On the number of active nodes in a multicomputer system

We consider t-designs with \*=1 (generalized Steiner systems) for which the block size is not necessarily constant. An inequality for the number of blocks is derived. For t=2, this inequality is the well known De Bruijn Erdo s inequality. For t>2 it has the same order of magnitude as the Wilson Petr

Canonical molecular distribution was introduced to analyze characteristics of nucleate boiling when the liquid molecular number is very small. The minimum bulk phase volume in which phase change was able to occur was determined from the thermodynamic theory of bubble formation in a superheated liqui

## Abstract A Steiner quadruple system of order 2^__n__^ is __Semi‐Boolean__ (SBQS(2^__n__^) in short) if all its derived triple systems are isomorphic to the point‐line design associated with the projective geometry __PG__(__n__−1, 2). We prove by means of explicit constructions that for any __n__

## Abstract It is well‐known in motor control literature that a response time (RT) increases as a logarithmic function of the number of response alternatives (NA) (Hick's law). In this study, we identified neural correlates for this relationship using event‐related functional MRI and a choice finge