biquaternions lie algebra and complex-projective spaces
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abstract
in this paper, lie group structure and lie algebra structure of unit complex 3-sphere are studied. in order to do this, adjoint representations of unit biquaternions (complexified quaternions) are obtained. also, a correspondence between the elements of and the special complex unitary matrices (2) is given by expressing biquaternions as 2-dimensional bicomplex numbers . the relation among the special orthogonal group , the quotient group of unit real quaternions and the projective space given as is known as the euclidean-projective space [toth g. glimpses of algebra and geometry. springer-verlag; 1998]. this relation is generalized to the complex-projective space and is obtained as .
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Journal title:
caspian journal of mathematical sciencesPublisher: university of mazandaran
ISSN 1735-0611
volume
issue Articles in Press 2014
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