Biorthogonal system

In mathematics, a biorthogonal system is a pair of indexed families of vectors $${\displaystyle {\tilde{v}}_i\text{ in }E\text{ and }{\tilde{u}}_i\text{ in }F}$$ such that $${\displaystyle ⟨{\tilde{v}}_i,{\tilde{u}}_j⟩={\delta }_{i,j},}$$ where ${\displaystyle E}$ and ${\displaystyle F}$ form a pair of topological vector spaces that are in duality, ${\displaystyle ⟨\cdot ,\cdot ⟩}$ is a bilinear mapping and ${\displaystyle {\delta }_{i,j}}$ is the Kronecker delta.

An example is the pair of sets of respectively left and right eigenvectors of a matrix, indexed by eigenvalue, if the eigenvalues are distinct.^[1]

A biorthogonal system in which ${\displaystyle E=F}$ and ${\displaystyle {\tilde{v}}_i={\tilde{u}}_i}$ is an orthonormal system.

Related to a biorthogonal system is the projection $${\displaystyle P:=\sum _{i\in I}{\tilde{u}}_i\otimes {\tilde{v}}_i,}$$ where ${\displaystyle (u\otimes v)(x):=u⟨v,x⟩;}$ its image is the linear span of ${\displaystyle \{{\tilde{u}}_i:i\in I\},}$ and the kernel is ${\displaystyle \{⟨{\tilde{v}}_i,\cdot ⟩=0:i\in I\}.}$

Given a possibly non-orthogonal set of vectors ${\displaystyle \mathbf{𝐮}=\left(u_i\right)}$ and ${\displaystyle \mathbf{𝐯}=\left(v_i\right)}$ the projection related is $${\displaystyle P=\sum _{i,j}{u}_i{(⟨\mathbf{𝐯},\mathbf{𝐮}{⟩}^{-1})}_{j,i}\otimes v_j,}$$ where ${\displaystyle ⟨\mathbf{𝐯},\mathbf{𝐮}⟩}$ is the matrix with entries ${\displaystyle {(⟨\mathbf{𝐯},\mathbf{𝐮}⟩)}_{i,j}=⟨v_i,u_j⟩.}$

• ${\displaystyle {\tilde{u}}_i:=(I-P)u_i,}$ and ${\displaystyle {\tilde{v}}_i:=(I-P{)}^{*}{v}_i}$ then is a biorthogonal system.

• Dual basis – Linear algebra concept
• Dual space – In mathematics, vector space of linear forms
• Dual pair
• Orthogonality – Other name of perpendicularity and its generalizations
• Orthogonalization

• Jean Dieudonné, On biorthogonal systems Michigan Math. J. 2 (1953), no. 1, 7–20 [1]

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