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 Dirichlet space on the domain

\Omega \subseteq \mathbb, \, \mathcal(\Omega)

(named after

Peter Gustav Lejeune Dirichlet Johann Peter Gustav Lejeune Dirichlet (; ; 13 February 1805 – 5 May 1859) was a German mathematician. In number theory, he proved special cases of Fermat's last theorem and created analytic number theory. In analysis, he advanced the theory o ...

), is the

reproducing kernel Hilbert space In functional analysis, a reproducing kernel Hilbert space (RKHS) is a Hilbert space of functions in which point evaluation is a continuous linear functional. Specifically, a Hilbert space H of functions from a set X (to \mathbb or \mathbb) is ...

holomorphic function In mathematics, a holomorphic function is a complex-valued function of one or more complex variables that is complex differentiable in a neighbourhood of each point in a domain in complex coordinate space . The existence of a complex de ...

s, contained within the

Hardy space In complex analysis, the Hardy spaces (or Hardy classes) H^p are spaces of holomorphic functions on the unit disk or upper half plane. They were introduced by Frigyes Riesz , who named them after G. H. Hardy, because of the paper . In real anal ...

H^2(\Omega)

, for which the ''Dirichlet integral'', defined by :

\mathcal(f) :=  \iint_\Omega , f^\prime(z), ^2 \, dA = \iint_\Omega , \partial_x f, ^2 + , \partial_y f, ^2 \, dx \, dy

is finite (here ''dA'' denotes the area Lebesgue measure on the complex plane

\mathbb

). The latter is the integral occurring in

Dirichlet's principle In mathematics, and particularly in potential theory, Dirichlet's principle is the assumption that the minimizer of a certain energy functional is a solution to Poisson's equation. Formal statement Dirichlet's principle states that, if the functi ...

for

harmonic functions 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 ...

. The Dirichlet integral defines a

seminorm In mathematics, particularly in functional analysis, a seminorm is like a Norm (mathematics), norm but need not be positive definite. Seminorms are intimately connected with convex sets: every seminorm is the Minkowski functional of some Absorbing ...

\mathcal(\Omega)

. It is not a

norm Norm, the Norm or NORM may refer to: In academic disciplines * Normativity, phenomenon of designating things as good or bad * Norm (geology), an estimate of the idealised mineral content of a rock * Norm (philosophy), a standard in normative e ...

in general, since

\mathcal(f) = 0

whenever ''f'' is a

constant function In mathematics, a constant function is a function whose (output) value is the same for every input value. Basic properties As a real-valued function of a real-valued argument, a constant function has the general form or just For example, ...

. For

f,\, g \in \mathcal(\Omega)

, we define :

\mathcal(f, \, g) : =  \iint_\Omega f'(z) \overline \, dA(z).

This is a semi-inner product, and clearly

\mathcal(f, \, f) = \mathcal(f)

. We may equip

\mathcal(\Omega)

with an

inner product In mathematics, an inner product space (or, rarely, a Hausdorff pre-Hilbert space) is a real vector space or a complex vector space with an operation called an inner product. The inner product of two vectors in the space is a scalar, ofte ...

given by :

\langle f, g \rangle_ := \langle f, \, g \rangle_ + \mathcal(f, \, g) \; \; \; \; \; (f, \, g \in \mathcal(\Omega)),

where

\langle \cdot, \, \cdot \rangle_

is the usual inner product on

H^2 (\Omega).

The corresponding norm

\,  \cdot \, _

is given by :

\, f\, ^2_ := \, f\, ^2_ + \mathcal(f) \; \; \; \; \; (f \in \mathcal (\Omega)).

Note that this definition is not unique, another common choice is to take

\, f\, ^2 = , f(c), ^2 + \mathcal(f)

, for some fixed

c \in \Omega

. The Dirichlet space is not an

algebra Algebra is a branch of mathematics that deals with abstract systems, known as algebraic structures, and the manipulation of expressions within those systems. It is a generalization of arithmetic that introduces variables and algebraic ope ...

, but the space

\mathcal(\Omega) \cap H^\infty(\Omega)

is a

Banach algebra In mathematics, especially functional analysis, a Banach algebra, named after Stefan Banach, is an associative algebra A over the real or complex numbers (or over a non-Archimedean complete normed field) that at the same time is also a Banach sp ...

, with respect to the norm :

\, f\, _ := \, f\, _ + \mathcal(f)^ \; \; \; \; \; (f \in \mathcal(\Omega) \cap H^\infty(\Omega)).

We usually have

\Omega = \mathbb

(the

unit disk In mathematics, the open unit disk (or disc) around ''P'' (where ''P'' is a given point in the plane), is the set of points whose distance from ''P'' is less than 1: :D_1(P) = \.\, The closed unit disk around ''P'' is the set of points whose d ...

of the

complex plane In mathematics, the complex plane is the plane (geometry), plane formed by the complex numbers, with a Cartesian coordinate system such that the horizontal -axis, called the real axis, is formed by the real numbers, and the vertical -axis, call ...

\mathbb

), in that case

\mathcal(\mathbb):=\mathcal

, and if :

f(z) = \sum_ a_n z^n \; \; \; \; \; (f \in \mathcal),

then :

D(f) =\sum_ n , a_n, ^2,

and :

\, f \, ^2_\mathcal = \sum_ (n+1) , a_n, ^2.

Clearly,

\mathcal

contains all the

polynomials In mathematics, a polynomial is a mathematical expression consisting of indeterminates (also called variables) and coefficients, that involves only the operations of addition, subtraction, multiplication and exponentiation to nonnegative int ...

and, more generally, all functions

f

, holomorphic on

\mathbb

such that

f'

is bounded on

\mathbb

. The

reproducing kernel In functional analysis, a reproducing kernel Hilbert space (RKHS) is a Hilbert space of functions in which point evaluation is a continuous linear functional. Specifically, a Hilbert space H of functions from a set X (to \mathbb or \mathbb) is an ...

\mathcal

w \in \mathbb \setminus \

is given by :

k_w(z) = \frac \log \left( \frac \right) \; \; \; \; \; (z \in \mathbb \setminus \).

References

* * Complex analysis Functional analysis {{mathanalysis-stub

See also

References