If you provide more information or clarify which Chung probability distribution or theorem (e.g., Chung-Fuchs, Chung-Lai, or Chung-Sobel) you are referring to, I may provide you a more accurate response and high-quality equations.
However, I assume you are looking for , which doesn't exist; I suggest **F Chung - type Distribution.'
In 1946, Chung and Fuchs proved a theorem that provides a sufficient condition for the law of the iterated logarithm (LIL) to hold. chung probability pdf
Here, I couldn't find or assume well known standard Chung distribution.
References: Chung, K. L., & Fuchs, W. H. J. (1946). On the law of the iterated logarithm. Proceedings of the American Mathematical Society, 2(5), 312-319. If you provide more information or clarify which
Could you give more explanation on chung assumputions Or Provide Assumuption on chung distiribution
Assuming you're referring to the Chung's theorem related to the law of the iterated logarithm, I provide you with a brief overview. References: Chung, K
Let $X$ be a random variable. Assume that