ËÑË÷½á¹û: 1-15 ¹²²éµ½¡°¹ÜÀíѧ Strong Law¡±Ïà¹Ø¼Ç¼15Ìõ . ²éѯʱ¼ä(0.062 Ãë)
Strong law of large numbers for supercritical superprocesses under second moment condition
superprocess scaling limit theorem Hunt process spec- tral gap h-transform martingale measure
2016/1/26
Strong law of large numbers for supercritical superprocesses under second moment condition.
A Strong Law of Large Numbers for Super-stable Processes
Strong Law Large Numbers Super-stable Processes
2016/1/20
A Strong Law of Large Numbers for Super-stable Processes.
Strong law of large number of a class of super-diffusions
Spatial autoregression Dynamic panels Fixed e¡èects Quasi-maximum likelihood estima
2016/1/19
Strong law of large number of a class of super-diffusions.
A strong law for the rate of growth of long latency periods in cloud computing service
large deviations long strange segments latency periods
2010/10/19
Cloud-computing shares a common pool of resources across customers at a scale that is orders of magnitude larger than traditional multi-user systems. Constituent physical compute servers are allocated...
Rate of convergence in the strong law of large numbers
Rate of convergence the strong law of large numbers
2009/9/24
Rate of convergence in the strong law of large numbers¡£
Convergence rates in the strong law of large numbers for sums of random variables with multidimensional indices
Convergence rates random variables with multidimensional indices
2009/9/23
Convergence rates in the strong law of large numbers for sums of random variables with multidimensional indices¡£
Teicher's strong law of large numbers in general Banach spaces
Teicher's strong law general Banach spaces
2009/9/23
It is shown that Teicher's version of the strong law of
large numbers for random variables, taking values in separable
Banach spaces, holds under the assumption that the weak law of
large numbers h...
Mathematical expectation and Strong Law of Large Numbers for random variables with values in a metric space of negative curvature
Mathematical expectation Strong Law of Large Numbers random variables
2009/9/23
Let f be a random variable with values in a metric
space (X, d). For some class of metric spaces we define in terms of the
metric d mathematical expectation of f as a closed bounded and
non-empty s...
A note on convergence rates in the strong law for strong mixing sequences
convergence rates the strong law for strong mixing sequences
2009/9/22
For partial sums {S,) of a stationary ergodic sequence
{X,} with zero mean we find conditions for
m
ny-'Pr {sup (S Jk) > E ] < m
n= 1 k?n
in terms of the strong mixing weficients {a,,) and moment...
Convergence rates in the strong law for associated random variables
Convergence rates in the strong law associated random variables
2009/9/22
We prove the Marcinkiewicz-Zygmund SLLN (MZ-
-SLLN) of order p, ~ € 1 12,[ , br associated sequences, not necessarily
stationary. Our assumption on the moment of the random variables is
minimal. We...
Marcinkiewicz-type strong law of large numbers for pairwise independent random fields
Marcinhewin strong law d large numbers pairwise independent random variables random fields
2009/9/21
We present the Marcinkiewicz-type strong law of large
numbers for random fields {X,, n E Zd,) of pairwise independent random
variables, where Zd,, d & 1, is the set of positive d-dimensional
lattic...
ON THE STRONG LAW OF LARGE FOR SEQUENCES OF BLOCKWISE INDEPENDENT AND BLOCKWISE p-ORTNOGONA RANDOM ELEMENTS IN RADEMACWER TYPE p BANACW SPACES
Blockwise independent random elements blockwise p-orthogonal random elements almost sure convergence
2009/9/18
For a sequence of random elements {G, n 2 1) taking
values in a real separable Rademacher type p (1 < p < 2) Banach space
and positive constants b,l 7 co, conditions are provided for the strong
law...
Strong Law of Large Numbers Under a General Moment Condition
quasi-stationary sequence strong law of large numbers maximum inequality
2009/4/27
We use our maximum inequality for p-th order random variables (p>1) to prove a strong law of large numbers (SLLN) for sequences of p-th order random variables. In particular, in the case p=2 our resu...
Convergence£¬Strong Law of Large Numbers£¬and Measurement Theory in the Language of Fuzzy Variables
Convergence Strong Law Large Numbers Measurement Theory Fuzzy Variables
2010/3/19
In the paper we define the convergence of compact fuzzy sets as a convergence of -cuts in
the topology of compact subsets of a metric space. Furthermore we define typical convergences of
fuzzy vari...
On the strong law of large numbers for d-dimensional arrays of random variables
large numbers d-dimensional arrays random variables
2009/3/31
In this paper, we provide a necessary and sufficient condition for general d-dimensional arrays of random variables to satisfy strong law of large numbers. Then, we apply the result to obtain some str...
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