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Theorem (Milnor-Moore): A graded, connected, co-commutative bialgebra is the universal enveloping algebra of its space of primitives:

{\mathcal {A}}=U({\mathcal {P}}({\mathcal {A}}))

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	'''Theorem (Milnor-Moore)''': A graded, connected, co-commutative bialgebra is the universal enveloping algebra of its space of primitives.		'''Theorem (Milnor-Moore)''': A graded, connected, co-commutative bialgebra is the universal enveloping algebra of its space of primitives:
			: <math>\mathcal{A}=U(\mathcal{P}(\mathcal{A}))</math>