A tensor product matrix approximation problem in quantum physics

Answering a conjecture of M. von Golitschek in the negative, a compact set K is constructed on the plane such that not every continuous function on K can be uniformly approximated by continuous functions of the form g(x)+h( y), and yet K does not contain a closed path of points with consequitive poi

## Abstract Let __A__ be a normal operator in ℬ︁(H), H a complex Hilbert space, and let ℛ ~A~ = ≷ {__AX__ ‐ __XA:X ∈ ℬ︁__(__H__)} be the commutator subspace of ℬ︁(__H__) associated with __A__. If __B__ in ℬ︁(__H__) commutes with __A__, then __B__ is orthogonal to ℛ~A~ with respect to the spectral n

2-D linear systems a b s t r a c t By introducing a bivariate matrix-valued linear functional on the scalar polynomial space, a general two-dimensional (2-D) matrix Padé-type approximant (BMPTA) in the inner product space is defined in this paper. The coefficients of its denominator polynomials are

Quantum control plays a key role in quantum technology, in particular for steering quantum systems. As problem size grows exponentially with the system size, it is necessary to deal with fast numerical algorithms and implementations. We improved an existing code for quantum control concerning two li