. Simple layer potentials are continuous and solve the Laplace equation except on ''S''. They appear naturally in the study of

electrostatics Electrostatics is a branch of physics that studies slow-moving or stationary electric charges. Since classical antiquity, classical times, it has been known that some materials, such as amber, attract lightweight particles after triboelectric e ...

in the context of the

associated to a charge distribution on a closed surface. If is the product of a continuous function on ''S'' with the (''d'' − 1)-dimensional

Hausdorff measure In mathematics, Hausdorff measure is a generalization of the traditional notions of area and volume to non-integer dimensions, specifically fractals and their Hausdorff dimensions. It is a type of outer measure, named for Felix Hausdorff, that assi ...

, then at a point ''y'' of ''S'', the normal derivative undergoes a jump discontinuity ''f''(''y'') when crossing the layer. Furthermore, the normal derivative of ''w'' is a well-defined continuous function on ''S''. This makes simple layers particularly suited to the study of the Neumann problem for the Laplace equation.

References

* . * . * * * {{Isaac Newton Harmonic functions Isaac Newton Partial differential equations Potential theory Singular integrals

See also

References