"Convergence in probability" is a technical term in relation to a series of random variables. Not clear whether this was your question though, I suggest providing more context.
The probability is 1.The probability is 1.The probability is 1.The probability is 1.
For any event A, Probability (not A) = 1 - Probability(A)
They are both measures of probability.
The probability is 1/2.The probability is 1/2.The probability is 1/2.The probability is 1/2.
The probability of no rain is the complement of the probability of rain. If the probability of rain is 0.99, then the probability of no rain is calculated as 1 - 0.99, which equals 0.01. Therefore, there is a 1% chance of no rain.
Patrick Billingsley has written: 'Ergodic theory and information' -- subject(s): Ergodic theory, Statistical communication theory, Coding theory, Information theory 'Statistical inference for management and economics' -- subject(s): Statistical methods, Statistics, Social sciences, Economics 'Weak Convergence of Measures' 'Weak convergence of measures: applications in probability' -- subject(s): Probabilities, Convergence, Metric spaces, Measure theory 'Probability and measure' -- subject(s): Probabilities, Measure theory
Convergence is a noun.
A. W. van der Vaart has written: 'Asymptotic statistics' -- subject(s): Mathematical statistics, Asymptotic theory 'Weak convergence and empirical processes' -- subject(s): Stochastic processes, Convergence, Distribution (Probability theory), Sampling (Statistics)
The three types of convergence are geographic convergence (physical distance), technological convergence (integration of different technologies), and economic convergence (alignment of economies).
The motto of Division of IT Convergence Engineering is 'The World's Best in IT Convergence Engineering!'.
School of convergence was created in 2001.
Convergence - novel - was created in 1997.
Convergence - journal - was created in 1995.
The Convergence of the Twain was created in 1915.
describe convergence in a CRT television receiver
Technologicaly convergence
"Conv-prob spec cond" likely refers to "convergent probability under specified conditions." This term is used in statistics to describe the likelihood of a sequence of random variables converging to a specified value under certain conditions or assumptions. It indicates the probability of convergence as conditions are met.