Hyperfunction

In mathematics, hyperfunctions are sums of boundary values of holomorphic functions, and can be thought of informally as distributions of infinite order.

Contents

1 Motivation

2 Formal definition

3 Examples

4 Further reading

Motivation

We want the "boundary value" of a holomorphic function defined on the upper or lower half plane to be a hyperfunction on the real line. The easiest way to achieve this is to say that a hyperfunction is specified by a pair (f, g), where f is a holomorphic function on the lower half plane and g is a holomorphic function on the upper half plane. Informally, the hyperfunction (f, g) is the sum of the boundary values of f and g. If f is holomorphic on the whole complex plane, then it should have the same boundary values when considered as a function on either the upper or lower half plane. So (f, −f) should be considered to be 0. Similarly (f₁, g₁) and (f₂, g₂) represent the same hyperfunction if (and only if) f₁ − f₂ and g₂ − g₁ are restrictions of the same holomorphic function defined on the whole complex plane.

Formal definition

Let $\mathcal{O}$ be the sheaf of holomorphic functions on C and let C⁺ and C⁻ be the upper half plane and lower half plane respectively. Therefore

$\mathbf{C}^+ \cup \mathbf{C}^- = \mathbf{C} \setminus \mathbf{R}.\,$

Then we have

$H^1_{\mathbf{R}}(\mathbf{C}, \mathcal{O}) = (H^0(\mathbf{C}^+, \mathcal{O}) \oplus H^0(\mathbf{C}^-, \mathcal{O}))/H^0(\mathbf{C}, \mathcal{O}).$

Here, the left-hand side is the first sheaf cohomology group.

Define the hyperfunctions on the real line by

$\mathcal{B}(\mathbf{R}) = H^1_{\mathbf{R}}(\mathbf{C}, \mathcal{O}).$

Examples

If f is any holomorphic function on the whole complex plane, then the restriction of f to the real axis is a hyperfunction, represented by either (f, 0) or (0, f).

The Dirac delta "function" is represented by $(1 / z, - 1 / z) / 2π i$ . This is really a restatement of Cauchy's integral formula.

If g is a continuous function (or more generally a distribution) on the real line with support contained in a bounded interval I, then g corresponds to the hyperfunction (f, −f), where f is a holomorphic function on the complement of I defined by

$f(z)={1\over 2\pi i}\int_{x\in I} g(x){dx\over z-x}.$

This function f jumps in value by g(x) when crossing the real axis at the point x. The formula for f follows from the previous example by writing g as the convolution of itself with the Dirac delta function.

If f is any function that is holomorphic everywhere except for an essential singularity at 0 (for example, e^1/z), then (f, −f) is a hyperfunction with support 0 that is not a distribution. If f has a pole of finite order at 0 then (f, −f) is a distribution, so when f has an essential singularity then (f,−f) looks like a "distribution of infinite order" at 0. (Note that distributions always have finite order at any point.)

Hyperfunction

Motivation

Formal definition

Examples

Further reading

See also: Hyperfunction, Cauchy's integral formula, Convolution, Dirac delta function, Distribution, Essential singularity, Holomorphic function, Lower half plane, Mathematics, Real line