ickesingulär

Ickesingulär (non-singular) is a term used in linear algebra to denote a square matrix that is invertible; equivalently, its determinant is nonzero. Invertible matrices have full rank and, in particular, their columns are linearly independent.

Several statements are equivalent to being ickesingulär: the matrix has full rank equal to its size; there

Consequences of ickesingulär include that the inverse exists and is unique, the kernel is {0}, and the

Verification methods include computing the determinant and confirming it is nonzero, determining the rank and checking

Example: A = [[1, 2], [3, 5]] has det(A) = 1×5 − 2×3 = −1 ≠ 0, so it is ickesingulär,