The matrix equation aXm+bYn=cI over M2(Z)
Abstract
Let N be the set of all positive integers and let a,\, b,\, c be nonzero integers such that (a,\, b,\, c)=1. In this paper, we prove the following three results: (1) the solvability of the matrix equation aXm+bYn=cI,\,X,\,Y∈ M2(Z),\, m,\, n∈N can be reduced to the solvability of the corresponding Diophantine equation if XY≠ YX and the solvability of the equation axm+byn=c,\, m,\, n∈N in quadratic fields if XY=YX; (2) we determine all non-commutative solutions of the matrix equation Xn+Yn=cnI,\,X,\,Y∈ M2(Z),\,n∈N,\,n≥3, and the solvability of this matrix equation can be reduced to the solvability of the equation xn+yn=cn,\, n∈N,\,n≥3 in quadratic fields if XY=YX; (3) we determine all solutions of the matrix equation aX2+bY2=cI,\,X,\,Y∈ M2(Z).
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