theoretical physics Theoretical physics is a branch of physics that employs mathematical models and abstractions of physical objects and systems to rationalize, explain and predict natural phenomena. This is in contrast to experimental physics, which uses experim ...

, the Penrose transform, introduced by , is a complex analogue of the

Radon transform In mathematics, the Radon transform is the integral transform which takes a function ''f'' defined on the plane to a function ''Rf'' defined on the (two-dimensional) space of lines in the plane, whose value at a particular line is equal to the l ...

that relates massless fields on spacetime to

cohomology In mathematics, specifically in homology theory and algebraic topology, cohomology is a general term for a sequence of abelian groups, usually one associated with a topological space, often defined from a cochain complex. Cohomology can be viewe ...

of sheaves on

complex projective space In mathematics, complex projective space is the projective space with respect to the field of complex numbers. By analogy, whereas the points of a real projective space label the lines through the origin of a real Euclidean space, the points of a ...

. The projective space in question is the

twistor space In mathematics and theoretical physics (especially twistor theory), twistor space is the complex vector space of solutions of the twistor equation \nabla_^\Omega_^=0 . It was described in the 1960s by Roger Penrose and Malcolm MacCallum. Accordin ...

, a geometrical space naturally associated to the original spacetime, and the twistor transform is also geometrically natural in the sense of

integral geometry In mathematics, integral geometry is the theory of measures on a geometrical space invariant under the symmetry group of that space. In more recent times, the meaning has been broadened to include a view of invariant (or equivariant) transformation ...

. The Penrose transform is a major component of classical

twistor theory In theoretical physics, twistor theory was proposed by Roger Penrose in 1967 as a possible path to quantum gravity and has evolved into a branch of theoretical and mathematical physics. Penrose proposed that twistor space should be the basic arena ...

Overview

Abstractly, the Penrose transform operates on a double

fibration The notion of a fibration generalizes the notion of a fiber bundle and plays an important role in algebraic topology, a branch of mathematics. Fibrations are used, for example, in postnikov-systems or obstruction theory. In this article, all map ...

of a space ''Y'', over two spaces ''X'' and ''Z'' :

Z\xleftarrow Y \xrightarrow X.

In the classical Penrose transform, ''Y'' is the

spin bundle In differential geometry, given a spin structure on an n-dimensional orientable Riemannian manifold (M, g),\, one defines the spinor bundle to be the complex vector bundle \pi_\colon\to M\, associated to the corresponding principal bundle \pi_\col ...

, ''X'' is a compactified and complexified form of

Minkowski space In mathematical physics, Minkowski space (or Minkowski spacetime) () is a combination of three-dimensional Euclidean space and time into a four-dimensional manifold where the spacetime interval between any two events is independent of the inerti ...

and ''Z'' is the twistor space. More generally examples come from double fibrations of the form :

G/H_1\xleftarrow G/(H_1\cap H_2) \xrightarrow G/H_2

where ''G'' is a complex semisimple Lie group and ''H''₁ and ''H''₂ are parabolic subgroups. The Penrose transform operates in two stages. First, one pulls back the sheaf cohomology groups ''H''^''r''(''Z'',F) to the sheaf cohomology ''H''^''r''(''Y'',η⁻¹F) on ''Y''; in many cases where the Penrose transform is of interest, this pullback turns out to be an isomorphism. One then pushes the resulting cohomology classes down to ''X''; that is, one investigates the

direct image In mathematics, the direct image functor is a construction in sheaf theory that generalizes the global sections functor to the relative case. It is of fundamental importance in topology and algebraic geometry. Given a sheaf ''F'' defined on a topolo ...

of a cohomology class by means of the

Leray spectral sequence In mathematics, the Leray spectral sequence was a pioneering example in homological algebra, introduced in 1946 by Jean Leray. It is usually seen nowadays as a special case of the Grothendieck spectral sequence. Definition Let f:X\to Y be a cont ...

. The resulting direct image is then interpreted in terms of differential equations. In the case of the classical Penrose transform, the resulting differential equations are precisely the massless field equations for a given spin.

Example

The classical example is given as follows *The "twistor space" ''Z'' is complex projective 3-space CP³, which is also the

Grassmannian In mathematics, the Grassmannian is a space that parameterizes all -Dimension, dimensional linear subspaces of the -dimensional vector space . For example, the Grassmannian is the space of lines through the origin in , so it is the same as the ...

Gr₁(C⁴) of lines in 4-dimensional complex space. *''X'' = Gr₂(C⁴), the Grassmannian of 2-planes in 4-dimensional complex space. This is a

compactification Compactification may refer to: * Compactification (mathematics), making a topological space compact * Compactification (physics), the "curling up" of extra dimensions in string theory See also * Compaction (disambiguation) Compaction may refer t ...

of complex Minkowski space. *''Y'' is the

flag manifold In mathematics, a generalized flag variety (or simply flag variety) is a homogeneous space whose points are flags in a finite-dimensional vector space ''V'' over a field F. When F is the real or complex numbers, a generalized flag variety is a smoot ...

whose elements correspond to a line in a plane of C⁴. *''G'' is the group SL₄(C) and ''H''₁ and ''H''₂ are the

parabolic subgroup In the theory of algebraic groups, a Borel subgroup of an algebraic group ''G'' is a maximal Zariski closed and connected solvable algebraic subgroup. For example, in the general linear group ''GLn'' (''n x n'' invertible matrices), the subgroup ...

s fixing a line or a plane containing this line. The maps from ''Y'' to ''X'' and ''Z'' are the natural projections.

Penrose–Ward transform

The Penrose–Ward transform is a nonlinear modification of the Penrose transform, introduced by , that (among other things) relates

holomorphic 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 derivativ ...

vector bundle In mathematics, a vector bundle is a topological construction that makes precise the idea of a family of vector spaces parameterized by another space X (for example X could be a topological space, a manifold, or an algebraic variety): to every po ...

s on 3-dimensional complex projective space CP³ to solutions of the

self-dual Yang–Mills equations In mathematics, a duality translates concepts, theorems or mathematical structures into other concepts, theorems or structures, in a one-to-one fashion, often (but not always) by means of an involution operation: if the dual of is , then the ...

on S⁴. used this to describe instantons in terms of algebraic vector bundles on complex projective 3-space and explained how this could be used to classify instantons on a 4-sphere.

References

* * *. * * *; Doctor of Philosophy thesis. * * * *. * {{Authority control Integral geometry