14. Optimization

14.1. Evaluating a single Gaussian process posterior

There are three main computational steps when doing a Gaussian process fit with GP:

  • Compute the prior covariance matrix using the kernel. This is \(O((n + m)^2)\) where n is the number of datapoints and m the number of additional points where the posterior is computed.

  • Decompose the prior covariance matrix. This is \(O(n^3)\).

  • Take random samples from the posterior. This is \(O(m^3)\).

Since usually \(m \gg n\) because the plot is done on a finely spaced grid, the typical bottleneck is taking the samples, i.e., calling gvar.sample() (or gvar.raniter()). This problem can be bypassed by plotting only the standard deviation band instead of taking samples, but it is less informative. To make gvar.sample() faster, use its eps option: gvar.sample(x, eps=1e-12). This forces it to use a Cholesky decomposition instead of a diagonalization.

In general the GP methods have options for doing everything without gvar, but don’t try to use all of them mindlessly before profiling the code to know where the bottleneck actually is. Python has the module cProfile for that, and in an IPython shell you can use %run -p. If you opt out of gvars, you can use lsqfitgp.raniter() to draw samples from an explicit mean vector and covariance matrix instead of gvar.raniter().

Once you have solved eventual gvar-related issues, if you have at least some hundreds of datapoints the next bottleneck is probably in GP.predfromdata(). Making it faster is quick: select a solver different from the default one when initializing the GP object, like GP(kernel, solver='chol'). And don’t forget to disable the \(O((n+m)^2)\) positivity check: GP(kernel, solver='chol', checkpos=False).

If you have written a custom kernel, it may become a bottleneck. For example the letter counting kernel in A custom kernel: text classification was very slow. A quick way to get a 2x improvement is computing only half of the covariance matrix: GP(kernel, checksym=False, halfmatrix=True). Note however that in some cases this may cause a large perfomance hit, so by default the full covariance matrix is computed even if checksym=False (but the cross covariance matrices are not computed twice).

14.2. The JAX compiler

Since lsqfitgp uses JAX as computational backend, which provides a just in time compiler (JIT), in many cases a piece of code doing stuff with a Gaussian process can be put into a function and compiled to low-level instructions with jax.jit, provided all the array operations are implemented with jax.numpy instead of numpy, and gvars are avoided. Example:

import jax
from jax import numpy as jnp
import lsqfitgp as lgp

def doinference(data, **options):
    x = jnp.linspace(0, 10, len(data))
    xplot = jnp.linspace(0, 10, 100)
    gp = lgp.GP(lgp.ExpQuad(), **options)
    gp.addx(x, 'data')
    gp.addx(xplot, 'plot')
    yplot_mean, yplot_cov = gp.predfromdata({'data': data}, 'plot', raw=True)
    # notice we use raw=True to return mean and covariance separately
    # instead of implicitly tracked into gvars
    yplot_sdev = jnp.sqrt(jnp.diag(yplot_cov))
    return yplot_mean, yplot_sdev

doinference_compiled = jax.jit(doinference, static_argnames=['solver', 'checkpos', 'checksym'])
# static_argnames indicates the function parameters that are not numerical
# and should not be dealt with by the compiler, I've put some I will use
# later

import timeit

def benchmark(func, *args, **kwargs):
    timer = timeit.Timer('func(*args, **kwargs)', globals=locals())
    n, _ = timer.autorange()
    times = timer.repeat(5, n)
    time = min(times) / n
    print(f'{func.__name__} took {time * 1e3:7.3f} ms on average')

data = jnp.zeros(10)
benchmark(doinference, data)
benchmark(doinference_compiled, data)

And the winner is:

doinference took   5.651 ms on average
doinference took   0.074 ms on average

The compiled version is 70 times faster. The difference is so stark because we used only 10 datapoints, so most of the time is spent in routing overhead instead of actual computations. Repeating with 1000 datapoints, the advantage should be limited:

data = jnp.zeros(1000)
benchmark(doinference, data)
benchmark(doinference_compiled, data)

Indeed:

doinference took 356.814 ms on average
doinference took 187.924 ms on average

With many datapoints we said that changing the GP options is the important tweak. Let’s check:

kw = dict(solver='chol', checkpos=False, checksym=False)
benchmark(doinference, data, **kw)
benchmark(doinference_compiled, data, **kw)

Result:

doinference took  54.725 ms on average
doinference took  16.106 ms on average

As expected.

14.3. Fitting hyperparameters

The function empbayes_fit finds the “optimal” hyperparameters by feeding the GP-factory you give to it into a minimization routine that tries to change the hyperparameters one step at a time and each time recreates the GP object and does some computations to check how a “good fit” it is for the given data.

From the point of view of computational efficiency this means that, apart from taking posterior samples, the other techniques explained in the previous sections also apply here. In particular, when the number of datapoints n starts to be in the hundreds, to speed up the fit do:

GP(kernel, solver='chol', checkpos=False)

when you create the GP object in the factory function. empbayes_fit applies the jit for you if passed the jit=True option, so you don’t have to deal with it yourself.