Tipler cylinder

A Tipler cylinder, also called a Tipler time machine, is a hypothetical object theorized to be a potential mode of time travelalthough results have shown that a Tipler cylinder could only allow time travel if its length were infinite or with the existence of negative energy.

Discovery

The Tipler cylinder was discovered as a solution to the equations of general relativity by Willem Jacob van Stockum[1] in 1936 and Kornel Lanczos[2] in 1924, but not recognized as allowing closed timelike curves[3] until an analysis by Frank Tipler[4] in 1974. Tipler showed in his 1974 paper, "Rotating Cylinders and the Possibility of Global Causality Violation" that in a spacetime containing a massive, infinitely long cylinder which was spinning along its longitudinal axis, the cylinder should create a frame-dragging effect. This frame-dragging effect warps spacetime in such a way that the light cones of objects in the cylinder's proximity become tilted, so that part of the light cone then points backwards along the time axis on a space time diagram. Therefore, a spacecraft accelerating sufficiently in the appropriate direction can travel backwards through time along a closed timelike curve or CTC.[4]

CTCs are associated, in Lorentzian manifolds which are interpreted physically as spacetimes, with the possibility of causal anomalies such as a person going back in time and potentially shooting their own grandfather, although paradoxes might be avoided using some constraint such as the Novikov self-consistency principle. They appear in some of the most important exact solutions in general relativity, including the Kerr vacuum (which models a rotating black hole) and the van Stockum dust (which models a cylindrically symmetrical configuration of rotating pressureless fluid or dust).

Practicality

An objection to the practicality of building a Tipler cylinder was discovered by Stephen Hawking, who provided a proof that according to general relativity it is impossible to build a time machine in any finite region that satisfies the weak energy condition, meaning that the region contains no exotic matter with negative energy. The Tipler cylinder, on the other hand, does not involve any negative energy. Tipler's original solution involved a cylinder of infinite length, which is easier to analyze mathematically, and although Tipler suggested that a finite cylinder might produce closed timelike curves if the rotation rate were fast enough,[5] he did not prove this. But Hawking comments "it can't be done with positive energy density everywhere! I can prove that to build a finite time machine, you need negative energy."[6] Hawking's proof appears in his 1992 paper on the chronology protection conjecture (though the proof is distinct from the conjecture itself, since the proof shows that classical general relativity predicts a finite region containing closed timelike curves can only be created if there is a violation of the weak energy condition in that region, whereas the conjecture predicts that closed timelike curves will prove to be impossible in a future theory of quantum gravity which replaces general relativity). In the paper, he examines "the case that the causality violations appear in a finite region of spacetime without curvature singularities" and proves that "[t]here will be a Cauchy horizon that is compactly generated and that in general contains one or more closed null geodesics which will be incomplete. One can define geometrical quantities that measure the Lorentz boost and area increase on going round these closed null geodesics. If the causality violation developed from a noncompact initial surface, the averaged weak energy condition must be violated on the Cauchy horizon."[7]

In fiction

References

Notes
  1. van Stockum, Willem Jacob (1936). "The Gravitational Field of a Distribution of Particles Rotating about an Axis of Symmetry". Proceedings of the Royal Society of Edinburgh.
  2. Lanczos, Kornel (1997) [1924]. "On a Stationary Cosmology in the Sense of Einstein's Theory of Gravitation". General Relativity and Gravitation. Springland Netherlands. 29 (3): 363–399. doi:10.1023/A:1010277120072.
  3. Earman, John (1995). Bangs, Crunches, Whimpers, and Shrieks: Singularities and Acausalities in Relativistic Spacetimes. Oxford University Press. p. 21. ISBN 0-19-509591-X.
  4. 1 2 Tipler, Frank (1974). "Rotating Cylinders and the Possibility of Global Causality Violation" (PDF). Physical Review D. 9 (8): 2203–2206. Bibcode:1974PhRvD...9.2203T. doi:10.1103/PhysRevD.9.2203. Archived from the original (PDF) on 2009-10-26. Available in GIF format here: pages 1, 2, 3 and 4. See also here.
  5. Earman, John (1995). Bangs, Crunches, Whimpers, and Shrieks: Singularities and Acausalities in Relativistic Spacetimes. Oxford University Press. p. 169. ISBN 0-19-509591-X.
  6. Hawking, Stephen (2002). The Future of Spacetime. W. W. Norton. p. 96. ISBN 0-393-02022-3.
  7. Hawking, Stephen (1992). "Chronology protection conjecture". Physical Review D. 46 (2): 603–611. Bibcode:1992PhRvD..46..603H. doi:10.1103/PhysRevD.46.603.
  8. "Larry Niven Bibliography". News.larryniven.net. Retrieved 2013-04-22.
  9. Time Machines By Paul J. Nahin, page 95
  10. Vinge, Vernor (2004). Marooned in Realtime. Macmillan. p. 174. ISBN 1429915129. Retrieved 2014-03-05.
  11. "by Kris Straub - Starslip (number 569)". Starslip. 2007-07-23. Retrieved 2013-04-22.
  12. "Universal Consoles". Star Trek Online Wiki. Curse, Inc. Retrieved 2014-03-05.
  13. djkaktus. "SCP-2540". SCP Foundation. Retrieved 2 August 2015.
Bibliography
  1. Frank Jennings Tipler, Causality Violation in General Relativity, Ph.D. thesis at the University of Maryland, College Park (1976). Source: Dissertation Abstracts International, Vol. 37-06, Section B, pg. 2923. Also available as Dissertation 76-29,018 from Xerox University Microfilms, Ann Arbor, MI.
  2. Penrose, Roger. "The Question of Cosmic Censorship." Journal of Astrophysics and Astronomy Vol. 20 (September, 1999): 233.
  3. Wald, Robert (ed). Black Holes and Relativistic Stars. University of Chicago Press, 1998. ISBN 0-226-87034-0
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