Integral Embeddings of Cubic Norm Structures

## Abstract We prove that every simple cubic planar graph admits a planar embedding such that each edge is embedded as a straight line segment of integer length. © 2008 Wiley Periodicals, Inc. J Graph Theory 58:270‐274, 2008

The electronic structure of silicon nanocrystals ($2-6 nm in size) embedded in cubic Gd 2 O 3 epi-layers grown on (1 1 1) Si was analyzed using spectroscopic ellipsometry and photocharging methods. With decreasing nanocrystal size down to the 2 nm range, the optical absorption exhibits a spectacular

In 1981, Borsik and Doboš studied in depth the problem of how to merge, by means of a function, a collection (not necessarily finite) of distance spaces in order to obtain a single one as a result [J. Borsik, J. Doboš, On a product of metric spaces, Math. Slovaca 31 (1981) 193-205]. Later on, Herbur

We study the effect of simultaneous bounds on the local L 1 norms of the second fundamental form and of the Gauss curvature on the geometry of surfaces 7 embedded in a Riemannian manifold M. Such bounds are natural since (together with an area bound) they amount to a local bound on the area of the m

This paper gives an overview of a holistic project dealing with the consistent design of embedded control systems falling into the first level of safety integrity requirements (SIL l) (IEC, 1998). It shows how existing methods can be adapted and reasonably employed, whenever possible, without having

Using Fekete's method we obtain estimates for the L p -norms of minimal integral generalized multivariate polynomials. We particularize these estimates for the cases of ordinary polynomials and quasi-polynomials. We also show the existence of a limit in the minimal quadratic deviations from zero for