determinantdriven

Determinantdriven is a descriptive term used to characterize approaches in mathematics and its applications that place determinants or their properties at the center of reasoning. In a determinantdriven framework, the value, sign, or magnitude of a determinant informs decisions about feasibility, stability, orientation, or nondegeneracy, and determinants of submatrices (minors) often encode independence or local invertibility.

The term is not a formal theory but a way to describe strategies in which determinant conditions

Limitations include computational cost and numerical sensitivity: calculating determinants for large matrices can be expensive and