how to solve this matrix equation?

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Owen
Owen el 18 de Feb. de 2014
Comentada: Star Strider el 18 de Feb. de 2014
Hello,
The product of a 3x5 matrix B and a 5x3 matrix K shall be a unit matrix.
B = [0 3 -1 2 1;-4 0 -1 -3 1;0 0 3 -2 3]
I = eye(3,3)
B*K = I
The question is how to calculate K so that all the elements in K are integers. I know there are many Ks.
Senmeis
  2 comentarios
Thomas
Thomas el 18 de Feb. de 2014
Editada: Thomas el 18 de Feb. de 2014
I thought non-square matrices are non invertible.. you might have a left inverse and right inverse.. is K your right inverse?
John D'Errico
John D'Errico el 18 de Feb. de 2014
Thomas - actually, no. This is an underdetermined linear Diophantine system. The solution is neatly resolved in the paper I linked in my answer, including showing how to know if a solution exists at all.
However, in general, suppose we ignored the integer issue. As long as the system has full row rank, then a right inverse (K is clearly the right inverse that is requested) DOES always exist, but it will not be unique for an underdetermined system.
Of course, a left inverse can NEVER exist for an n-by-m matrix with n<m, even ignoring issues of uniqueness. There cannot exist a matrix U such that U*B=eye(m), since row rank of B is no larger than n, and we have n<m. We cannot multiply B by a matrix and increase the row rank, and we know that the row rank of eye(m) is clearly m.

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John D'Errico
John D'Errico el 18 de Feb. de 2014
This paper sums up the answer nicely, and provides the solution in a nice readable manner.

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