tripledeterminates

Tripledeterminates are a class of special determinants formed by constructing a three-dimensional array of elements and computing a determinant-like value across this array. Unlike standard determinants, which are calculated from a two-dimensional square matrix, tripledeterminates involve a three-dimensional cubic array of elements, often referred to as a tensor or a multidimensional matrix.

The concept of tripledeterminates emerges in advanced linear algebra and multilinear algebra, where it extends the

Calculating a tripledeterminant typically involves a generalization of the Leibniz expansion used for ordinary determinants, summing

The theory of tripledeterminates is relevant in areas such as algebraic geometry, tensor analysis, and theoretical

While not as widely used as standard determinants, tripledeterminates remain an important theoretical concept for exploring