How "continuity" of a map Τ:M→M, where M is a Minkowski space, can be defined? Obviously I cannot use the "metric" induced by the minkowskian product:
x[itex]\cdot[/itex]y = -x[itex]^{0}[/itex]y[itex]^{0}[/itex]+x[itex]^{i}[/itex]y[itex]^{i}[/itex]
for the definition of coninuity; it is a misinformer about the proximity of points. Should I use the Euclidean metric instead?
Thank's...
x[itex]\cdot[/itex]y = -x[itex]^{0}[/itex]y[itex]^{0}[/itex]+x[itex]^{i}[/itex]y[itex]^{i}[/itex]
for the definition of coninuity; it is a misinformer about the proximity of points. Should I use the Euclidean metric instead?
Thank's...
via Physics Forums RSS Feed http://www.physicsforums.com/showthread.php?t=707940&goto=newpost
0 commentaires:
Enregistrer un commentaire