MPI-I-93-144
A lower bound for area-universal graphs
Bilardi, G. and Chaudhuri, Shiva and Dubhashi, Devdatt P. and Mehlhorn, Kurt
October 1993, 7 pages.
.
Status: available - back from printing
We establish a lower bound on the efficiency of area--universal circuits. The area $A_u$ of every graph $H$ that can host
any graph $G$ of area (at most) $A$ with dilation $d$,
and congestion $c \leq \sqrt{A}/\log\log A$ satisfies the tradeoff
$$
A_u = \Omega ( A \log A / (c^2 \log (2d)) ).
$$
In particular, if $A_u = O(A)$ then $\max(c,d) = \Omega(\sqrt{\log A} / \log\log A)$.
URL to this document: https://domino.mpi-inf.mpg.de/internet/reports.nsf/NumberView/1993-144
BibTeX
@TECHREPORT{BilardiChaudhuriDubhashiMehlhorn93,
AUTHOR = {Bilardi, G. and Chaudhuri, Shiva and Dubhashi, Devdatt P. and Mehlhorn, Kurt},
TITLE = {A lower bound for area-universal graphs},
TYPE = {Research Report},
INSTITUTION = {Max-Planck-Institut f{\"u}r Informatik},
ADDRESS = {Im Stadtwald, D-66123 Saarbr{\"u}cken, Germany},
NUMBER = {MPI-I-93-144},
MONTH = {October},
YEAR = {1993},
ISSN = {0946-011X},
}