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Low rank adaptation of covariance matrices for nuts sampling in pymc3

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Better mass matrices for NUTS

This is an experimental implementation of a low rank approximation of mass matrices for Hamiltonian MCMC samplers, specifically for PyMC.

This is for experimentation only! Do not use for actual work (yet)!

But feel welcome to try it out, and tell me how it worked for your models!

Install

pip install git+https://github.com/aseyboldt/covadapt.git

Usage

See the notebooks/covadapt_intro.ipynb notebook.

(Draft of an) Overview

When we use preconditioning with a mass matrix to improve performance of HMC based on previous draws, we often ignore information that we already computed: the gradients of the posterior density at those samples. But those gradients contain a lot of information about the posterior geometry and as such also about possible preconditioners. If for example we assume that the posterior is an $n$-dimensional normal distribution, then knowing the gradient at $n + 1$ locations identifies the covariance matrix – and as such the optimal preconditioner of the posterior – exactly.

We can evaluate a precondition matrix $\hat{\Sigma}$ by thinking of it and a mean $\hat{\mu}$ as a normal distribution $p(x) = N(x\mid \hat{\mu}, \hat{\Sigma})$ that approximates the posterior distribution with density $p$ such that

$$ F(p \mid q) = \int p(x) \cdot \lVert \nabla p(x) - \nabla q(x)\rVert_{\hat{\Sigma}}^2 dx $$

is small. (Where $\lVert x\rVert_{\hat{\Sigma}}$ is the norm defined by the preconditioner). Equivalently as an affine transformation $T(x) = \hat{\Sigma}^\tfrac{1}{2}x + \mu$ such that

$$ F(p, T) = \int p(x) \cdot \lVert\nabla T(x) - \nabla N(x\mid 0, I)\rVert ^ 2 dx $$

is minimal.

Given an arbitrary but sufficiently nice posterior $p$, this is minimal if $\hat{\Sigma}$ is the geodesic mean of the covariance of $p$ and the inverse of the covariance of $\nabla p$. If $p$ is normal, then $Cov(\nabla p) = Cov(p)^{-1}$, so the minimum is reached at the covariance matrix.

If we only allow diagonal preconditioning matrices, we can find the minimum analytically as

$$ C = \text{diag}\left(\sqrt{\frac{\text{Var}(p)}{\text{Var}(\nabla p)}}\right). $$

This diagonal preconditioner is already implemented in PyMC and nuts-rs.

If we approximate the integral in $F$ with a finite number of samples using a Monte Carlo estimate, we find that $F$ is minimal if

$$ \text{Cov}(x_i) = \hat{\Sigma} \text{Cov}(\nabla x_i) \hat{\Sigma} $$

If we have more dimensions than draws this does not have a unique solution, so we introduce regularization. Some regularization methods based on the logdet or trace of $\Sigma$ or $\Sigma^{-1}$ still allow more or less explicit solutions as a algebraic Riccati equations that sometimes can be made to scale reasonably with the dimension, but in my experiments the geodesic distance to $I$, $R(\hat\Sigma)=\sum\log(\sigma_i) ^ 2$ seems to work better.

To avoid quadratic memory and computational costs with the dimensionality, we write $\hat{\Sigma} = D(I + Q\Sigma Q^T - QQ^T)D$ where $Q\in\mathbb{R}^{N\times k}$ orthogonal and $D, \Sigma$ diagonal, so that we can perform all operations necessary for HMC or NUTS in $O(Nk)$.

We can now define a Riemannian metric on the space of all $(D, Q, \Sigma)$ as a pullback of the fisher information metric of $N(0, \hat\Sigma)$ and minimize $F$ using natural gradient descent. If we do this during tuning, we get similar behavior as in a stochastic natural descent, and can avoid the saddle points during optimization.

Acknowledgment

A lot of the work that went into this package was during my time at Quantopian, while trying to improve sampling of a (pretty awesome) model for portfolio optimization. Thanks a lot for making that possible!

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