In this note, we take a look at the reparameterization trick, an idea that forms the basis of the Variational Autoencoder. My material here comes from the fantastic paper by Ruiz et al [1]. The main idea is that the reparameterization trick [4,5] gives us a lower variance estimator than that obtained from the score function gradient, but suffers because the class of distributions to which it can be applied is somewhat limited – Kingma and Welling discusses Bernaulli and Gaussian variants. Nevertheless, it is possible to remedy this defect, as is done in papers [1], [2], [3]. The paper by Ruiz is especially instructive. It walks us through the machinery involved in reparameterization and discusses variance reduction [Casella and Berger, Robert and Casella] for variational inference – also [BBVI]. I was originally intending on writing a much more complete summary of the papers [1], [2], [3] but ran out of juice, leaving it for the future as might transpire (or not). If I may insert inappropriately (also, perhaps to acknowledge a decade that just ended):
What might have been is an abstraction
Remaining a perpetual possibility
Only in a world of speculation.
What might have been and what has been
Point to one end, which is always present.
Notwithstanding such tangential musings, it behooves us to study [Casella and Berger]. The authors note that it is a 22 month long course to learn statistics the hard way. Incidentally, the style of books bearing George Casella’s imprint – either actual or inspirational – ([Robert and Casella], [Robert]) very much reminds me of [Bender and Orszag], with engaging quotes from Holmes and their straight forward slant on equations.
The Variational Objective
Recall that in variational problems we are interested in obtaining the ELBO. We briefly derive this using Jensen’s inequality (
Take the joint form presented in Ruiz:
Or
Or
![\begin{aligned} \mathcal{L}_v = E_{q(z;v)}[\log p(x,z) - \log q(z;v)] = E_{q(z;v)} [f(z)] + H(q(z;v)) \end{aligned}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Baligned%7D+%5Cmathcal%7BL%7D_v+%3D+E_%7Bq%28z%3Bv%29%7D%5B%5Clog+p%28x%2Cz%29+-+%5Clog+q%28z%3Bv%29%5D+%3D+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29%5D+%2B+H%28q%28z%3Bv%29%29+%5Cend%7Baligned%7D+&bg=ffffff&fg=404040&s=0 "\begin{aligned} \mathcal{L}_v = E_{q(z;v)}[\log p(x,z) - \log q(z;v)] = E_{q(z;v)} [f(z)] + H(q(z;v)) \end{aligned}")
The equation written in this form is quite instructive. We want to optimize the joint 
Gradient estimation with score function
Our aim is to obtain Monte Carlo estimates of the gradient (by taking expectations), but this is not possible as is. However, it is possible to arrange this as follows:
![\begin{aligned} \int \nabla_v q(z;v) f(z) dz &=& \int q(z;v) \nabla_v \log q(z;v) f(z) dz \ &=& E_q(z;v) [f(z) \log q(z;v)] \end{aligned}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Baligned%7D+%5Cint+%5Cnabla_v+q%28z%3Bv%29+f%28z%29+dz+%26%3D%26+%5Cint+q%28z%3Bv%29+%5Cnabla_v+%5Clog+q%28z%3Bv%29+f%28z%29+dz+%5C+%26%3D%26+E_q%28z%3Bv%29+%5Bf%28z%29+%5Clog+q%28z%3Bv%29%5D+%5Cend%7Baligned%7D+&bg=ffffff&fg=404040&s=0 "\begin{aligned} \int \nabla_v q(z;v) f(z) dz &=& \int q(z;v) \nabla_v \log q(z;v) f(z) dz \ &=& E_q(z;v) [f(z) \log q(z;v)] \end{aligned}")
This is known as the score function estimator, or the REINFORCE gradient. We can view it as a discrete gradient that allows us to take gradients of non-differentiable functions by taking samples.
![E_q(z;v)[f(z) \log q(z;v)] = \frac{1}{L} \sum_{l=1}^L [f(z^l) \log q(z^l;v)]](https://s0.wp.com/latex.php?latex=E_q%28z%3Bv%29%5Bf%28z%29+%5Clog+q%28z%3Bv%29%5D+%3D+%5Cfrac%7B1%7D%7BL%7D+%5Csum_%7Bl%3D1%7D%5EL+%5Bf%28z%5El%29+%5Clog+q%28z%5El%3Bv%29%5D+&bg=ffffff&fg=404040&s=0 "E_q(z;v)[f(z) \log q(z;v)] = \frac{1}{L} \sum_{l=1}^L [f(z^l) \log q(z^l;v)]")
However, the estimate obtained tends to be noisy, and needs provisos for variance reduction – e.g. Rao-Black Wellization, control variates.
Gradient of expectation, expectation of gradient
A principal contribution of the VAE approach is that we have an alternative way to derive the estimator, one that is generally of lower variance than the score function method described above. That being said, it has the drawback that the method is not as widely applicable as the score function approach.
Recall that we would like to take gradients of the term containing the log joint in the ELBO.
![\nabla_v \mathcal{L} = \nabla_v E_{q(z;v)} [f(z)] = \nabla_v \int q(z;v) f(z) dz + \cdots](https://s0.wp.com/latex.php?latex=%5Cnabla_v+%5Cmathcal%7BL%7D+%3D+%5Cnabla_v+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29%5D+%3D+%5Cnabla_v+%5Cint+q%28z%3Bv%29+f%28z%29+dz+%2B+%5Ccdots+&bg=ffffff&fg=404040&s=0 "\nabla_v \mathcal{L} = \nabla_v E_{q(z;v)} [f(z)] = \nabla_v \int q(z;v) f(z) dz + \cdots")
In this equation, we can take samples 
We derive an alternative estimator by transforming to a distribution that does not depend on 
We have pushed the gradient operator inside the expectation which allows us to take samples and allow taking gradients from it.
That’s a lot of words. Let us derive this estimator to put it more concretely.
We assume that there exists an invertable transformation 
We can consider this as the standardized version of a normal distribution 
Transform (pretend 1D for now):
For more general cases, the differential is replaced by a Jacobian:
After standardization, we lose dependence on 
Now we can take gradient and move it inside the expectation:
Reparameterization in more general cases
The standardization procedure is now extended so that 
![\nabla_v E_{q(z;v)} [f(z)] = \nabla_v E_{q_\epsilon(\epsilon;v)} [f (\tau(\epsilon;v))] = \nabla_v \int q_\epsilon(\epsilon;v) f(\tau(\epsilon;v)) d\epsilon](https://s0.wp.com/latex.php?latex=%5Cnabla_v+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29%5D+%3D+%5Cnabla_v+E_%7Bq_%5Cepsilon%28%5Cepsilon%3Bv%29%7D+%5Bf+%28%5Ctau%28%5Cepsilon%3Bv%29%29%5D+%3D+%5Cnabla_v+%5Cint+q_%5Cepsilon%28%5Cepsilon%3Bv%29+f%28%5Ctau%28%5Cepsilon%3Bv%29%29+d%5Cepsilon+&bg=ffffff&fg=404040&s=0 "\nabla_v E_{q(z;v)} [f(z)] = \nabla_v E_{q_\epsilon(\epsilon;v)} [f (\tau(\epsilon;v))] = \nabla_v \int q_\epsilon(\epsilon;v) f(\tau(\epsilon;v)) d\epsilon")
![\nabla_v E_{q(z;v)}[f(z)] = \int q_\epsilon(\epsilon;v) \nabla_v f(\tau(\epsilon;v)) d\epsilon + \int q_\epsilon(\epsilon;v) f(\tau(\epsilon;v))\nabla_v \log q_\epsilon(\epsilon;v) d\epsilon](https://s0.wp.com/latex.php?latex=%5Cnabla_v+E_%7Bq%28z%3Bv%29%7D%5Bf%28z%29%5D+%3D+%5Cint+q_%5Cepsilon%28%5Cepsilon%3Bv%29+%5Cnabla_v+f%28%5Ctau%28%5Cepsilon%3Bv%29%29+d%5Cepsilon+%2B+%5Cint+q_%5Cepsilon%28%5Cepsilon%3Bv%29+f%28%5Ctau%28%5Cepsilon%3Bv%29%29%5Cnabla_v+%5Clog+q_%5Cepsilon%28%5Cepsilon%3Bv%29+d%5Cepsilon+&bg=ffffff&fg=404040&s=0 "\nabla_v E_{q(z;v)}[f(z)] = \int q_\epsilon(\epsilon;v) \nabla_v f(\tau(\epsilon;v)) d\epsilon + \int q_\epsilon(\epsilon;v) f(\tau(\epsilon;v))\nabla_v \log q_\epsilon(\epsilon;v) d\epsilon")
As we can see, the first term is the regular reparameterization gradient. The second term is the score function estimator, a correction term for this version of this standardization setup.
![\begin{aligned} g^{rep} = E_{q_\epsilon(\epsilon;v)} \nabla_v f(\tau(\epsilon;v)) \\ g^{corr} = E_{q_\epsilon(\epsilon;v)} f(\tau(\epsilon;v)) \nabla_v \log q_\epsilon(\epsilon;v) \\ \mathcal{L}_v = g^{rep} + g^{corr} + \nabla_v H[q(z;v)] \end{aligned}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Baligned%7D+g%5E%7Brep%7D+%3D+E_%7Bq_%5Cepsilon%28%5Cepsilon%3Bv%29%7D+%5Cnabla_v+f%28%5Ctau%28%5Cepsilon%3Bv%29%29+%5C%5C+g%5E%7Bcorr%7D+%3D+E_%7Bq_%5Cepsilon%28%5Cepsilon%3Bv%29%7D+f%28%5Ctau%28%5Cepsilon%3Bv%29%29+%5Cnabla_v+%5Clog+q_%5Cepsilon%28%5Cepsilon%3Bv%29+%5C%5C+%5Cmathcal%7BL%7D_v+%3D+g%5E%7Brep%7D+%2B+g%5E%7Bcorr%7D+%2B+%5Cnabla_v+H%5Bq%28z%3Bv%29%5D+%5Cend%7Baligned%7D+&bg=ffffff&fg=404040&s=0 "\begin{aligned} g^{rep} = E_{q_\epsilon(\epsilon;v)} \nabla_v f(\tau(\epsilon;v)) \\ g^{corr} = E_{q_\epsilon(\epsilon;v)} f(\tau(\epsilon;v)) \nabla_v \log q_\epsilon(\epsilon;v) \\ \mathcal{L}_v = g^{rep} + g^{corr} + \nabla_v H[q(z;v)] \end{aligned}")
In the case of the normal distribution, the second term 
Interpretation
The terms are massaged so as to look like control variates, an idea used in Monte Carlo variance reduction. The authors note that while Rao-Blackwellization is not used in the paper, it is perfectly reasonable to use the setup in conjuction with it, as is done in Black Box Variational Inference [BBVI], where both Rao-Blackwellization and control variates are used to reduce the variance of the estimator.
The basic idea of control variates is as follows ([Casella and Berger] – Chapter 7 on “Point Estimation”). Given an estimator 
The variance for this estimator is (Casella and Berger):
We would get lower variance for 
To get back to our variational estimator, rewrite as follows for it to be interpretable as control variates (see [1]):
![\begin{aligned} \nabla_v E_{q(z;v)} [f(z)] &= E_{q(z;v)} [f(z) \nabla_v \log q(z;v)] \\ & + E_{q(z;v)}[\nabla_z f(z) h(\tau^{-1} (z;v);v)] \\ & + E_{q(z;v)} [f(z) (\nabla_z \log q(z;v) h(\tau^{-1}(z;v);v)+u(\tau^{-1}(z;v);v))] \end{aligned}](https://s0.wp.com/latex.php?latex=%5Cbegin%7Baligned%7D+%5Cnabla_v+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29%5D+%26%3D+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29+%5Cnabla_v+%5Clog+q%28z%3Bv%29%5D+%5C%5C+%26+%2B+E_%7Bq%28z%3Bv%29%7D%5B%5Cnabla_z+f%28z%29+h%28%5Ctau%5E%7B-1%7D+%28z%3Bv%29%3Bv%29%5D+%5C%5C+%26+%2B+E_%7Bq%28z%3Bv%29%7D+%5Bf%28z%29+%28%5Cnabla_z+%5Clog+q%28z%3Bv%29+h%28%5Ctau%5E%7B-1%7D%28z%3Bv%29%3Bv%29%2Bu%28%5Ctau%5E%7B-1%7D%28z%3Bv%29%3Bv%29%29%5D+%5Cend%7Baligned%7D+&bg=ffffff&fg=404040&s=0 "\begin{aligned} \nabla_v E_{q(z;v)} [f(z)] &= E_{q(z;v)} [f(z) \nabla_v \log q(z;v)] \\ & + E_{q(z;v)}[\nabla_z f(z) h(\tau^{-1} (z;v);v)] \\ & + E_{q(z;v)} [f(z) (\nabla_z \log q(z;v) h(\tau^{-1}(z;v);v)+u(\tau^{-1}(z;v);v))] \end{aligned}")
In the first line, we have the score function expression, which is modified in subsequent lines. It is not entirely clear to me how the expectation of the terms that correct the noisy gradient is zero, but I suppose we will take it in the spirit with which it was intended.
References
[1] Ruiz et al: The generalized reparameterization gradient: https://arxiv.org/abs/1610.02287
[2] Naesseth et al: Reparameterization Gradients through Acceptance-Rejection Sampling Algorithms: https://arxiv.org/abs/1610.05683
[3] Figurnov et al: Implicit Reparameterization Gradients: https://arxiv.org/abs/1805.08498
[4] Kingma and Welling: Autoencoding Variational Bayes: https://arxiv.org/abs/1312.6114
[5] Rezende, Mohamed and Wierstra: Stochastic Backpropagation and Approximate Inference in Deep Generative Models: https://arxiv.org/abs/1401.4082
[BBVI] Black Box Variational Inference: https://arxiv.org/abs/1401.0118
[Casella and Berger]: Statistical Inference: https://www.amazon.com/Statistical-Inference-George-Casella/dp/0534243126
[Robert and Casella]: Monte Carlo Statistical Methods: https://www.amazon.com/Monte-Statistical-Methods-Springer-Statistics/dp/1441919392
[Robert]: The Bayesian Choice: https://www.amazon.com/Bayesian-Choice-Decision-Theoretic-Computational-Implementation/dp/0387715983
[Bender and Orszag]: Advanced Mathematical Methods for Scientists and Engineers: https://www.amazon.com/Advanced-Mathematical-Methods-Scientists-Engineers/dp/0387989315
, and a transformation 
, how do we calculate the pdf of the variable 
?
(use modulus to keep sign positive)
: 
, with the transformation from 
: 
. Then the CDF of 
is given by:
is an increasing or decreasing function. In the case of it being an increasing function, the expression becomes:
. Likewise, if 
to 
. This is because for any 
, 
in this case. This is made use of in the formula for 
.
needs to exist, so the function must be one-one (i.e. have only one equivalent mapping in the inverse), and onto (no point must be left out).
, we have a transformation (with sloppy notation) 
, functions that are one-one and onto, we should have an inverse transformation 
.
(which could be, say, a gaussian), and then transform it into more and more expressive distributions. We do the bookkeeping by means of the transformation machinery described above.
, which we would like to come from the same distribution as the ground truth 
. This is achieved by minimizing the Wasserstein distance between 
and 
. We can propose this problem in primal space through Optimal Transport.
; i.e. we sample 
and send it through the generator, or in other words, we push forward 
; and 
. The Wasserstein distance is characterized by a particular type of joint distribution 
of 
– 
; 
.
can be specified as a Euclidean distance, in which case we term this quantity a Wasserstein distance:
root:
. The original Monge problem was with 
, 
. When we use the squared distance with 
, we come across something called “Brenier’s theorem” in the Monge problem.
(parameterized by 
) that maximizes the above. The constraint, of course is that these functions should be 1-Lipshitz continuous.
, a function is Lipshitz continuous [4] if there exists a constant 
such that
. The question then arises as to how we can enforce this constraint. The paper’s recipe is to ‘clip’ the weights so that they lie in a ball ![[-0.01, 0.01]^l](https://s0.wp.com/latex.php?latex=%5B-0.01%2C+0.01%5D%5El&bg=ffffff&fg=404040&s=0 "[-0.01, 0.01]^l")
(
being the dimensionality). Here, we try to intuit why this might work through some simple analysis.
. One way of enforcing this is to arbitrarily clip the weights to some small value. They use 
, that are very close to each other, we get the gradient.
, the transport plan. The joint has the property that when we take its marginals, we get the source and target masses.
is the distance. When we take the Euclidean distance 
, we call this a Wasserstein distance. The original problem by Monge concerned itself with moving mounds of earth between points, with 
. The problem was defined such that one wanted to transport earth from a point 
using a mass conservation condition. Apparently, this formulation posed several problems, such as non-existence (as mass cannot be split).
. We work in the discrete setting to stay compatible with the notes in [1].
point masses 
, and 
point masses 
, and we would like to transport 
with minimum cost. The transportation plan in this case is the ‘joint’ 
where 
, 
with 
, 
.
; 
(
flattened into a vector), so the quantity 
should be of dimension 
. Likewise, 
should be of dimension 
. We are now ready to set up the objective.
.
are satisfied, it equals the desired expression 
. Otherwise, its maximum would be 
is to be viewed in a component wise sense.
. The rationale for this trick is that in longer utterances when we have a long (unnormalized) attention vector ((0.1, 0.4, 0.8, -0.4, -0.5, 0.9, etc), we would like to sharpen the attention so that it focuses on a few pertinent frames. So, if we keep the temperature parameter as 10, for example, then we will get (exp(1), exp(4), exp(8), …) and naturally, this will completely obliterate most but the largest components as compared with (exp(0.1), exp(0.4), exp(0.8),…). In other words, it amplifies – or sharpens – the attention.
match the prior 
for each point. But since there will be overlap between 
, so that we are drawing from this global quantity and not averaging out over overlapping 
between two measures 
and 
such that their marginals equal 
and 
, so that we go from 
, and then get the generated samples 
. When we do this, it starts to look like a VAE.
using a variational approximation to set it up. In the WAE, we do not have a variational lower bound, but we appeal to the same ideas of using an intermediate recognition like model, with qualifications. How they arrive at these qualifications constitutes the brilliancy of this paper.
from which we draw 
must satisfy the marginal property as indicated above. First, we note that 
. Our goal is to factorize 
in terms of the intermediate latent representation 
, or 
. Later on, they move on to generalizing the result for random decoders, and make the connection with other VAE/GAN examples (AAE, AVB, VAE).
with 
, and a prior 
, and assuming a deterministic decoder, with the constraint noted above, we can massage 
the term in 
match ![W(P,Q) = \inf_{q(z|x)} E_{q(z|x)} [c(x,G(z))] + \lambda D_{GAN} (q_z, p_z)](https://s0.wp.com/latex.php?latex=W%28P%2CQ%29+%3D+%5Cinf_%7Bq%28z%7Cx%29%7D+E_%7Bq%28z%7Cx%29%7D+%5Bc%28x%2CG%28z%29%29%5D+%2B+%5Clambda+D_%7BGAN%7D+%28q_z%2C+p_z%29++&bg=ffffff&fg=404040&s=0 "W(P,Q) = \inf_{q(z|x)} E_{q(z|x)} [c(x,G(z))] + \lambda D_{GAN} (q_z, p_z)")
.