On Irregularities of Distribution IV

Automatic scheduling for directed acyclic graphs (DAG) and its applications for coarse-grained irregular problems such as large n-body simulation have been studied in the literature. However, solving irregular problems with mixed granularities such as sparse matrix factorization is challenging since

A mathematical model is proposed to illustrate the frequency characteristics of roller bearing vibrations due to surface irregularities which come from manufacturing errors. The bearing vibration is modeled as the system output when it is subjected to the excitations from surface waviness and surfac

## Abstract For any graph __G__, let __n~i~__ be the number of vertices of degree __i__, and $\lambda (G)={max} \_{i\le j}\{ {n\_i+\cdots +n\_j+i-1\over j}\}$. This is a general lower bound on the irregularity strength of graph __G__. All known facts suggest that for connected graphs, this is the a