[Congressional Record (Bound Edition), Volume 158 (2012), Part 12]
[House]
[Pages 17026-17027]
[From the U.S. Government Publishing Office, www.gpo.gov]




                      THE THEORY OF VECTOR BUNDLES

  (Mr. McNERNEY asked and was given permission to address the House for 
1 minute and to revise and extend his remarks.)
  Mr. McNERNEY. Mr. Speaker, I rise today to announce the discovery of 
a new breakthrough in mathematics in the theory of vector bundles.
  The theory of vector bundles plays a crucial role in modern 
mathematics. Part of the interest comes from its application to quantum 
mechanics, the theory that makes modern electronics possible. In 
quantum mechanics, a particle has a position, which is a point in 
space-time, as well as an internal structure, which is described by the 
theory of complex vector bundles.
  Over the last few years, the Boij-Soderberg theory has given a new 
approach to vector bundles in several important areas. Just yesterday, 
the Mathematical Sciences Research Institute in Berkeley, California, 
announced that several young scientists collaborated to discover how to 
extend this theory into new places, such as spheres.
  The discovery is a significant accomplishment, and I commend these 
young scientists for their hard work and dedication. It's because of 
efforts like this that the U.S. continues to be a leader in innovation.

[[Page 17027]]



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