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• Multicomplex_number abstract "In mathematics, the multicomplex number systems Cn are defined inductively as follows: Let C0 be the real number system. For every n > 0 let in be a square root of −1, that is, an imaginary number. Then . In the multicomplex number systems one also requires that (commutativity). Then C1 is the complex number system, C2 is the bicomplex number system, C3 is the tricomplex number system of Corrado Segre, and Cn is the multicomplex number system of order n.Each Cn forms a Banach algebra. G. Bayley Price has written about the function theory of multicomplex systems, providing details for the bicomplex system C2.The multicomplex number systems are not to be confused with Clifford numbers (elements of a Clifford algebra), since Clifford's square roots of −1 anti-commute (when m ≠ n for Clifford). With respect to subalgebra Ck, k = 0, 1, ..., n − 1, the multicomplex system Cn is of dimension 2n − k over Ck.".
• Multicomplex_number wikiPageID "6339361".
• Multicomplex_number wikiPageRevisionID "580008005".
• Multicomplex_number hasPhotoCollection Multicomplex_number.
• Multicomplex_number subject Category:Hypercomplex_numbers.
• Multicomplex_number type Abstraction100002137.
• Multicomplex_number type Amount105107765.
• Multicomplex_number type Attribute100024264.
• Multicomplex_number type HypercomplexNumbers.
• Multicomplex_number type Magnitude105090441.
• Multicomplex_number type Number105121418.
• Multicomplex_number type Property104916342.
• Multicomplex_number comment "In mathematics, the multicomplex number systems Cn are defined inductively as follows: Let C0 be the real number system. For every n > 0 let in be a square root of −1, that is, an imaginary number. Then . In the multicomplex number systems one also requires that (commutativity). Then C1 is the complex number system, C2 is the bicomplex number system, C3 is the tricomplex number system of Corrado Segre, and Cn is the multicomplex number system of order n.Each Cn forms a Banach algebra. G.".
• Multicomplex_number label "Multicomplex number".
• Multicomplex_number label "Nombre multicomplexe".
• Multicomplex_number label "多重复数".
• Multicomplex_number sameAs Nombre_multicomplexe.
• Multicomplex_number sameAs m.0g1tb5.
• Multicomplex_number sameAs Q1084631.
• Multicomplex_number sameAs Q1084631.
• Multicomplex_number sameAs Multicomplex_number.
• Multicomplex_number wasDerivedFrom Multicomplex_number?oldid=580008005.
• Multicomplex_number isPrimaryTopicOf Multicomplex_number.