Solution to a system of real quaternion matrix equations encompassing η-Hermicity

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摘要

Let Hm×n be the set of all m × n matrices over the real quaternion algebra H={c0+c1i+c2j+c3k∣i2=j2=k2=ijk=−1,c0,c1,c2,c3∈R}. A∈Hn×n is known to be η-Hermitian if A=Aη*=−ηA*η,η∈{i,j,k} and A* means the conjugate transpose of A. We mention some necessary and sufficient conditions for the existence of the solution to the system of real quaternion matrix equations including η-Hermicity A1X=C1,A2Y=C2,YB2=D2,Y=Yη*,A3Z=C3,ZB3=D3,Z=Zη*,A4X+(A4X)η*+B4YB4η*+C4ZC4η*=D4,and also construct the general solution to the system when it is consistent. The outcome of this paper diversifies some particular results in the literature. Furthermore, we constitute an algorithm and a numerical example to comprehend the approach established in this treatise.

论文关键词:Linear matrix equation,η-Hermitian solution,Quaternion matrix,Moore–Penrose inverse,Rank,General solution

论文评审过程:Received 2 March 2015, Revised 22 May 2015, Accepted 24 May 2015, Available online 24 June 2015, Version of Record 24 June 2015.

论文官网地址:https://doi.org/10.1016/j.amc.2015.05.104