Infrared fixed point: Difference between revisions

Revision as of 16:03, 29 January 2014

In mathematics and theoretical physics, a bifundamental representation is a representation obtained as a tensor product of two fundamental or antifundamental representations.

For example, the MN-dimensional representation (M,N) of the group

S U (M) \times S U (N)

is a bifundamental representation.

These representations occur in quiver diagrams.

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+In [[mathematics]] and [[theoretical physics]], a '''bifundamental''' representation is a [[representation theory|representation]] obtained as a [[tensor product]] of two [[fundamental representation | fundamental]] or [[antifundamental representation | antifundamental]] representations.
+For example, the ''MN''-dimensional representation (''M'',''N'') of the group
+:<math>SU(M) \times SU(N)</math>
+is a bifundamental representation.
+These representations occur in [[quiver diagram]]s.
+{{algebra-stub}}[[Category:Abstract algebra]]