Amongst deep studying practitioners, Kullback-Leibler divergence (KL divergence) is maybe greatest recognized for its position in coaching variational autoencoders (VAEs). To be taught an informative latent area, we don’t simply optimize for good reconstruction. Fairly, we additionally impose a previous on the latent distribution, and intention to maintain them shut – typically, by minimizing KL divergence.
On this position, KL divergence acts like a watchdog; it’s a constraining, regularizing issue, and if anthropomorphized, would appear stern and extreme. If we go away it at that, nonetheless, we’ve seen only one facet of its character, and are lacking out on its complement, an image of playfulness, journey, and curiosity. On this submit, we’ll check out that different facet.
Whereas being impressed by a sequence of tweets by Simon de Deo, enumerating purposes of KL divergence in an unlimited variety of disciplines,
we don’t aspire to supply a complete write-up right here – as talked about within the preliminary tweet, the subject might simply fill an entire semester of examine.
The far more modest objectives of this submit, then, are
- to shortly recap the position of KL divergence in coaching VAEs, and point out similar-in-character purposes;
- as an example that extra playful, adventurous “different facet” of its character; and
- in a not-so-entertaining, however – hopefully – helpful method, differentiate KL divergence from associated ideas resembling cross entropy, mutual data, or free vitality.
Earlier than although, we begin with a definition and a few terminology.
KL divergence in a nutshell
KL divergence is the anticipated worth of the logarithmic distinction in possibilities in keeping with two distributions, (p) and (q). Right here it’s in its discrete-probabilities variant:
[begin{equation}
D_{KL}(p||q) = sumlimits_{x} p(x) log(frac{p(x)}{q(x)})
tag{1}
end{equation}]
Notably, it’s uneven; that’s, (D_{KL}(p||q)) shouldn’t be the identical as (D_{KL}(q||p)). (Which is why it’s a divergence, not a distance.) This facet will play an vital position in part 2 devoted to the “different facet.”
To emphasize this asymmetry, KL divergence is typically known as relative data (as in “data of (p) relative to (q)”), or data achieve. We agree with one in every of our sources that due to its universality and significance, KL divergence would in all probability have deserved a extra informative title; resembling, exactly, data achieve. (Which is much less ambiguous pronunciation-wise, as nicely.)
KL divergence, “villain”
In lots of machine studying algorithms, KL divergence seems within the context of variational inference. Typically, for lifelike knowledge, actual computation of the posterior distribution is infeasible. Thus, some type of approximation is required. In variational inference, the true posterior (p^*) is approximated by a less complicated distribution, (q), from some tractable household.
To make sure we’ve a very good approximation, we decrease – in principle, at the least – the KL divergence of (q) relative to (p^*), thus changing inference by optimization.
In apply, once more for causes of intractability, the KL divergence minimized is that of (q) relative to an unnormalized distribution (widetilde{p})
[begin{equation}
J(q) = D_{KL}(q||widetilde{p})
tag{2}
end{equation}]
the place (widetilde{p}) is the joint distribution of parameters and knowledge:
[begin{equation}
widetilde{p}(mathbf{x}) = p(mathbf{x}, mathcal{D}) = p^*(mathbf{x}) p(mathcal{D})
tag{3}
end{equation}]
and (p^*) is the true posterior:
[begin{equation}
p^*(mathbf{x}) = p(mathbf{x}|mathcal{D})
tag{4}
end{equation}]
Equal to that formulation (eq. (2)) – for a derivation see (Murphy 2012) – is that this, which exhibits the optimization goal to be an higher sure on the unfavourable log-likelihood (NLL):
[begin{equation}
J(q) = D_{KL}(q||p^*) – log p(D)
tag{5}
end{equation}]
One more formulation – once more, see (Murphy 2012) for particulars – is the one we really use when coaching (e.g.) VAEs. This one corresponds to the anticipated NLL plus the KL divergence between the approximation (q) and the imposed prior (p):
[begin{equation}
J(q) = D_{KL}(q||p) – E_q[- log p(mathcal{D}|mathbf{x})]
tag{6}
finish{equation}]
Negated, this formulation can also be known as the ELBO, for proof decrease sure. Within the VAE submit cited above, the ELBO was written
[begin{equation}
ELBO = E[log p(x|z)] – KL(q(z)||p(z))
tag{7}
finish{equation}]
with (z) denoting the latent variables ((q(z)) being the approximation, (p(z)) the prior, typically a multivariate regular).
Past VAEs
Generalizing this “conservative” motion sample of KL divergence past VAEs, we are able to say that it expresses the standard of approximations. An vital space the place approximation takes place is (lossy) compression. KL divergence supplies a approach to quantify how a lot data is misplaced once we compress knowledge.
Summing up, in these and comparable purposes, KL divergence is “dangerous” – though we don’t need it to be zero (or else, why trouble utilizing the algorithm?), we actually need to preserve it low. So now, let’s see the opposite facet.
KL divergence, good man
In a second class of purposes, KL divergence shouldn’t be one thing to be minimized. In these domains, KL divergence is indicative of shock, disagreement, exploratory habits, or studying: This really is the angle of data achieve.
Shock
One area the place shock, not data per se, governs habits is notion. For instance, eyetracking research (e.g., (Itti and Baldi 2005)) confirmed that shock, as measured by KL divergence, was a greater predictor of visible consideration than data, measured by entropy. Whereas these research appear to have popularized the expression “Bayesian shock,” this compound is – I believe – not probably the most informative one, as neither half provides a lot data to the opposite. In Bayesian updating, the magnitude of the distinction between prior and posterior displays the diploma of shock led to by the info – shock is an integral a part of the idea.
Thus, with KL divergence linked to shock, and shock rooted within the elementary means of Bayesian updating, a course of that could possibly be used to explain the course of life itself, KL divergence itself turns into elementary. We might get tempted to see it all over the place. Accordingly, it has been utilized in many fields to quantify unidirectional divergence.
For instance, (Zanardo 2017) have utilized it in buying and selling, measuring how a lot an individual disagrees with the market perception. Larger disagreement then corresponds to greater anticipated good points from betting towards the market.
Nearer to the realm of deep studying, it’s utilized in intrinsically motivated reinforcement studying (e.g., (Solar, Gomez, and Schmidhuber 2011)), the place an optimum coverage ought to maximize the long-term data achieve. That is potential as a result of like entropy, KL divergence is additive.
Though its asymmetry is related whether or not you employ KL divergence for regularization (part 1) or shock (this part), it turns into particularly evident when used for studying and shock.
Asymmetry in motion
Trying once more on the KL components
[begin{equation}
D_{KL}(p||q) = sumlimits_{x} p(x) log(frac{p(x)}{q(x)})
tag{1}
end{equation}]
the roles of (p) and (q) are basically completely different. For one, the expectation is computed over the primary distribution ((p) in (1)). This facet is vital as a result of the “order” (the respective roles) of (p) and (q) could must be chosen in keeping with tractability (which distribution can we common over).
Secondly, the fraction contained in the (log) signifies that if (q) is ever zero at a degree the place (p) isn’t, the KL divergence will “blow up.” What this implies for distribution estimation generally is properly detailed in Murphy (2012). Within the context of shock, it signifies that if I be taught one thing I used to suppose had chance zero, I shall be “infinitely shocked.”
To keep away from infinite shock, we are able to ensure our prior chance is rarely zero. However even then, the attention-grabbing factor is that how a lot data we achieve in anybody occasion depends upon how a lot data I had earlier than. Let’s see a easy instance.
Assume that in my present understanding of the world, black swans in all probability don’t exist, however they may … possibly 1 % of them is black. Put otherwise, my prior perception of a swan, ought to I encounter one, being black is (q = 0.01).
Now the truth is I do encounter one, and it’s black.
The data I’ve gained is:
[begin{equation}
l(p,q) = 0 * log(frac{0}{0.99}) + 1 * log(frac{1}{0.01}) = 6.6 bits
tag{8}
end{equation}]
Conversely, suppose I’d been far more undecided earlier than; say I’d have thought the chances have been 50:50.
On seeing a black swan, I get lots much less data:
[begin{equation}
l(p,q) = 0 * log(frac{0}{0.5}) + 1 * log(frac{1}{0.5}) = 1 bit
tag{9}
end{equation}]
This view of KL divergence, when it comes to shock and studying, is inspiring – it could lead on one to seeing it in motion all over the place. Nonetheless, we nonetheless have the third and closing activity to deal with: shortly evaluate KL divergence to different ideas within the space.
Entropy
All of it begins with entropy, or uncertainty, or data, as formulated by Claude Shannon.
Entropy is the common log chance of a distribution:
[begin{equation}
H(X) = – sumlimits_{x=1}^n p(x_i) log(p(x_i))
tag{10}
end{equation}]
As properly described in (DeDeo 2016), this formulation was chosen to fulfill 4 standards, one in every of which is what we generally image as its “essence,” and one in every of which is particularly attention-grabbing.
As to the previous, if there are (n) potential states, entropy is maximal when all states are equiprobable. E.g., for a coin flip uncertainty is highest when coin bias is 0.5.
The latter has to do with coarse-graining, a change in “decision” of the state area. Say we’ve 16 potential states, however we don’t actually care at that stage of element. We do care about 3 particular person states, however all the remainder are mainly the identical to us. Then entropy decomposes additively; complete (fine-grained) entropy is the entropy of the coarse-grained area, plus the entropy of the “lumped-together” group, weighted by their possibilities.
Subjectively, entropy displays our uncertainty whether or not an occasion will occur. Curiously although, it exists within the bodily world as nicely: For instance, when ice melts, it turns into extra unsure the place particular person particles are. As reported by (DeDeo 2016), the variety of bits launched when one gram of ice melts is about 100 billion terabytes!
As fascinating as it’s, data per se could, in lots of circumstances, not be the perfect technique of characterizing human habits. Going again to the eyetracking instance, it’s utterly intuitive that individuals take a look at stunning elements of photos, not at white noise areas, that are the utmost you could possibly get when it comes to entropy.
As a deep studying practitioner, you’ve in all probability been ready for the purpose at which we’d point out cross entropy – probably the most generally used loss operate in categorization.
Cross entropy
The cross entropy between distributions (p) and (q) is the entropy of (p) plus the KL divergence of (p) relative to (q). In case you’ve ever applied your individual classification community, you in all probability acknowledge the sum on the very proper:
[begin{equation}
H(p,q) = H(p) + D_{KL}(p||q) = – sum p log(q)
tag{11}
end{equation}]
In data theory-speak, (H(p,q)) is the anticipated message size per datum when (q) is assumed however (p) is true.
Nearer to the world of machine studying, for mounted (p), minimizing cross entropy is equal to minimizing KL divergence.
Mutual data
One other extraordinarily vital amount, utilized in many contexts and purposes, is mutual data. Once more citing DeDeo, “you may consider it as probably the most basic type of correlation coefficient you can measure.”
With two variables (X) and (Y), we are able to ask: How a lot will we study (X) once we study a person (y), (Y=y)? Averaged over all (y), that is the conditional entropy:
[begin{equation}
H(X|Y) = – sumlimits_{i} P(y_i) log(H(X|y_i))
tag{12}
end{equation}]
Now mutual data is entropy minus conditional entropy:
[begin{equation}
I(X, Y) = H(X) – H(X|Y) = H(Y) – H(Y|X)
tag{13}
end{equation}]
This amount – as required for a measure representing one thing like correlation – is symmetric: If two variables (X) and (Y) are associated, the quantity of knowledge (X) offers you about (Y) is the same as that (Y) offers you about (X).
KL divergence is a part of a household of divergences, known as f-divergences, used to measure directed distinction between chance distributions. Let’s additionally shortly look one other information-theoretic measure that not like these, is a distance.
Jensen-Shannon distance
In math, a distance, or metric, in addition to being non-negative has to fulfill two different standards: It should be symmetric, and it should obey the triangle inequality.
Each standards are met by the Jensen-Shannon distance. With (m) a mix distribution:
[begin{equation}
m_i = frac{1}{2}(p_i + q_i)
tag{14}
end{equation}]
the Jensen-Shannon distance is a median of KL divergences, one in every of (m) relative to (p), the opposite of (m) relative to (q):
[begin{equation}
JSD = frac{1}{2}(KL(m||p) + KL(m||q))
tag{15}
end{equation}]
This may be a really perfect candidate to make use of have been we excited by (undirected) distance between, not directed shock attributable to, distributions.
Lastly, let’s wrap up with a final time period, proscribing ourselves to a fast glimpse at one thing entire books could possibly be written about.
(Variational) Free Power
Studying papers on variational inference, you’re fairly prone to hear folks speaking not “simply” about KL divergence and/or the ELBO (which as quickly as what it stands for, is simply what it’s), but in addition, one thing mysteriously known as free vitality (or: variational free vitality, in that context).
For sensible functions, it suffices to know that variational free vitality is unfavourable the ELBO, that’s, corresponds to equation (2). However for these , there’s free vitality as a central idea in thermodynamics.
On this submit, we’re primarily excited by how ideas are associated to KL divergence, and for this, we comply with the characterization John Baez offers in his aforementioned discuss.
Free vitality, that’s, vitality in helpful type, is the anticipated vitality minus temperature instances entropy:
[begin{equation}
F = [E] -T H
tag{16}
finish{equation}]
Then, the additional free vitality of a system (Q) – in comparison with a system in equilibrium (P) – is proportional to their KL divergence, that’s, the knowledge of (Q) relative to (P):
[begin{equation}
F(Q) – F(P) = k T KL(q||p)
tag{17}
end{equation}]
Talking of free vitality, there’s additionally the – not uncontroversial – free vitality precept posited in neuroscience.. However in some unspecified time in the future, we’ve to cease, and we do it right here.
Conclusion
Wrapping up, this submit has tried to do three issues: Having in thoughts a reader with background primarily in deep studying, begin with the “recurring” use in coaching variational autoencoders; then present the – in all probability much less acquainted – “different facet”; and eventually, present a synopsis of associated phrases and their purposes.
In case you’re excited by digging deeper into the various numerous purposes, in a variety of various fields, no higher place to begin than from the Twitter thread, talked about above, that gave rise to this submit. Thanks for studying!
DeDeo, Simon. 2016. “Data Concept for Clever Individuals.”
Murphy, Kevin. 2012. Machine Studying: A Probabilistic Perspective. MIT Press.
Zanardo, Enrico. 2017. “HOW TO MEASURE DISAGREEMENT ?” In.