Misner space is an abstract mathematical

spacetime In physics, spacetime is a mathematical model that combines the three dimensions of space and one dimension of time into a single four-dimensional manifold. Spacetime diagrams can be used to visualize relativistic effects, such as why differ ...

, first described by Charles W. Misner. It is also known as the Lorentzian

orbifold In the mathematical disciplines of topology and geometry, an orbifold (for "orbit-manifold") is a generalization of a manifold. Roughly speaking, an orbifold is a topological space which is locally a finite group quotient of a Euclidean space. D ...

\mathbb^/\text

. It is a simplified, two-dimensional version of the

Taub–NUT space The Taub–NUT metric (,McGraw-Hill ''Science & Technology Dictionary'': "Taub NUT space" ) is an exact solution to Einstein's equations. It may be considered a first attempt in finding the metric of a spinning black hole. It is sometimes also use ...

time. It contains a non-curvature singularity and is an important counterexample to various hypotheses in general relativity.

Metric

The simplest description of Misner space is to consider two-dimensional Minkowski space with the

metric Metric or metrical may refer to: * Metric system, an internationally adopted decimal system of measurement * An adjective indicating relation to measurement in general, or a noun describing a specific type of measurement Mathematics In mathe ...

ds^2= -dt^2 + dx^2,

with the identification of every pair of spacetime points by a constant boost :

(t, x) \to (t \cosh (\pi) + x \sinh(\pi), x \cosh (\pi) + t \sinh(\pi)).

It can also be defined directly on the cylinder manifold

\mathbb \times S

with coordinates

(t', \varphi)

by the metric :

ds^2= -2dt'd\varphi + t'd\varphi^2,

The two coordinates are related by the map :

t= 2 \sqrt \cosh\left(\frac\right)

x= 2 \sqrt \sinh\left(\frac\right)

and :

t'= \frac(x^2 - t^2)

\phi= 2 \tanh^\left(\frac\right)

Causality

Misner space is a standard example for the study of causality since it contains both closed timelike curves and a compactly generated

Cauchy horizon In physics, a Cauchy horizon is a light-like boundary of the domain of validity of a Cauchy problem (a particular boundary value problem of the theory of partial differential equations). One side of the horizon contains closed space-like geodes ...

, while still being flat (since it is just Minkowski space). With the coordinates

(t', \varphi)

, the loop defined by

t = 0, \varphi = \lambda

, with tangent vector

X = (0,1)

, has the norm

g(X,X) = 0

, making it a closed null curve. This is the chronology horizon : there are no closed timelike curves in the region

t < 0

, while every point admits a closed timelike curve through it in the region

t > 0

. This is due to the tipping of the light cones which, for

t < 0

, remains above lines of constant

t

but will open beyond that line for

t > 0

, causing any loop of constant

t

to be a closed timelike curve.

Chronology protection

Misner space was the first spacetime where the notion of chronology protection was used for quantum fields, by showing that in the semiclassical approximation, the expectation value of the stress-energy tensor for the vacuum

\langle T_ \rangle_\Omega

is divergent.

Metric

Causality

Chronology protection

References

Further reading