Notes for AKT-090924-1/0:25:49: Difference between revisions

Latest revision as of 07:56, 15 September 2011

${\mathcal {A}}={\hat {\bigoplus }}{\mathcal {A}}_{n}$ is (in some sense) the double dual of the space of knots

Theorem: ${\mathcal {A}}$ is a commutative co-commutative bi-algebra. (For now, we prove ${\mathcal {A}}$ is a commutative algebra.)

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-<math>A = \bigoplus A_n</math> is (in some sense) the double dual of the space of knots
+<math>\mathcal{A} = \hat{\bigoplus} \mathcal{A}_n</math> is (in some sense) the double dual of the space of knots
-Theorem: <math>A</math> is a commutative co-commutative bi-algebra.
-(for now we prove <math>A</math> is a commutative algebra)
+'''Theorem''': <math>\mathcal{A}</math> is a commutative co-commutative bi-algebra.
+(For now, we prove <math>\mathcal{A}</math> is a commutative algebra.)