Let and be Hilbert spaces of dimensions n and m respectively. Assume. For any vector in the tensor product, there exist orthonormal sets and such that, where the scalars are real, non-negative, and, as a set, uniquely determined by.
Proof
The Schmidt decomposition is essentially a restatement of the singular value decomposition in a different context. Fix orthonormal bases and. We can identify an elementary tensor with the matrix, where is the transpose of. A general element of the tensor product can then be viewed as the n × m matrix By the singular value decomposition, there exist an n × n unitary U, m × m unitary V, and a positive semidefinite diagonal n × m matrix Σ such that Write where is n × m and we have Let be the m column vectors of, the column vectors of V, and the diagonal elements of Σ. The previous expression is then Then which proves the claim.
Some observations
Some properties of the Schmidt decomposition are of physical interest.
Spectrum of reduced states
Consider a vector w of the tensor product in the form of Schmidt decomposition Form the rank 1 matrix ρ = w w*. Then the partial trace of ρ, with respect to either system A or B, is a diagonal matrix whose non-zero diagonal elements are |αi |2. In other words, the Schmidt decomposition shows that the reduced state of ρ on either subsystem have the same spectrum.
Schmidt rank and entanglement
The strictly positive values ' in the Schmidt decomposition of w are its Schmidt coefficients. The number of Schmidt coefficients of, counted with multiplicity, is called its Schmidt rank, or Schmidt number'. If w can be expressed as a product then w is called a separable state. Otherwise, w is said to be an entangled state. From the Schmidt decomposition, we can see that w is entangled if and only ifw'' has Schmidt rank strictly greater than 1. Therefore, two subsystems that partition a pure state are entangled if and only if their reduced states are mixed states.
A consequence of the above comments is that, for pure states, the von Neumann entropy of the reduced states is a well-defined measure of entanglement. For the von Neumann entropy of both reduced states of ρ is, and this is zero if and only if ρ is a product state.
Crystal plasticity
In the field of plasticity, crystalline solids such as metals deform plastically primarily along crystal planes. Each plane, defined by its normal vector ν can "slip" in one of several directions, defined by a vector μ. Together a slip plane and direction form a slip system which is described by the Schmidt tensor. The velocity gradient is a linear combination of these across all slip systems where the scaling factor is the rate of slip along the system.