Revision ff4bb90d1135f1b57db3e4f6e4a2173894aa1b73 authored by st-- on 01 December 2020, 12:56:56 UTC, committed by GitHub on 01 December 2020, 12:56:56 UTC
* Replace len(inducing_variable) with inducing_variable.num inducing property (#1594). Adds support for inducing variables with dynamically changing shape. Change usage from `len(inducing_variable)` to `inducing_variable.num_inducing` instead. Resolves #1578. * HeteroskedasticTFPConditional should construct tensors at class-construction, not at module-import time (#1598)
statics.py
# Copyright 2017-2020 The GPflow Contributors. All Rights Reserved.
#
# Licensed under the Apache License, Version 2.0 (the "License");
# you may not use this file except in compliance with the License.
# You may obtain a copy of the License at
#
# http://www.apache.org/licenses/LICENSE-2.0
#
# Unless required by applicable law or agreed to in writing, software
# distributed under the License is distributed on an "AS IS" BASIS,
# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
# See the License for the specific language governing permissions and
# limitations under the License.
import tensorflow as tf
from ..base import Parameter
from ..utilities import positive
from .base import Kernel
class Static(Kernel):
"""
Kernels who don't depend on the value of the inputs are 'Static'. The only
parameter is a variance, σ².
"""
def __init__(self, variance=1.0, active_dims=None):
super().__init__(active_dims)
self.variance = Parameter(variance, transform=positive())
def K_diag(self, X):
return tf.fill(tf.shape(X)[:-1], tf.squeeze(self.variance))
class White(Static):
"""
The White kernel: this kernel produces 'white noise'. The kernel equation is
k(x_n, x_m) = δ(n, m) σ²
where:
δ(.,.) is the Kronecker delta,
σ² is the variance parameter.
"""
def K(self, X, X2=None):
if X2 is None:
d = tf.fill(tf.shape(X)[:-1], tf.squeeze(self.variance))
return tf.linalg.diag(d)
else:
shape = tf.concat([tf.shape(X)[:-1], tf.shape(X2)[:-1]], axis=0)
return tf.zeros(shape, dtype=X.dtype)
class Constant(Static):
"""
The Constant (aka Bias) kernel. Functions drawn from a GP with this kernel
are constant, i.e. f(x) = c, with c ~ N(0, σ^2). The kernel equation is
k(x, y) = σ²
where:
σ² is the variance parameter.
"""
def K(self, X, X2=None):
if X2 is None:
shape = tf.concat(
[
tf.shape(X)[:-2],
tf.reshape(tf.shape(X)[-2], [1]),
tf.reshape(tf.shape(X)[-2], [1]),
],
axis=0,
)
else:
shape = tf.concat([tf.shape(X)[:-1], tf.shape(X2)[:-1]], axis=0)
return tf.fill(shape, tf.squeeze(self.variance))
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