I've never really grokked the difference between these two measures of convergence. (Or, in fact, any of the different types of convergence, but I mention these two in particular because of the Weak and Strong Laws of Large Numbers.)

Sure, I can quote the definition of each and give an example where they differ, but I still don't quite get it.

What's a good way to understand the difference? Why is the difference important? Is there a particularly memorable example where they differ?

  • $\begingroup$ This last guy explains it very well. If you take a sequence of random variables Xn= 1 with probability 1/n and zero otherwise. It is easy to see taking limits that this converges to zero in probability, but fails to converge almost surely. As he said, probability doesn't care that we might get a one down the road. Almost surely does. Almost surely implies convergence in probability, but not the other way around yah? $\endgroup$
    – Tim Brown
    Commented Sep 14, 2012 at 8:10
  • $\begingroup$ Welcome to the site, @Tim-Brown, we appreciate your help answering questions here. One thing to note is that it's best to identify other answers by the answerer's username, "this last guy" won't be very effective. Eg, the list will be re-ordered over time as people vote. You may want to read our FAQ. $\endgroup$ Commented Sep 21, 2012 at 3:01
  • $\begingroup$ Also the answer to this: stats.stackexchange.com/questions/72859/… $\endgroup$ Commented Aug 11, 2015 at 9:09
  • $\begingroup$ Possible duplicate of Is there a statistical application that requires strong consistency? $\endgroup$ Commented Nov 30, 2017 at 10:59
  • $\begingroup$ Two examples illustrating convergence in probability when there is not almost sure convergence (WLLN applies but SLLN does not): stats.stackexchange.com/a/609954/2958 and stats.stackexchange.com/a/205564/2958 $\endgroup$
    – Henry
    Commented Feb 22 at 15:37

5 Answers 5


From my point of view the difference is important, but largely for philosophical reasons. Assume you have some device, that improves with time. So, every time you use the device the probability of it failing is less than before.

Convergence in probability says that the chance of failure goes to zero as the number of usages goes to infinity. So, after using the device a large number of times, you can be very confident of it working correctly, it still might fail, it's just very unlikely.

Convergence almost surely is a bit stronger. It says that the total number of failures is finite. That is, if you count the number of failures as the number of usages goes to infinity, you will get a finite number. The impact of this is as follows: As you use the device more and more, you will, after some finite number of usages, exhaust all failures. From then on the device will work perfectly.

As Srikant points out, you don't actually know when you have exhausted all failures, so from a purely practical point of view, there is not much difference between the two modes of convergence.

However, personally I am very glad that, for example, the strong law of large numbers exists, as opposed to just the weak law. Because now, a scientific experiment to obtain, say, the speed of light, is justified in taking averages. At least in theory, after obtaining enough data, you can get arbitrarily close to the true speed of light. There wont be any failures (however improbable) in the averaging process.

Let me clarify what I mean by ''failures (however improbable) in the averaging process''. Choose some $\delta > 0$ arbitrarily small. You obtain $n$ estimates $X_1,X_2,\dots,X_n$ of the speed of light (or some other quantity) that has some `true' value, say $\mu$. You compute the average $$S_n = \frac{1}{n}\sum_{k=1}^n X_k.$$ As we obtain more data ($n$ increases) we can compute $S_n$ for each $n = 1,2,\dots$. The weak law says (under some assumptions about the $X_n$) that the probability $$P(|S_n - \mu| > \delta) \rightarrow 0$$ as $n$ goes to $\infty$. The strong law says that the number of times that $|S_n - \mu|$ is larger than $\delta$ is finite (with probability 1). That is, if we define the indicator function $I(|S_n - \mu| > \delta)$ that returns one when $|S_n - \mu| > \delta$ and zero otherwise, then $$\sum_{n=1}^{\infty}I(|S_n - \mu| > \delta)$$ converges. This gives you considerable confidence in the value of $S_n$, because it guarantees (i.e. with probability 1) the existence of some finite $n_0$ such that $|S_n - \mu| < \delta$ for all $n > n_0$ (i.e. the average never fails for $n > n_0$). Note that the weak law gives no such guarantee.

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    $\begingroup$ Thanks, I like the convergence of infinite series point-of-view! $\endgroup$
    – raegtin
    Commented Sep 1, 2010 at 14:20
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    $\begingroup$ I think you meant countable and not necessarily finite, am I wrong? Or am I mixing with integrals. $\endgroup$
    – Royi
    Commented Aug 2, 2013 at 14:55
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    $\begingroup$ To be more accurate, the set of events it happens (Or not) is with measure of zero -> probability of zero to happen. $\endgroup$
    – Royi
    Commented Aug 2, 2013 at 15:06
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    $\begingroup$ I'm not sure I understand the argument that almost sure gives you "considerable confidence." Just because $n_0$ exists doesn't tell you if you reached it yet. Finite doesn't necessarily mean small or practically achievable. By itself the strong law doesn't seem to tell you when you have reached or when you will reach $n_0$. $\endgroup$ Commented Nov 19, 2018 at 2:52
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    $\begingroup$ But I'm not sure if the weak law/strong law distinction is important for real life examples, like argued here. The central limit theorem which kind of gives you "weak law guarantees", at least tells you after $n$ samples, your estimated mean should be within some error at some probability. "Philosophically", we may never reach (say we expect all life to die before this happens) the magic $n_0$ scientific measurements, so our endeavours are useless anyway. So I don't see what comfort the strong law gives. $\endgroup$
    – eugenhu
    Commented Apr 14, 2021 at 7:06

I know this question has already been answered (and quite well, in my view), but there was a different question here which had a comment @NRH that mentioned the graphical explanation, and rather than put the pictures there it would seem more fitting to put them here.

So, here goes. It's not as cool as an R package. But it's self-contained and doesn't require a subscription to JSTOR.

In the following we're talking about a simple random walk, $X_{i}= \pm 1$ with equal probability, and we are calculating running averages, $$ \frac{S_{n}}{n} = \frac{1}{n}\sum_{i = 1}^{n}X_{i},\quad n=1,2,\ldots. $$

Strong Law of Large Numbers

The SLLN (convergence almost surely) says that we can be 100% sure that this curve stretching off to the right will eventually, at some finite time, fall entirely within the bands forever afterward (to the right).

The R code used to generate this graph is below (plot labels omitted for brevity).

n <- 1000;  m <- 50; e <- 0.05
s <- cumsum(2*(rbinom(n, size=1, prob=0.5) - 0.5))
plot(s/seq.int(n), type = "l", ylim = c(-0.4, 0.4))
abline(h = c(-e,e), lty = 2)

Weak Law of Large Numbers

The WLLN (convergence in probability) says that a large proportion of the sample paths will be in the bands on the right-hand side, at time $n$ (for the above it looks like around 48 or 9 out of 50). We can never be sure that any particular curve will be inside at any finite time, but looking at the mass of noodles above it'd be a pretty safe bet. The WLLN also says that we can make the proportion of noodles inside as close to 1 as we like by making the plot sufficiently wide.

The R code for the graph follows (again, skipping labels).

x <- matrix(2*(rbinom(n*m, size=1, prob=0.5) - 0.5), ncol = m)
y <- apply(x, 2, function(z) cumsum(z)/seq_along(z))
matplot(y, type = "l", ylim = c(-0.4,0.4))
abline(h = c(-e,e), lty = 2, lwd = 2)
  • $\begingroup$ I am not sure, but I feel that I disagree with "The SLLN (convergence almost surely) says that we can be 100% sure that this curve stretching off to the right will eventually, at some finite time, fall entirely within the bands forever afterward (to the right)." I think we cannot be sure about the behavior of a particular curve. We only know that the "percentage" (measured by probability) of those curves who go beyond the bands infinitely many times among all possible curves (the whole sample space $\{-1,1\}^\infty$) is zero. $\endgroup$
    – Hepdrey
    Commented May 12 at 17:48

One thing that helped me to grasp the difference is the following equivalence

$$P\left({\lim_{n\to\infty}|X_n-X|=0}\right) = 1 \iff \lim_{n\to\infty} P\left({\sup_{m\geq n}|X_m-X|>\epsilon }\right) = 0 ~\forall \epsilon > 0.$$

In comparison stochastic convergence:

$$\lim_{n\to\infty}P(|X_n-X|>\epsilon) = 0 ~\forall \epsilon >0.$$

When comparing the right side of the upper equivalence with the stochastic convergence, the difference becomes clearer, I think.

  • $\begingroup$ I find this equivalence helpful as well, since all the terms of the rest of the series must vanish at infinity : $$a.s \iff \sum_n{P(|X_n - X|>\varepsilon)} < \infty \;,\ \forall \;\ \varepsilon >0 $$ $\endgroup$
    – bigInner
    Commented Oct 24, 2021 at 9:28

I understand it as follows,

Convergence in probability

The probability that the sequence of random variables equals the target value is asymptotically decreasing and approaches 0 but never actually attains 0.

Almost Sure Convergence

The sequence of random variables will equal the target value asymptotically but you cannot predict at what point it will happen.

Almost sure convergence is a stronger condition on the behavior of a sequence of random variables because it states that "something will definitely happen" (we just don't know when). In contrast, convergence in probability states that "while something is likely to happen" the likelihood of "something not happening" decreases asymptotically but never actually reaches 0. (something $\equiv$ a sequence of random variables converging to a particular value).

The wiki has some examples of both which should help clarify the above (in particular see the example of the archer in the context of convergence in prob and the example of the charity in the context of almost sure convergence).

From a practical standpoint, convergence in probability is enough as we do not particularly care about very unlikely events. As an example, consistency of an estimator is essentially convergence in probability. Thus, when using a consistent estimate, we implicitly acknowledge the fact that in large samples there is a very small probability that our estimate is far from the true value. We live with this 'defect' of convergence in probability as we know that asymptotically the probability of the estimator being far from the truth is vanishingly small.

  • $\begingroup$ Attempted editor argues that this should read, "The probability that the sequence of random variables does not equal the target value...". $\endgroup$ Commented Oct 23, 2018 at 18:34
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    $\begingroup$ "The probability that the sequence of random variables equals the target value is asymptotically decreasing and approaches 0 but never actually attains 0." Shouldn't it be MAY never actually attains 0? $\endgroup$
    – wanderer
    Commented Nov 21, 2018 at 16:58
  • $\begingroup$ @gung The probability that it equals the target value approaches 1 or the probability that it does not equal the target values approaches 0. The current definition is incorrect. $\endgroup$ Commented Jun 22, 2019 at 11:39

If you enjoy visual explanations, there was a nice 'Teacher's Corner' article on this subject in the American Statistician (cite below). As a bonus, the authors included an R package to facilitate learning.

  title={Understanding Convergence Concepts: A Visual-Minded and Graphical Simulation-Based Approach},
  author={Lafaye de Micheaux, P. and Liquet, B.},
  journal={The American Statistician},

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