rankkritein

Rankkritein is a term used in Finnish mathematical literature to refer to a criterion or condition by which the rank of a matrix or linear transformation is determined. In linear algebra, the rank of a matrix is the dimension of its row space (equivalently, its column space) and equals the maximum number of linearly independent rows or columns. Rankkritein thus provides concrete checks or methods to establish this quantity.

Common ways to determine rank include row reducing a matrix to row echelon form or reduced row

Rank criteria are central to solving linear systems. The system A x = b is solvable if and

Properties related to rank include the inequality rank(AB) ≤ min(rank(A), rank(B)) and the fact that rank(A^T) = rank(A).

In summary, rankkritein encompasses the set of criteria used to determine or reason about the rank of