Videos July 25
FRIDAY JULY 25
Video 1
Talk 1. Bob Coecke
Compatibility vs complementarity: algebra, diagrammatics, information flows, and toy models.
[googlevideo]http://video.google.com/videoplay?docid=4459026804369130664[/googlevideo]
Video 2 : Bob Coecke
Compatibility vs complementarity: algebra, diagrammatics, information flows, and toy models.
(concluded) followed by First Part of
Basil Hiley
From Process to Clifford Algebras: a different approach to Quantum Phenomena.
[googlevideo]http://video.google.com/videoplay?docid=-8873830150168522750[/googlevideo]
Video 3
Basil Hiley
From Process to Clifford Algebras:
a different approach to Quantum Phenomena (continued)
[googlevideo]http://video.google.com/videoplay?docid=-8460269022904653544[/googlevideo]
Video 4
Basil Hiley
From Process to Clifford Algebras: a
different approach to Quantum Phenomena (continued)
[googlevideo]http://video.google.com/videoplay?docid=7494370249393797952[/googlevideo]
Video 5
Basil Hiley
From Process to Clifford Algebras: a
different approach to Quantum Phenomena
(concluded) followed by Talk by
Georg Wikman :
(Part 1 : Notions of Order and Structure and some views of the Nature of Mathematics inspired by David Bohm. Part 2 : The Mathematical Representation of Different yet Indistinguishable Entities
[googlevideo]http://video.google.com/videoplay?docid=-2582815046584109773[/googlevideo]
Video 6
Georg Wikman :
(Part 1 : Notions of Order and Structure and some views of the Nature of Mathematics inspired by David Bohm. Part 2 : The Mathematical Representation of
Different yet Indistinguishable Entities (continued)
[googlevideo]http://video.google.com/videoplay?docid=3731517939861164061[/googlevideo]
Video 7
Georg Wikman :
(Part 1 : Notions of Order and Structure and some views of the Nature of Mathematics inspired by David Bohm. Part 2 : The Mathematical Representation of
Different yet Indistinguishable Entities
(continued and concluded) Followed by First Part of Talk 1 of Saturday 26th July 2008 : Second of 2008 Talks by Roger Penrose
Talk 2 : Twistor Theory in a Cosmological Setting.
[googlevideo]http://video.google.com/videoplay?docid=8552891916972394304[/googlevideo]
[googlevideo]http://video.google.com/videoplay?docid=-1357353559706278753[/googlevideo]
[googlevideo]http://video.google.com/videoplay?docid=6163782787111680904[/googlevideo]
[googlevideo]http://video.google.com/videoplay?docid=-3868805602437231501[/googlevideo]
[googlevideo]http://video.google.com/videoplay?docid=-1095767111005267094[/googlevideo]
[googlevideo]http://video.google.com/?docid=-6742009563712504721[/googlevideo]