Random Processes with Dead Time and Buffer Memories
スポンサーリンク
概要
- 論文の詳細を見る
Extending our previous theory of random processes with dead time [1], we discuss the case where events during the dead time are recorded with the aid of buffer memories. Expressions are given for the probability distribution in the finite time interval in the case of one buffer memory the detection probability for the infinite time interval and the arbitrary number of buffer memories, and the detection probability for the definite resolving time and one buffer memory. The results will be applied to the analysis of rocket data transmitted through a telemeter channel of a finite frequency response, as shown by numerical examples.
- 宇宙航空研究開発機構の論文
著者
-
HAYAKAWA S.
Department of Applied Chemistry, Faculty of Engineering, University of Tokyo
-
Nagase F.
Department Of Physic Nagoya University
-
MAKINO F.
Department of Physic, Nagoya University
関連論文
- Iron and Chromium as Impurities in Artificial Diamonds
- On the Negative π-Meson Capture.
- Nuclear Disintegration by π-Meson Capture
- Neutron Component in Extensive Air Showers.
- Remarks on the Nuclear Disintegration by Meson Capture.
- Directional Distribution of Extensive Air Showers
- On the Electronic Component in Extensive Air Showers.
- Impact of Atomic Data on Tokamak Modeling
- Random Processes with Dead Time and Buffer Memories
- Propagation of the Cosmic Radiation through Intersteller Space
- Remark on the Energy Distribution of Disintegrated μ-Mesons.
- Nucleon-Nucleon Interaction at High Energies.
- The another τ-Meson
- Soft Component in Upper Atmosphere.
- Nuclear Disintegration by π-Meson Capture.
- Propagation of the Cosmic Radiation through Inetrsteller Space
- Remark on the Energy Distribution of Disintegrated μ-Mesons