biortogonale

Biortogonale refers to a pair of sequences or functions that have a specific orthogonality property. In mathematics, orthogonality generally means that the inner product of two distinct elements is zero. Biortogonale sequences, however, extend this concept to two different sequences. Let's consider two sequences, {u_i} and {v_j}, indexed by i and j. These sequences are biortogonale if their inner product, typically defined as an integral or a sum, is zero when the indices are different (i ≠ j) and non-zero when the indices are the same (i = j).

More formally, for discrete sequences {u_i}_{i=1}^n and {v_j}_{j=1}^n, they are biortogonale if <u_i, v_j> = c_i δ_{ij},

The concept of biortogonale sequences is important in various fields, including approximation theory, numerical analysis, and