Add to ORKGLet {Xi, i ≥ 1} be a sequence of negatively associated and strictly stationary ran-dom variables having marginal distribution function F. Suppose ϑl(r, s) = P (X1 ≤ r,Xl+1 ≤ s) − F (r)F (s). We prove an exponential type inequality for estimation of ϑl under some conditions on the covariance structure of those variables. We also show the almost sure convergence of an estimator for the infinite sum that defines the covariance function of the limit empirical process
We prove an exponential inequality for positively associated and strictly stationary random variable...
We present a new exponential inequality as a generalization of that of Sung et al. Sung et al. (2011...
Using the probability inequalities and the weak invariance principles, the limit behavior of the com...
Let fXn; n 1g be a strictly stationary sequence of negatively associated ran-dom variables, with co...
Abstract. Let {Xn, n ≥ 1} be a strictly stationary sequence of neg-atively associated random variabl...
Let [Xn, n1] be a sequence of stationary negatively associated random variables, Sj (l)= li=1 Xj+i,...
AbstractLet {Xn, n⩾1} be a sequence of stationary negatively associated random variables, Sj(l)=∑li=...
Covariance function, Exponential inequality, Negative association, 60F15, 62G20,
An exponential inequality is established for identically distributed negatively associated random va...
Let Xn, n=1, be an associated and strictly stationary sequence of random variables, having marginal ...
Abstract Let {Xn,n≥1} $\{X_{n}, n\geq1\}$ be a strictly stationary negatively associated sequence of...
Abstract: Let Xn, n ≥ 1, be a strictly stationary associated sequence of random variables, with comm...
AbstractNecessary and sufficient conditions for weak convergence and strong (functional) limit theor...
Under mild conditions, a Bernstein-Hoeffding-type inequality is established for covariance invariant...
Let {X<SUB>n</SUB>;n≥1} be a sequence of stationary associated random variables having a common marg...
We prove an exponential inequality for positively associated and strictly stationary random variable...
We present a new exponential inequality as a generalization of that of Sung et al. Sung et al. (2011...
Using the probability inequalities and the weak invariance principles, the limit behavior of the com...
Let fXn; n 1g be a strictly stationary sequence of negatively associated ran-dom variables, with co...
Abstract. Let {Xn, n ≥ 1} be a strictly stationary sequence of neg-atively associated random variabl...
Let [Xn, n1] be a sequence of stationary negatively associated random variables, Sj (l)= li=1 Xj+i,...
AbstractLet {Xn, n⩾1} be a sequence of stationary negatively associated random variables, Sj(l)=∑li=...
Covariance function, Exponential inequality, Negative association, 60F15, 62G20,
An exponential inequality is established for identically distributed negatively associated random va...
Let Xn, n=1, be an associated and strictly stationary sequence of random variables, having marginal ...
Abstract Let {Xn,n≥1} $\{X_{n}, n\geq1\}$ be a strictly stationary negatively associated sequence of...
Abstract: Let Xn, n ≥ 1, be a strictly stationary associated sequence of random variables, with comm...
AbstractNecessary and sufficient conditions for weak convergence and strong (functional) limit theor...
Under mild conditions, a Bernstein-Hoeffding-type inequality is established for covariance invariant...
Let {X<SUB>n</SUB>;n≥1} be a sequence of stationary associated random variables having a common marg...
We prove an exponential inequality for positively associated and strictly stationary random variable...
We present a new exponential inequality as a generalization of that of Sung et al. Sung et al. (2011...
Using the probability inequalities and the weak invariance principles, the limit behavior of the com...