REVIEW
How many vectors are needed to compute (p,q)-summing norms?
Not yet reviewed by Pith; the record is open.
This paper has not been read by Pith yet. Machine review is queued; the pith claim, tier, and objections will appear here once it completes.
SPECIMEN: schema-true, not a live event
T0 review · schema-true
One-sentence machine reading of the paper's core claim.
pith:XXXXXXXX · record.json · timestamp
How many vectors are needed to compute (p,q)-summing norms?
classification
math.FA
keywords
fracalphacomputeconditionexistsfurthermoregrowthinfty
read the original abstract
We will show that for $q<p$ there exists an $\al < \infty$ such that \[ \pi_{pq}(T) \pl \le c_{pq} \pi_{pq}^{[n^{\alpha}]}(T) \mbox{for all $T$ of rank $n$.}\] Such a polynomial number is only possible if $q=2$ or $q<p$. Furthermore, the growth rate is linear if $q=2$ or $\frac{1}{q}-\frac{1}{p}>\frac{1}{2}$. Unless $\frac{1}{q}-\frac{1}{p}=\frac{1}{2}$ this is also a necessary condition .
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.