Funk transform

Template:Short description In the mathematical field of integral geometry, the Funk transform (also known as Minkowski–Funk transform, Funk–Radon transform or spherical Radon transform) is an integral transform defined by integrating a function on great circles of the sphere. It was introduced by Paul Funk in 1911, based on the work of Template:Harvtxt. It is closely related to the Radon transform. The original motivation for studying the Funk transform was to describe Zoll metrics on the sphere.

The Funk transform is defined as follows. Let ƒ be a continuous function on the 2-sphere S² in R³. Then, for a unit vector x, let

${\displaystyle Ff(𝐱)={\int }_{𝐮\in C(𝐱)}f(𝐮)ds(𝐮)}$

where the integral is carried out with respect to the arclength ds of the great circle C(x) consisting of all unit vectors perpendicular to x:

${\displaystyle C(𝐱)=\{𝐮\in S^2\mid 𝐮\cdot 𝐱=0\}.}$

The Funk transform annihilates all odd functions, and so it is natural to confine attention to the case when ƒ is even. In that case, the Funk transform takes even (continuous) functions to even continuous functions, and is furthermore invertible.

Every square-integrable function ${\displaystyle f\in L^2(S^2)}$ on the sphere can be decomposed into spherical harmonics ${\displaystyle Y_n^k}$

${\displaystyle f={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}{\displaystyle \sum _{k=-n}^n}\hat{f}(n,k)Y_n^k.}$

Then the Funk transform of f reads

${\displaystyle Ff={\displaystyle \sum _{n=0}^{\mathrm{\infty }}}{\displaystyle \sum _{k=-n}^n}{P}_n(0)\hat{f}(n,k)Y_n^k}$

where ${\displaystyle P_{2n+1}(0)=0}$ for odd values and

${\displaystyle P_{2n}(0)=(-1{)}^n\frac{1\cdot 3\cdot 5\cdots 2n-1}{2\cdot 4\cdot 6\cdots 2n}=(-1{)}^n\frac{(2n-1)!!}{(2n)!!}}$

for even values. This result was shown by Template:Harvtxt.

Another inversion formula is due to Template:Harvtxt. As with the Radon transform, the inversion formula relies on the dual transform F* defined by

${\displaystyle (F^{\ast }f)(p,𝐱)=\frac{1}{2\pi \cos p}{\int }_{\Vert 𝐮\Vert =1,𝐱\cdot 𝐮=\sin p}f(𝐮)|d𝐮|.}$

This is the average value of the circle function ƒ over circles of arc distance p from the point x. The inverse transform is given by

${\displaystyle f(𝐱)=\frac{1}{2\pi }{\{\frac{d}{du}{\int }_0^u{F}^{\ast }(Ff)({\cos }^{-1}v,𝐱)v(u^2-v^2{)}^{-1/2}dv\}}_{u=1}.}$

The classical formulation is invariant under the rotation group SO(3). It is also possible to formulate the Funk transform in a manner that makes it invariant under the special linear group SL(3,R) Template:Harv. Suppose that ƒ is a homogeneous function of degree −2 on R³. Then, for linearly independent vectors x and y, define a function φ by the line integral

${\displaystyle \phi (𝐱,𝐲)=\frac{1}{2\pi }\oint f(u𝐱+v𝐲)(udv-vdu)}$

taken over a simple closed curve encircling the origin once. The differential form

${\displaystyle f(u𝐱+v𝐲)(udv-vdu)}$

is closed, which follows by the homogeneity of ƒ. By a change of variables, φ satisfies

${\displaystyle \varphi (a𝐱+b𝐲,c𝐱+d𝐲)=\frac{1}{|ad-bc|}\varphi (𝐱,𝐲),}$

and so gives a homogeneous function of degree −1 on the exterior square of R³,

${\displaystyle Ff(𝐱\wedge 𝐲)=\varphi (𝐱,𝐲).}$

The function Fƒ : Λ²R³ → R agrees with the Funk transform when ƒ is the degree −2 homogeneous extension of a function on the sphere and the projective space associated to Λ²R³ is identified with the space of all circles on the sphere. Alternatively, Λ²R³ can be identified with R³ in an SL(3,R)-invariant manner, and so the Funk transform F maps smooth even homogeneous functions of degree −2 on R³\{0} to smooth even homogeneous functions of degree −1 on R³\{0}.

The Funk-Radon transform is used in the Q-Ball method for Diffusion MRI introduced by Template:Harvtxt. It is also related to intersection bodies in convex geometry. Let ${\displaystyle K\subset {ℝ}^d}$ be a star body with radial function ${\displaystyle {\rho }_K(𝒙)=\max \{t:t𝒙\in K\},}$ ${\displaystyle x\in S^{d-1}}$. Then the intersection body IK of K has the radial function ${\displaystyle {\rho }_{IK}=F{\rho }_K}$ Template:Harv.

• Radon transform
• Spherical mean

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