botorch.acquisition

botorch.acquisition.acquisition

Abstract base module for all botorch acquisition functions.

AcquisitionFunction

class botorch.acquisition.acquisition.AcquisitionFunction(model)[source]

Abstract base class for acquisition functions.

Constructor for the AcquisitionFunction base class.

Parameters:model (Model) – A fitted model.
forward(X)[source]

Evaluate the acquisition function on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of acquisition function values at the given design points X.
set_X_pending(X_pending=None)[source]

Informs the acquisition function about pending design points.

Parameters:X_pending (Optional[Tensor]) – m x d Tensor with m d-dim design points that have been submitted for evaluation but have not yet been evaluated.
Return type:None

botorch.acquisition.analytic

Analytic acquisition functions (not using (q-)MC sampling).

Analytic Acquisition Functions that evaluate the posterior without performing Monte-Carlo sampling.

AnalyticAcquisitionFunction

class botorch.acquisition.analytic.AnalyticAcquisitionFunction(model)[source]

Base class for analytic acquisition functions.

Constructor for the AcquisitionFunction base class.

Parameters:model (Model) – A fitted model.
set_X_pending(X_pending=None)[source]

Informs the acquisition function about pending design points.

Parameters:X_pending (Optional[Tensor]) – m x d Tensor with m d-dim design points that have been submitted for evaluation but have not yet been evaluated.
Return type:None

ExpectedImprovement

class botorch.acquisition.analytic.ExpectedImprovement(model, best_f, maximize=True)[source]

Single-outcome Expected Improvement (analytic).

Computes classic Expected Improvement over the current best observed value, using the analytic formula for a Normal posterior distribution. Unlike the MC-based acquisition functions, this relies on the posterior at single test point being Gaussian (and require the posterior to implement mean and variance properties). Only supports the case of q=1. The model must be single-outcome.

EI(x) = E(max(y - best_f, 0)), y ~ f(x)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> EI = ExpectedImprovement(model, best_f=0.2)
>>> ei = EI(test_X)

Single-outcome Expected Improvement (analytic).

Parameters:
  • model (Model) – A fitted single-outcome model.
  • best_f (Union[float, Tensor]) – Either a scalar or a b-dim Tensor (batch mode) representing the best function value observed so far (assumed noiseless).
  • maximize (bool) – If True, consider the problem a maximization problem.
forward(X)[source]

Evaluate Expected Improvement on the candidate set X.

Parameters:X (Tensor) – A b1 x … bk x 1 x d-dim batched tensor of d-dim design points. Expected Improvement is computed for each point individually, i.e., what is considered are the marginal posteriors, not the joint.
Return type:Tensor
Returns:A b1 x … bk-dim tensor of Expected Improvement values at the given design points X.

PosteriorMean

class botorch.acquisition.analytic.PosteriorMean(model)[source]

Single-outcome Posterior Mean.

Only supports the case of q=1. Requires the model’s posterior to have a mean property. The model must be single-outcome.

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> PM = PosteriorMean(model)
>>> pm = PM(test_X)

Constructor for the AcquisitionFunction base class.

Parameters:model (Model) – A fitted model.
forward(X)[source]

Evaluate the posterior mean on the candidate set X.

Parameters:X (Tensor) – A (b) x 1 x d-dim Tensor of (b) t-batches of d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Posterior Mean values at the given design points X.

ProbabilityOfImprovement

class botorch.acquisition.analytic.ProbabilityOfImprovement(model, best_f, maximize=True)[source]

Single-outcome Probability of Improvement.

Probability of improvment over the current best observed value, computed using the analytic formula under a Normal posterior distribution. Only supports the case of q=1. Requires the posterior to be Gaussian. The model must be single-outcome.

PI(x) = P(y >= best_f), y ~ f(x)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> PI = ProbabilityOfImprovement(model, best_f=0.2)
>>> pi = PI(test_X)

Single-outcome analytic Probability of Improvement.

Parameters:
  • model (Model) – A fitted single-outcome model.
  • best_f (Union[float, Tensor]) – Either a scalar or a b-dim Tensor (batch mode) representing the best function value observed so far (assumed noiseless).
  • maximize (bool) – If True, consider the problem a maximization problem.
forward(X)[source]

Evaluate the Probability of Improvement on the candidate set X.

Parameters:X (Tensor) – A (b) x 1 x d-dim Tensor of (b) t-batches of d-dim design points each.
Return type:Tensor
Returns:A (b)-dim tensor of Probability of Improvement values at the given design points X.

UpperConfidenceBound

class botorch.acquisition.analytic.UpperConfidenceBound(model, beta, maximize=True)[source]

Single-outcome Upper Confidence Bound (UCB).

Analytic upper confidence bound that comprises of the posterior mean plus an additional term: the posterior standard deviation weighted by a trade-off parameter, beta. Only supports the case of q=1 (i.e. greedy, non-batch selection of design points). The model must be single-outcome.

UCB(x) = mu(x) + sqrt(beta) * sigma(x), where mu and sigma are the posterior mean and standard deviation, respectively.

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> UCB = UpperConfidenceBound(model, beta=0.2)
>>> ucb = UCB(test_X)

Single-outcome Upper Confidence Bound.

Parameters:
  • model (Model) – A fitted single-outcome GP model (must be in batch mode if candidate sets X will be)
  • beta (Union[float, Tensor]) – Either a scalar or a one-dim tensor with b elements (batch mode) representing the trade-off parameter between mean and covariance
  • maximize (bool) – If True, consider the problem a maximization problem.
forward(X)[source]

Evaluate the Upper Confidence Bound on the candidate set X.

Parameters:X (Tensor) – A (b) x 1 x d-dim Tensor of (b) t-batches of d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Upper Confidence Bound values at the given design points X.

ConstrainedExpectedImprovement

class botorch.acquisition.analytic.ConstrainedExpectedImprovement(model, best_f, objective_index, constraints, maximize=True)[source]

Constrained Expected Improvement (feasibility-weighted).

Computes the analytic expected improvement for a Normal posterior distribution, weighted by a probability of feasibility. The objective and constraints are assumed to be independent and have Gaussian posterior distributions. Only supports the case q=1. The model should be multi-outcome, with the index of the objective and constraints passed to the constructor.

Constrained_EI(x) = EI(x) * Product_i P(y_i in [lower_i, upper_i]), where y_i ~ constraint_i(x) and lower_i, upper_i are the lower and upper bounds for the i-th constraint, respectively.

Example

>>> # example where 0th output has a non-negativity constraint and
... # 1st output is the objective
>>> model = SingleTaskGP(train_X, train_Y)
>>> constraints = {0: (0.0, None)}
>>> cEI = ConstrainedExpectedImprovement(model, 0.2, 1, constraints)
>>> cei = cEI(test_X)

Analytic Constrained Expected Improvement.

Parameters:
  • model (Model) – A fitted single-outcome model.
  • best_f (Union[float, Tensor]) – Either a scalar or a b-dim Tensor (batch mode) representing the best function value observed so far (assumed noiseless).
  • objective_index (int) – The index of the objective.
  • constraints (Dict[int, Tuple[Optional[float], Optional[float]]]) – A dictionary of the form {i: [lower, upper]}, where i is the output index, and lower and upper are lower and upper bounds on that output (resp. interpreted as -Inf / Inf if None)
  • maximize (bool) – If True, consider the problem a maximization problem.
forward(X)[source]

Evaluate Constrained Expected Improvement on the candidate set X.

Parameters:X (Tensor) – A (b) x 1 x d-dim Tensor of (b) t-batches of d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Expected Improvement values at the given design points X.

NoisyExpectedImprovement

class botorch.acquisition.analytic.NoisyExpectedImprovement(model, X_observed, num_fantasies=20, maximize=True)[source]

Single-outcome Noisy Expected Improvement (via fantasies).

This computes Noisy Expected Improvement by averaging over the Expected Improvemnt values of a number of fantasy models. Only supports the case q=1. Assumes that the posterior distribution of the model is Gaussian. The model must be single-outcome.

NEI(x) = E(max(y - max Y_baseline), 0)), (y, Y_baseline) ~ f((x, X_baseline)), where X_baseline are previously observed points.

Note: This acquisition function currently relies on using a FixedNoiseGP (required for noiseless fantasies).

Example

>>> model = FixedNoiseGP(train_X, train_Y, train_Yvar=train_Yvar)
>>> NEI = NoisyExpectedImprovement(model, train_X)
>>> nei = NEI(test_X)

Single-outcome Noisy Expected Improvement (via fantasies).

Parameters:
  • model (GPyTorchModel) – A fitted single-outcome model.
  • X_observed (Tensor) – A m x d Tensor of observed points that are likely to be the best observed points so far.
  • num_fantasies (int) – The number of fantasies to generate. The higher this number the more accurate the model (at the expense of model complexity and performance).
  • maximize (bool) – If True, consider the problem a maximization problem.
forward(X)[source]

Evaluate Expected Improvement on the candidate set X.

Parameters:X (Tensor) – A b1 x … bk x 1 x d-dim batched tensor of d-dim design points.
Return type:Tensor
Returns:A b1 x … bk-dim tensor of Noisy Expected Improvement values at the given design points X.

botorch.acquisition.monte_carlo

Batch acquisition functions using the reparameterization trick in combination with (quasi) Monte-Carlo sampling. See [Rezende2014reparam] and [Wilson2017reparam]

[Rezende2014reparam]D. J. Rezende, S. Mohamed, and D. Wierstra. Stochastic backpropagation and approximate inference in deep generative models. ICML 2014.
[Wilson2017reparam]J. T. Wilson, R. Moriconi, F. Hutter, and M. P. Deisenroth. The reparameterization trick for acquisition functions. ArXiv 2017.

MCAcquisitionFunction

class botorch.acquisition.monte_carlo.MCAcquisitionFunction(model, sampler=None, objective=None, X_pending=None)[source]

Abstract base class for Monte-Carlo based batch acquisition functions.

Constructor for the MCAcquisitionFunction base class.

Parameters:
  • model (Model) – A fitted model.
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=512, collapse_batch_dims=True).
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated.
forward(X)[source]

Takes in a (b) x q x d X Tensor of (b) t-batches with q d-dim design points each, and returns a one-dimensional Tensor with (b) elements. Should utilize the result of set_X_pending as needed to account for pending function evaluations.

Return type:Tensor

qExpectedImprovement

class botorch.acquisition.monte_carlo.qExpectedImprovement(model, best_f, sampler=None, objective=None, X_pending=None)[source]

MC-based batch Expected Improvement.

This computes qEI by (1) sampling the joint posterior over q points (2) evaluating the improvement over the current best for each sample (3) maximizing over q (4) averaging over the samples

qEI(X) = E(max(max Y - best_f, 0)), Y ~ f(X), where X = (x_1,…,x_q)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> best_f = train_Y.max()[0]
>>> sampler = SobolQMCNormalSampler(1000)
>>> qEI = qExpectedImprovement(model, best_f, sampler)
>>> qei = qEI(test_X)

q-Expected Improvement.

Parameters:
  • model (Model) – A fitted model.
  • best_f (Union[float, Tensor]) – The best (feasible) function value observed so far (assumed noiseless).
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=500, collapse_batch_dims=True)
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated. Concatenated into X upon forward call. Copied and set to have no gradient.
forward(X)[source]

Evaluate qExpectedImprovement on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Expected Improvement values at the given design points X.

qNoisyExpectedImprovement

class botorch.acquisition.monte_carlo.qNoisyExpectedImprovement(model, X_baseline, sampler=None, objective=None, X_pending=None)[source]

MC-based batch Noisy Expected Improvement.

This function does not assume a best_f is known (which would require noiseless observations). Instead, it uses samples from the joint posterior over the q test points and previously observed points. The improvement over previously observed points is computed for each sample and averaged.

qNEI(X) = E(max(max Y - max Y_baseline, 0)), where (Y, Y_baseline) ~ f((X, X_baseline)), X = (x_1,…,x_q)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> sampler = SobolQMCNormalSampler(1000)
>>> qNEI = qNoisyExpectedImprovement(model, train_X, sampler)
>>> qnei = qNEI(test_X)

q-Noisy Expected Improvement.

Parameters:
  • model (Model) – A fitted model.
  • X_baseline (Tensor) – A r x d-dim Tensor of r design points that have already been observed. These points are considered as the potential best design point.
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=500, collapse_batch_dims=True).
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated. Concatenated into X upon forward call. Copied and set to have no gradient.
forward(X)[source]

Evaluate qNoisyExpectedImprovement on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Noisy Expected Improvement values at the given design points X.

qProbabilityOfImprovement

class botorch.acquisition.monte_carlo.qProbabilityOfImprovement(model, best_f, sampler=None, objective=None, X_pending=None, tau=0.001)[source]

MC-based batch Probability of Improvement.

Estimates the probability of improvement over the current best observed value by sampling from the joint posterior distribution of the q-batch. MC-based estimates of a probability involves taking expectation of an indicator function; to support auto-differntiation, the indicator is replaced with a sigmoid function with temperature parameter tau.

qPI(X) = P(max Y >= best_f), Y ~ f(X), X = (x_1,…,x_q)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> best_f = train_Y.max()[0]
>>> sampler = SobolQMCNormalSampler(1000)
>>> qPI = qProbabilityOfImprovement(model, best_f, sampler)
>>> qpi = qPI(test_X)

q-Probability of Improvement.

Parameters:
  • model (Model) – A fitted model.
  • best_f (Union[float, Tensor]) – The best (feasible) function value observed so far (assumed noiseless).
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=500, collapse_batch_dims=True)
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated. Concatenated into X upon forward call. Copied and set to have no gradient.
  • tau (float) – The temperature parameter used in the sigmoid approximation of the step function. Smaller values yield more accurate approximations of the function, but result in gradients estimates with higher variance.
forward(X)[source]

Evaluate qProbabilityOfImprovement on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Probability of Improvement values at the given design points X.

qSimpleRegret

class botorch.acquisition.monte_carlo.qSimpleRegret(model, sampler=None, objective=None, X_pending=None)[source]

MC-based batch Simple Regret.

Samples from the joint posterior over the q-batch and computes the simple regret.

qSR(X) = E(max Y), Y ~ f(X), X = (x_1,…,x_q)

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> sampler = SobolQMCNormalSampler(1000)
>>> qSR = qSimpleRegret(model, sampler)
>>> qsr = qSR(test_X)

Constructor for the MCAcquisitionFunction base class.

Parameters:
  • model (Model) – A fitted model.
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=512, collapse_batch_dims=True).
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated.
forward(X)[source]

Evaluate qSimpleRegret on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Simple Regret values at the given design points X.

qUpperConfidenceBound

class botorch.acquisition.monte_carlo.qUpperConfidenceBound(model, beta, sampler=None, objective=None, X_pending=None)[source]

MC-based batch Upper Confidence Bound.

Uses a reparameterization to extend UCB to qUCB for q > 1 (See Appendix A of [Wilson2017reparam].)

qUCB = E(max(mu + |Y_tilde - mu|)), where Y_tilde ~ N(mu, beta pi/2 Sigma) and f(X) has distribution N(mu, Sigma).

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> sampler = SobolQMCNormalSampler(1000)
>>> qUCB = qUpperConfidenceBound(model, 0.1, sampler)
>>> qucb = qUCB(test_X)

q-Upper Confidence Bound.

Parameters:
  • model (Model) – A fitted model.
  • beta (float) – Controls tradeoff between mean and standard deviation in UCB.
  • sampler (Optional[MCSampler]) – The sampler used to draw base samples. Defaults to SobolQMCNormalSampler(num_samples=500, collapse_batch_dims=True)
  • objective (Optional[MCAcquisitionObjective]) – The MCAcquisitionObjective under which the samples are evaluated. Defaults to IdentityMCObjective().
  • X_pending (Optional[Tensor]) – A m x d-dim Tensor of m design points that have points that have been submitted for function evaluation but have not yet been evaluated. Concatenated into X upon forward call. Copied and set to have no gradient.
forward(X)[source]

Evaluate qUpperConfidenceBound on the candidate set X.

Parameters:X (Tensor) – A (b) x q x d-dim Tensor of (b) t-batches with q d-dim design points each.
Return type:Tensor
Returns:A (b)-dim Tensor of Upper Confidence Bound values at the given design points X.

botorch.acquisition.objective

Objective Modules to be used with acquisition functions.

MCAcquisitionObjective

class botorch.acquisition.objective.MCAcquisitionObjective[source]

Abstract base class for MC-based objectives.

forward(samples)[source]

Evaluate the objective on the samples.

Parameters:samples (Tensor) – A sample_shape x batch_shape x q x o-dim Tensors of samples from a model posterior.
Returns:A sample_shape x batch_shape x q-dim Tensor of objective values (assuming maximization).
Return type:Tensor

This method is usually not called directly, but via the objectives

Example

>>> # `__call__` method:
>>> samples = sampler(posterior)
>>> outcome = mc_obj(samples)

IdentityMCObjective

class botorch.acquisition.objective.IdentityMCObjective[source]

Trivial objective extracting the last dimension.

Example

>>> identity_objective = IdentityMCObjective()
>>> samples = sampler(posterior)
>>> objective = identity_objective(samples)
forward(samples)[source]

Evaluate the objective on the samples.

Parameters:samples (Tensor) – A sample_shape x batch_shape x q x o-dim Tensors of samples from a model posterior.
Returns:A sample_shape x batch_shape x q-dim Tensor of objective values (assuming maximization).
Return type:Tensor

This method is usually not called directly, but via the objectives

Example

>>> # `__call__` method:
>>> samples = sampler(posterior)
>>> outcome = mc_obj(samples)

LinearMCObjective

class botorch.acquisition.objective.LinearMCObjective(weights)[source]

Linear objective constructed from a weight tensor.

For input samples and mc_obj = LinearMCObjective(weights), this produces mc_obj(samples) = sum_{i} weights[i] * samples[…, i]

Example

Example for a model with two outcomes:

>>> weights = torch.tensor([0.75, 0.25])
>>> linear_objective = LinearMCObjective(weights)
>>> samples = sampler(posterior)
>>> objective = linear_objective(samples)

Linear Objective.

Parameters:weights (Tensor) – A one-dimensional tensor with o elements representing the linear weights on the outputs.
forward(samples)[source]

Evaluate the linear objective on the samples.

Parameters:samples (Tensor) – A sample_shape x batch_shape x q x o-dim tensors of samples from a model posterior.
Return type:Tensor
Returns:A sample_shape x batch_shape x q-dim tensor of objective values.

GenericMCObjective

class botorch.acquisition.objective.GenericMCObjective(objective)[source]

Objective generated from a generic callable.

Allows to construct arbitrary MC-objective functions from a generic callable. In order to be able to use gradient-based acquisition function optimization it should be possible to backpropagate through the callable.

Example

>>> generic_objective = GenericMCObjective(lambda Y: torch.sqrt(Y).sum(dim=-1))
>>> samples = sampler(posterior)
>>> objective = generic_objective(samples)

Objective generated from a generic callable.

Parameters:objective (Callable[[Tensor], Tensor]) – A callable mapping a sample_shape x batch-shape x q x o- dim Tensor to a sample_shape x batch-shape x q-dim Tensor of objective values.
forward(samples)[source]

Evaluate the feasibility-weigthed objective on the samples.

Parameters:samples (Tensor) – A sample_shape x batch_shape x q x o-dim Tensors of samples from a model posterior.
Return type:Tensor
Returns:A sample_shape x batch_shape x q-dim Tensor of objective values weighted by feasibility (assuming maximization).

ConstrainedMCObjective

class botorch.acquisition.objective.ConstrainedMCObjective(objective, constraints, infeasible_cost=0.0, eta=0.001)[source]

Feasibility-weighted objective.

An Objective allowing to maximize some scalable objective on the model outputs subject to a number of constraints. Constraint feasibilty is approximated by a sigmoid function.

mc_acq(X) = objective(X) * prod_i (1 - sigmoid(constraint_i(X))) TODO: Document functional form exactly.

See botorch.utils.objective.apply_constraints for details on the constarint handling.

Example

>>> bound = 0.0
>>> objective = lambda Y: Y[..., 0]
>>> # apply non-negativity constraint on f(x)[1]
>>> constraint = lambda Y: bound - Y[..., 1]
>>> constrained_objective = ConstrainedMCObjective(objective, [constraint])
>>> samples = sampler(posterior)
>>> objective = constrained_objective(samples)

Feasibility-weighted objective.

Parameters:
  • objective (Callable[[Tensor], Tensor]) – A callable mapping a sample_shape x batch-shape x q x o- dim Tensor to a sample_shape x batch-shape x q-dim Tensor of objective values.
  • constraints (List[Callable[[Tensor], Tensor]]) – A list of callables, each mapping a Tensor of dimension sample_shape x batch-shape x q x o to a Tensor of dimension sample_shape x batch-shape x q, where negative values imply feasibility.
  • infeasible_cost (float) – The cost of a design if all associated samples are infeasible.
  • eta (float) – The temperature parameter of the sigmoid function approximating the constraint.
forward(samples)[source]

Evaluate the feasibility-weighted objective on the samples.

Parameters:samples (Tensor) – A sample_shape x batch_shape x q x o-dim Tensors of samples from a model posterior.
Return type:Tensor
Returns:A sample_shape x batch_shape x q-dim Tensor of objective values weighted by feasibility (assuming maximization).

botorch.acquisition.utils

Utilities for acquisition functions.

botorch.acquisition.utils.get_acquisition_function(acquisition_function_name, model, objective, X_observed, X_pending=None, mc_samples=500, qmc=True, seed=None, **kwargs)[source]

Convenience function for initializing botorch acquisition functions.

Parameters:
  • acquisition_function_name (str) – Name of the acquisition function.
  • model (Model) – A fitted model.
  • objective (MCAcquisitionObjective) – A MCAcquisitionObjective.
  • X_observed (Tensor) – A m1 x d-dim Tensor of m1 design points that have already been observed.
  • X_pending (Optional[Tensor]) – A m2 x d-dim Tensor of m2 design points whose evaluation is pending.
  • mc_samples (int) – The number of samples to use for (q)MC evaluation of the acquisition function.
  • qmc (bool) – If True, use quasi-Monte-Carlo sampling (instead of iid).
  • seed (Optional[int]) – If provided, perform deterministic optimization (i.e. the function to optimize is fixed and not stochastic).
Return type:

MCAcquisitionFunction

Returns:

The requested acquisition function.

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> obj = LinearMCObjective(weights=torch.tensor([1.0, 2.0]))
>>> acqf = get_acquisition_function("qEI", model, obj, train_X)
botorch.acquisition.utils.get_infeasible_cost(X, model, objective=<function squeeze_last_dim>)[source]

Get infeasible cost for a model and objective.

Computes an infeasible cost M such that -M < min_x f(x) almost always,
so that feasible points are preferred.
Parameters:
  • X (Tensor) – A m x d Tensor of m design points to use in evaluating the minimum. These points should cover the design space well. The more points the better the estimate, at the expense of added computation.
  • model (Model) – A fitted botorch model.
  • objective (Callable[[Tensor], Tensor]) – The objective with which to evaluate the model output.
Return type:

float

Returns:

The infeasible cost M value.

Example

>>> model = SingleTaskGP(train_X, train_Y)
>>> objective = lambda Y: Y[..., -1] ** 2
>>> M = get_infeasible_cost(train_X, model, obj)
botorch.acquisition.utils.is_nonnegative(acq_function)[source]

Determine whether a given acquisition function is non-negative.

Parameters:acq_function (AcquisitionFunction) – The AcquisitionFunction instance.
Return type:bool
Returns:True if acq_function is non-negative, False if not, or if the behavior is unknown (for custom acquisition functions).

Example

>>> qEI = qExpectedImprovement(model, best_f=0.1)
>>> is_nonnegative(qEI)  # returns True