English

Asymptotically Optimal Multi-Paving

Functional Analysis 2017-08-24 v2 Combinatorics Operator Algebras

Abstract

Anderson's paving conjecture, now known to hold due to the resolution of the Kadison-Singer problem asserts that every zero diagonal Hermitian matrix admits non-trivial pavings with dimension independent bounds. In this paper, we develop a technique extending the arguments of Marcus, Spielman and Srivastava in their solution of the Kadison-Singer problem to show the existence of non-trivial pavings for collections of matrices. We show that given zero diagonal Hermitian contractions A(1),,A(k)Mn(C)A^{(1)}, \cdots, A^{(k)} \in M_n(\mathbb{C}) and ϵ>0\epsilon > 0, one may find a paving X1⨿⨿Xr=[n]X_1 \amalg \cdots \amalg X_r = [n] where r18kϵ2r \leq 18k\epsilon^{-2} such that, λmax(PXiA(j)PXi)<ϵ,i[r],j[k].\lambda_{max} (P_{X_i} A^{(j)} P_{X_i}) < \epsilon, \quad i \in [r], \, j \in [k]. As a consequence, we get the correct asymptotic estimates for paving general zero diagonal matrices; zero diagonal contractions can be (O(ϵ2),ϵ)(O(\epsilon^{-2}),\epsilon) paved. As an application, we give a simplified proof wth slightly better estimates of a theorem of Johnson, Ozawa and Schechtman concerning commutator representations of zero trace matrices.

Cite

@article{arxiv.1706.03737,
  title  = {Asymptotically Optimal Multi-Paving},
  author = {Mohan Ravichandran and Nikhil Srivastava},
  journal= {arXiv preprint arXiv:1706.03737},
  year   = {2017}
}

Comments

23 pages. In the previous version, we had erroneously claimed that the main theorem in this paper implies a polylogarithmic bound in the commutator theorem of Johnson, Ozawa and Schechtman. This has been corrected with a weaker bound. The main results in the paper are unchanged

R2 v1 2026-06-22T20:16:34.587Z