Exact solution of a one-dimensional continuum percolation model

I consider a one dimensional system of particles which interact through a hard core of diameter \si and can connect to each other if they are closer than a distance $d$. The mean cluster size increases as a function of the density $\rho$ until it diverges at some critical density, the percolation threshold. This system can be mapped onto an off-lattice generalization of the Potts model which I have called the Potts fluid, and in this way, the mean cluster size, pair connectedness and percolation probability can be calculated exactly. The mean cluster size is S = 2 \exp[ \rho (d -\si)/(1 - \rho \si)] - 1 and diverges only at the close packing density \rho_{cp} = 1 / \si . This is confirmed by the behavior of the percolation probability. These results should help in judging the effectiveness of approximations or simulation methods before they are applied to higher dimensions.Comment: 21 pages, Late

Superimposed Renewal Processes in Reliability

This paper reviews the existing literature on the superimposed renewal process, with its foci on probabilistic and statistical properties, statistical inference, and applications in reliability analysis and maintenance policy optimisation. It then proposes future research topics

Ресурсоэффективность в бурении скважин

В результате научно-технического прогресса возникают новые альтернативные способы использования ресурсов, добычи полезных ископаемых. В статье авторы рассматривают традиционный и инновационный методы бурения скважин, проводят сравнение и оценку этих методов с точки зрения ресурсоэффективности. Описывается электроимпульсный метод разрушения горных пород, разработанный учеными ТПУ

Analysis of systems of queues in parallel

http://deepblue.lib.umich.edu/bitstream/2027.42/4506/5/bac0514.0001.001.pdfhttp://deepblue.lib.umich.edu/bitstream/2027.42/4506/4/bac0514.0001.001.tx