This tutorial shows how to use the Sparse Axis-Aligned Subspace Bayesian Optimization (SAASBO) method for high-dimensional Bayesian optimization [1]. SAASBO places strong priors on the inverse lengthscales to avoid overfitting in high-dimensional spaces. Specifically, SAASBO uses a hierarchical sparsity prior consisting of a global shrinkage parameter $\tau \sim \mathcal{HC}(\beta)$ and inverse lengthscales $\rho_d \sim \mathcal{HC}(\tau)$ for $d=1, ..., D$, where $\mathcal{HC}$ is the half-Cauchy distribution. While half-Cauchy priors favor values near zero they also have heavy tails, which allows the inverse lengthscales of the most important parameters to escape zero. To do inference in the SAAS model we use Hamiltonian Monte Carlo (HMC) as we found that to outperform MAP inference.
We find that SAASBO performs well on problems with hundreds of dimensions. As we rely on HMC and in particular the No-U-Turn-Sampler (NUTS) for inference, the overhead of SAASBO scales cubically with the number of datapoints. Depending on the problem, using more than $100$ evaluations may not be feasible as SAASBO is designed for problems with a limited evaluation budget.
[1] D. Eriksson, M. Jankowiak. High-Dimensional Bayesian Optimization with Sparse Axis-Aligned Subspaces. Proceedings of the Thirty-Seventh Conference on Uncertainty in Artificial Intelligence, 2021.
from ax import Data, Experiment, ParameterType, RangeParameter, SearchSpace
from ax.modelbridge.generation_strategy import GenerationStep, GenerationStrategy
from ax.modelbridge.registry import Models
from ax.runners.synthetic import SyntheticRunner
import torch
torch.manual_seed(12345) # To always get the same Sobol points
tkwargs = {
"dtype": torch.double,
"device": torch.device("cuda" if torch.cuda.is_available() else "cpu"),
}
In this simple experiment we use the Branin function embedded in a 50-dimensional space. Additional resources:
from ax.core.metric import Metric
from ax.core.objective import Objective
from ax.core.optimization_config import OptimizationConfig
from ax.metrics.branin import BraninMetric
search_space = SearchSpace(
parameters=[
RangeParameter(
name=f"x{i}", parameter_type=ParameterType.FLOAT, lower=-5.0, upper=10.0
)
for i in range(25)
]
+ [
RangeParameter(
name=f"x{i + 25}", parameter_type=ParameterType.FLOAT, lower=0.0, upper=15.0,
)
for i in range(25)
]
)
optimization_config = OptimizationConfig(
objective=Objective(
metric=BraninMetric(
name="objective", param_names=["x19", "x44"],
noise_sd=0.0, # Set noise_sd=None if you want to learn the noise, otherwise it defaults to 1e-6
),
minimize=True,
)
)
N_INIT = 10
BATCH_SIZE = 3
N_BATCHES = 10
print(f"Doing {N_INIT + N_BATCHES * BATCH_SIZE} evaluations")
Doing 40 evaluations
# Experiment
experiment = Experiment(
name="saasbo_experiment",
search_space=search_space,
optimization_config=optimization_config,
runner=SyntheticRunner(),
)
# Initial Sobol points
sobol = Models.SOBOL(search_space=experiment.search_space)
for _ in range(N_INIT):
experiment.new_trial(sobol.gen(1)).run()
# Run SAASBO
data = experiment.fetch_data()
for i in range(N_BATCHES):
model = Models.FULLYBAYESIAN(
experiment=experiment,
data=data,
num_samples=256, # Increasing this may result in better model fits
warmup_steps=512, # Increasing this may result in better model fits
gp_kernel="rbf", # "rbf" is the default in the paper, but we also support "matern"
torch_device=tkwargs["device"],
torch_dtype=tkwargs["dtype"],
verbose=False, # Set to True to print stats from MCMC
disable_progbar=True, # Set to False to print a progress bar from MCMC
)
generator_run = model.gen(BATCH_SIZE)
trial = experiment.new_batch_trial(generator_run=generator_run)
trial.run()
data = Data.from_multiple_data([data, Metric._unwrap_trial_data_multi(results=trial.fetch_data())])
new_value = Metric._unwrap_trial_data_multi(results=trial.fetch_data()).df["mean"].min()
print(f"Iteration: {i}, Best in iteration {new_value:.3f}, Best so far: {data.df['mean'].min():.3f}")
Iteration: 0, Best in iteration 5.133, Best so far: 5.133 Iteration: 1, Best in iteration 5.873, Best so far: 5.133 Iteration: 2, Best in iteration 10.961, Best so far: 5.133 Iteration: 3, Best in iteration 8.173, Best so far: 5.133 Iteration: 4, Best in iteration 1.727, Best so far: 1.727 Iteration: 5, Best in iteration 2.594, Best so far: 1.727 Iteration: 6, Best in iteration 0.431, Best so far: 0.431 Iteration: 7, Best in iteration 0.398, Best so far: 0.398 Iteration: 8, Best in iteration 0.398, Best so far: 0.398 Iteration: 9, Best in iteration 0.398, Best so far: 0.398
SAASBO is able to find a solution close to the global optimal value of 0.398
import matplotlib
import matplotlib.pyplot as plt
import numpy as np
%matplotlib inline
matplotlib.rcParams.update({"font.size": 16})
fig, ax = plt.subplots(figsize=(8, 6))
res_saasbo = data.df['mean']
ax.plot(np.minimum.accumulate(res_saasbo), color="b", label="SAASBO")
ax.plot([0, len(res_saasbo)], [0.398, 0.398], "--", c="g", lw=3, label="Optimal value")
ax.grid(True)
ax.set_title("Branin, D=50", fontsize=20)
ax.set_xlabel("Number of evaluations", fontsize=20)
ax.set_xlim([0, len(res_saasbo)])
ax.set_ylabel("Best value found", fontsize=20)
ax.set_ylim([0, 8])
ax.legend(fontsize=18)
plt.show()
We fit a SAAS model with the same settings as above
model = Models.FULLYBAYESIAN(
experiment=experiment,
data=data,
use_saas=True,
num_samples=256,
warmup_steps=512,
gp_kernel="rbf",
torch_dtype=tkwargs["dtype"],
torch_device=tkwargs["device"],
disable_progbar=False,
verbose=False,
)
We have tools for cross-validation in Ax, but plotly doesn't render on Github so we make a simple plot using Matplotlib here. To use the built-in cross-validation functionality, you can do something like this:
from ax.modelbridge.cross_validation import cross_validate, compute_diagnostics
from ax.plot.diagnostic import interact_cross_validation
from ax.utils.notebook.plotting import render, init_notebook_plotting
cv = cross_validate(model)
diagnostics = compute_diagnostics(cv)
init_notebook_plotting()
plotconfig = interact_cross_validation(cv)
render(plotconfig)
from ax.modelbridge.cross_validation import cross_validate
# Cross-validate model
cv = cross_validate(model)
y_true = np.stack([cv_.observed.data.means for cv_ in cv]).ravel()
y_saas_mean = np.stack([cv_.predicted.means for cv_ in cv]).ravel()
y_saas_std = np.stack([np.sqrt(np.diag(cv_.predicted.covariance)) for cv_ in cv]).ravel()
# Cross-validation plot
fig, ax = plt.subplots(1, 1, figsize=(6, 6))
min_val, max_val = -5, 120
ax.plot([min_val, max_val], [min_val, max_val], "b--", lw=2)
markers, caps, bars = ax.errorbar(
y_true,
y_saas_mean,
yerr=1.96 * y_saas_std,
fmt=".",
capsize=4,
elinewidth=2.0,
ms=14,
c="k",
ecolor="gray",
)
[bar.set_alpha(0.8) for bar in bars]
[cap.set_alpha(0.8) for cap in caps]
ax.set_xlim([min_val, max_val])
ax.set_ylim([min_val, max_val])
ax.set_xlabel("True value", fontsize=20)
ax.set_ylabel("Predicted value", fontsize=20)
ax.grid(True)
As SAASBO places strong priors on the inverse lengthscales, we only expect parameters 19 and 44 to be identified as important by the model since the other parameters have no effect. We can confirm that this is the case below as the lengthscales of parameters 19 and 44 are close to 1 with all other lengthscales being larger than 1000.
median_lengthscales = model.model.model.models[0].covar_module.base_kernel.lengthscale.squeeze().median(axis=0).values
for i in median_lengthscales.argsort()[:10]:
print(f"Parameter {i:2}) Median lengthscale = {median_lengthscales[i]:.2e}")
Parameter 19) Median lengthscale = 2.72e-01 Parameter 44) Median lengthscale = 1.12e+00 Parameter 25) Median lengthscale = 7.82e+03 Parameter 42) Median lengthscale = 7.89e+03 Parameter 1) Median lengthscale = 9.06e+03 Parameter 35) Median lengthscale = 9.11e+03 Parameter 12) Median lengthscale = 9.34e+03 Parameter 32) Median lengthscale = 9.49e+03 Parameter 6) Median lengthscale = 9.77e+03 Parameter 3) Median lengthscale = 9.86e+03
Total runtime of script: 34 minutes, 2.39 seconds.