Add to ORKGWe study the velocity distribution in spherical collapses and cluster-pair collisions by use of N-body simulations. Reflecting the violent gravitational processes, the velocity distribution of the resultant quasistationary state generally becomes non-Gaussian. Through the strong mixing of the violent process, there appears a universal non-Gaussian velocity distribution, which is a democratic (equal-weighted) superposition of many Gaussian distributions (DT distribution). This is deeply related with the local virial equilibrium and the linear mass-temperature relation which characterize the system. We show the robustness of this distribution function against various initial conditions which leads to the violent gravitational process. T...
We explore the possibility of putting constraints on dark energy models with statistical property of...
Fractal structures and non-Gaussian velocity distributions are characteristic properties commonly ob...
We develop a non-perturbative method to derive the probability distribution ${\cal P}(\delta_{R})$ o...
We study the velocity distribution in spherical collapses and cluster-pair collisions by use of N-bo...
The results of collisionless n-body simulations are presented. We discuss the formation of the veloc...
By means of N-body simulations, we study the evolution of gravity-dominated systems from an early re...
Long-range attractive potentials cause self-gravitating N-body systems to exhibit not only chaotic b...
Long-range attractive potentials cause self-gravitating N-body systems to exhibit not only chaotic b...
AbstractLong-range attractive potentials cause self-gravitating N-body systems to exhibit not only c...
AbstractLong-range attractive potentials cause self-gravitating N-body systems to exhibit not only c...
N-body simulations of collisionless collapse have offered important clues to the construction of rea...
金沢大学理工研究域機械工学系Long-range attractive potentials cause self-gravitating N-body systems to exhibit not ...
Non-Gaussian velocity distribution in star forming region is reproduced by inelastic clump collision...
We study the one-point probability distribution functions (PDFs) of the peculiar velocity and the de...
We study the one-point probability distribution functions (PDFs) of the peculiar velocity and the d...
We explore the possibility of putting constraints on dark energy models with statistical property of...
Fractal structures and non-Gaussian velocity distributions are characteristic properties commonly ob...
We develop a non-perturbative method to derive the probability distribution ${\cal P}(\delta_{R})$ o...
We study the velocity distribution in spherical collapses and cluster-pair collisions by use of N-bo...
The results of collisionless n-body simulations are presented. We discuss the formation of the veloc...
By means of N-body simulations, we study the evolution of gravity-dominated systems from an early re...
Long-range attractive potentials cause self-gravitating N-body systems to exhibit not only chaotic b...
Long-range attractive potentials cause self-gravitating N-body systems to exhibit not only chaotic b...
AbstractLong-range attractive potentials cause self-gravitating N-body systems to exhibit not only c...
AbstractLong-range attractive potentials cause self-gravitating N-body systems to exhibit not only c...
N-body simulations of collisionless collapse have offered important clues to the construction of rea...
金沢大学理工研究域機械工学系Long-range attractive potentials cause self-gravitating N-body systems to exhibit not ...
Non-Gaussian velocity distribution in star forming region is reproduced by inelastic clump collision...
We study the one-point probability distribution functions (PDFs) of the peculiar velocity and the de...
We study the one-point probability distribution functions (PDFs) of the peculiar velocity and the d...
We explore the possibility of putting constraints on dark energy models with statistical property of...
Fractal structures and non-Gaussian velocity distributions are characteristic properties commonly ob...
We develop a non-perturbative method to derive the probability distribution ${\cal P}(\delta_{R})$ o...