1-5 OF 5 RESULTS FOR

twistors

Results shown limited to content with bounding coordinates.
Follow your search
Access your saved searches in your account

Would you like to receive an alert when new items match your search?
Close Modal
Sort by
Journal Article
Published: 01 May 2009
Bulletin of the Seismological Society of America (2009) 99 (2B): 1137–1146.
...Eugeniusz Majewski Abstract A noncommutative (anti-) self-dual Yang–Mills theory as a source of multisoliton solutions of nonlinear wave equations was applied to the description of rotational seismic waves that are excited in the earthquake source. Spinors and twistors are used to describe spin...
FIGURES | View All (8)
Image
Illustration of rotational seismic-wave propagation in a <b>twistor</b> space-time...
Published: 01 May 2009
Figure 6. Illustration of rotational seismic-wave propagation in a twistor space-time ( Majewski, 2008d ). The line denoted by Z represents a twistor that is referred to as a worldline or a seismic ray. The time cone at point R is a null future cone that contains future events. The time cone
Journal Article
Published: 01 May 2009
Seismological Research Letters (2009) 80 (3): 508–511.
... An Asymmetric Micropolar Moment Tensor Derived from a Discrete-Block Model for a Rotating Granular Substructure 
 by Robert J. Twiss Fundamental Deformations in Asymmetric Continuum 
 by Roman Teisseyre and Marek Górski Spinors and Twistors in the Description of Rotational Seismic Waves and Spin...
Journal Article
Published: 01 May 2009
Bulletin of the Seismological Society of America (2009) 99 (2B): 1082–1090.
... , 255 - 272 . Majewski E. ( 2008 ). Twistors as spin and twist solitons , in Physics of Asymmetric Continuum: Extreme and Fracture Processes: Earthquake Rotation and Soliton Waves , Teisseyre...
FIGURES
Journal Article
Published: 01 May 2009
Bulletin of the Seismological Society of America (2009) 99 (2B): 945–957.
.... Knopoff and Y.-T. Chen.** “An Asymmetric Micropolar Moment Tensor Derived from a Discrete-Block Model for a Rotating Granular Substructure,” by R. J. Twiss.** “Fundamental Deformations in Asymmetric Continuum,” by R. Teisseyre and M. Górski.** “Spinors and Twistors in the Description...