A Note on the Breakdown Time Delay Distribution: The Analytical Properties

We show that a Banach space X has the analytic complete continuity property if and only if for every 1 ≤ p < ∞ and for every f ∈ H p X , the sequence f r n e i• is p-Pettis-Cauchy for every r n ↑ 1. This allows us to show that X has the analytic complete continuity property if and only if L p X has

Electrical breakdown in neon, time delay distribution, Convolution model for time delay distribution, Monte-Carlo method, statistical time delay, formative time delay. PACS 52.80.Hc, 02.50.Ng Results of the statistical analysis of the electrical breakdown time delay for neon-filled tube at 13.3 mbar

We prove that Linnik distributions are geometrically infinitely divisible, and clarify a characterization theorem for Linnik distributions concerning the stability of geometric summation. An explicit expression for absolute moments of Linnik distributions is also given.

Suppose X,, X,, ..., X, are independent and identically distributed random variables with absolutely continuous distribution function F. It is known that if F is standard normal distribution then (i) 2 X : is a chi-square with n degrees of freedom and (ii) nX2 is a chi-square with 1 degrees of freed

A remarkable feature of barrier penetration in quantum theory is that a particle tunneling through a barrier appears to do so in zero time. We analyze the conditions that would make possible an actual measurement of an anomalously short traversal time and conclude that such a measurement cannot be m