English

Real numerical shadow and generalized B-splines

Functional Analysis 2015-05-11 v1 Mathematical Physics math.MP Probability

Abstract

Restricted numerical shadow PAX(z)P^X_A(z) of an operator AA of order NN is a probability distribution supported on the numerical range WX(A)W_X(A) restricted to a certain subset XX of the set of all pure states - normalized, one-dimensional vectors in CN{\mathbb C}^N. Its value at point zCz \in {\mathbb C} equals to the probability that the inner product <uAu>< u |A| u > is equal to zz, where uu stands for a random complex vector from the set XX distributed according to the natural measure on this set, induced by the unitarily invariant Fubini-Study measure. For a Hermitian operator AA of order NN we derive an explicit formula for its shadow restricted to real states, PAR(x)P^{\mathbb R}_A(x), show relation of this density to the Dirichlet distribution and demonstrate that it forms a generalization of the BB-spline. Furthermore, for operators acting on a space with tensor product structure, HAHB{\cal H}_A \otimes {\cal H}_B, we analyze the shadow restricted to the set of maximally entangled states and derive distributions for operators of order N=4.

Keywords

Cite

@article{arxiv.1409.4941,
  title  = {Real numerical shadow and generalized B-splines},
  author = {Charles F. Dunkl and Piotr Gawron and Łukasz Pawela and Zbigniew Puchała and Karol Życzkowski},
  journal= {arXiv preprint arXiv:1409.4941},
  year   = {2015}
}

Comments

39 pages, 7 figures

R2 v1 2026-06-22T05:58:44.470Z