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\Large Name of class \quad\href{http://math.chapman.edu/cgi-bin/structures?action=edit;id=Template}{edit} |
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\Large Associative algebras \quad\href{http://math.chapman.edu/cgi-bin/structures?action=edit;id=Associative_algebras}{edit} |
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\abbreviation{Abbr} |
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\abbreviation{AAlg} |
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A ... is a structure $\mathbf{A}=\langle A,...\rangle$ of type $\langle ...\rangle$ such that $\langle A,...\rangle$ is a \href{Name_of_class.pdf}{name of class} $op_1$ is (name of property): $axiom_1$ |
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An associative algebra is a \href{Nonassociative_algebras.pdf}{(nonassociative) algebra} $\mathbf{A}=\langle A,+,-,0,\cdot,s_r\ (r\in F)\rangle$ where $\mathbf F$ is a \href{Fields.pdf}{field} such that |
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$op_2$ is ...: $...$ |
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$\cdot$ is associative: $(xy)z=x(yz)$ |
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