Figure 1: Statistical expectation of
the energy and standard error of the mean for the anti-ferromagnetic
Ising chain of $n = 1024$ spins with $J = -0.5$ and $B = 0.1$.
Figure 2: Correlations for
the anti-ferromagnetic Ising chain of $n = 1024$ spins with $J = -0.5$
and $B = 0.1$.
Quantum mechanics emerges from classical mechanics by the relaxation of
commutativity among the observables as assumed by classical probability
theory. The most striking consequence of this relaxation is the
insufficiency of real-valued probability distributions to encode the
interference phenomena observed by experiment. In response, we
generalize the notion of probability distributions from real-valued
distributions over the set of possible outcomes which combine convexly,
to complex-valued distributions over the set of possible outcomes which
combine linearly. The complex-valued probabilities are able to encode
the observed interference patterns in their relative phases. Such
quantum probability distributions describe our knowledge of possible
outcomes of measurements on systems which cannot be said to be in a
definite state prior to measurement.
The increase in predictive power offered by quantum mechanics came with
the price of computational difficulties. Unlike the classical world,
whose dimensionality scales additively with the number of subsystems,
the dimensionality scaling of quantum systems is multiplicative. Thus,
even small systems quickly become intractable without approximation
techniques. Luckily, it is rarely the case that knowledge of the full
state space is required to accurately model a given system, as most
information may be contained in a relatively small subspace. Many of the
most successful approximation techniques of the last century, such as
Born–Oppenheimer and variational techniques like Density Functional
Theory, rely on this convenient notion for their success. With the rapid
development of machine learning, a field which specializes in
dimensionality reduction and feature extraction of very large datasets,
it is natural to apply these novel techniques for dealing with the
canonical large data problem of the physical sciences.
Restricted Boltzmann Machines
The Universal Approximation Theorems are a collection of results
concerning the ability of artificial neural networks to arbitrarily
approximate different classes of functions. In particular, the
Restricted Boltzmann Machine (RBM) is a shallow two-layer network
consisting of $n$ input nodes or visible units, and $m$ output nodes
or hidden units such that each input $v \in \{0,1\}^n$ and output $h
\in \{0,1\}^m$ are Boolean vectors of respective length. Letting
$\mathcal{M}$ be a parameter manifold with points $\alpha \in
\mathcal{M}$, the RBM is characterized by such parameters $\alpha =
\{a,b,w\}$ where $a \in \mathbb{R}^n$ are the visible layer biases, $b
\in \mathbb{R}^m$ are the hidden layer biases, and $w \in \mathbb{R}^{m
\times n}$ are the weights which fully connect the layers. The network
is "restricted" in the sense that there are no intra-layers connections.
Let $V = \{0,1\}^n$ be the set of inputs, let $H = \{0,1\}^m$ be the
set of outputs, and let $X = V \times H$ be the set of pairs. Then the
RBM is a universal approximator of Boltzmann probability distributions
$p(\alpha):X \to [0,1]$ at each $\alpha \in \mathcal{M}$ defined by
$$X \ni (v,h) \mapsto p(v,h,\alpha) =
\frac{\exp[-E(v,h,\alpha)]}{Z(\alpha)} = \frac{\exp(a^\perp v +
b^\perp h + h^\perp wv)}{\sum_{(v',h') \in X} \exp(a^\perp v' +
b^\perp h' + {h'}^\perp wv')} \in [0,1]$$
where $E(v,h,\alpha) = -a^\perp v - b^\perp h - h^\perp wv$ is the
parametrized Boltzmann energy and $Z(\alpha) = \sum_{(v',h') \in X}
\exp(a^\perp v' + b^\perp h' + {h'}^\perp wv')$ is the partition
function which normalizes the probabilities, with $\perp$ denoting the
matrix transpose. From the joint probability distribution $p(\alpha)$,
we may construct the marginal distributions as the restrictions
$p_V(\alpha):V \to [0,1]$ and $p_H(\alpha): H \to [0,1]$ at each $\alpha
\in \mathcal{M}$, given by the partial sums
$$p_V(v,\alpha) = \sum_{h \in H} p(v,h,\alpha)~~,~~p_H(h,\alpha)
= \sum_{v \in V} p(v,h,\alpha)$$
over $H$ and $V$ respectively. Due to the restricted nature of the RBM,
the activation probabilities $p(h_i=1|v,\alpha)$ and $p(v_j=1|h,\alpha)$
of each layer are mutually exclusive for all $i \in [1,m]$ and $j \in
[1,n]$ such that the conditional probabilities are the products
$$p(h|v,\alpha) = \prod_{i=1}^m p(h_i=1|v,\alpha)~~,~~p(v|h,\alpha)
= \prod_{j=1}^n p(v_j=1|h,\alpha)$$
of activation probabilities. The traditional method for training an RBM
involves Hinton's
Contrastive Divergence technique, which will not be covered here.
Neural Network Quantum States
The RBM is a natural choice for representing wave-functions of systems
of spin $\frac{1}{2}$ fermions where each input vector represents a
configuration of $n$ spins. Ultimately, we seek to solve the
time-independent Schrödinger equation $H\ket{\psi_0} = E_0\ket{\psi_0}$
for the ground state $\ket{\psi_0}$ and its corresponding energy $E_0$
for a given system having Hamiltonian $H$. We take a variational
approach by proposing a parametrized trial state as a vector-valued
mapping $\ket{\psi}:\mathcal{M} \to \mathcal{H}$ on a low-dimensional
parameter manifold $\mathcal{M}$ of points $\alpha \in \mathcal{M}$ to
a $2^n$-dimensional state space $\mathcal{H}$ and propose infinitesimal
variations to $\alpha \in \mathcal{M}$ until $\ket{\psi(\alpha)} \approx
\ket{\psi_0}$.
Letting $S = \{0,1\}^n$ be the set of inputs of the RBM, we may choose
an orthonormal basis $\{\ket{s}\} \subset \mathcal{H}$ labeled by the
configurations $s \in S$ such that the trial state at $\alpha \in
\mathcal{M}$ is a linear combination $\ket{\psi(\alpha)} = \sum_{s \in
S} \psi(s,\alpha) \ket{s} \in \mathcal{H}$, where the components
$\psi(s,\alpha) \in \mathbb{C}$ are wave-functions of the configurations
$s \in S$ at each $\alpha \in \mathcal{M}$.
The trial state wave-functions $\psi(\alpha):S \to \mathbb{C}$ are
represented as a Restricted Boltzmann Machine with complex parameters
$\alpha = \{a,b,w\}$, constructed as the marginal distribution on the
inputs of the RBM. With inputs $S = \{0,1\}^n$ and outputs $H =
\{0,1\}^m$, the RBM with complex parameters is a universal
approximator of complex probability distributions $\Psi(\alpha):S \times
H \to \mathbb{C}$ at each $\alpha \in \mathcal{M}$ such that the trial
state wave-functions $\psi(\alpha):S \to \mathbb{C}$ at each $\alpha \in
\mathcal{M}$ are the marginal distribution defined by
$$S \ni s \mapsto \psi(s,\alpha) = \sum_{h \in H} \Psi(s,h,\alpha) =
\sum_{h \in H} \exp(a^\dagger s + b^\dagger h + h^\dagger ws) =
\exp(a^\dagger s) \sum_{h \in H} \exp(b^\dagger h + h^\dagger ws) =
\exp\bigg(\sum_{j=1}^n a_j^*s_j\bigg) \sum_{h \in H}
\exp\bigg(\sum_{i=1}^m b_i^*h_i + \sum_{i=1}^m h_i \sum_{j=1}^n
w_{ij} s_j\bigg) = \exp\bigg(\sum_{j=1}^n a_j^*s_j\bigg) \sum_{h
\in H} \prod_{i=1}^m \exp\bigg(b_i^*h_i + h_i \sum_{j=1}^n w_{ij}
s_j\bigg) = \exp\bigg(\sum_{j=1}^n a_j^* s_j\bigg) \prod_{i=1}^m
\sum_{h_i=0}^1 \exp\bigg(b_i^*h_i + h_i \sum_{j=1}^n w_{ij}
s_j\bigg) = \exp\bigg(\sum_{j=1}^n a_j^* s_j\bigg) \prod_{i=1}^m
\bigg[ 1 + \exp\bigg(b_i^* + \sum_{j=1}^n w_{ij} s_j\bigg)\bigg]
\in \mathbb{C}$$
where we ignore the normalization factor of the wave-function, and where
$\dagger$ represents the matrix conjugate transpose. By the Born rule,
the real, normalized probability distribution $p(\alpha):S \to [0,1]$
associated to the wave-function $\psi(\alpha)$ at each $\alpha \in
\mathcal{M}$ is defined by $S \ni s \mapsto p(s,\alpha) =
|\psi(s,\alpha)|^2/\sum_{s' \in S} |\psi(s',\alpha)|^2 \in [0,1]$.
The variational energy functional $E[\psi(\alpha)]$ associated to the
variational state $\ket{\psi(\alpha)}$ at each $\alpha \in \mathcal{M}$
is the statistical expectation $E[\psi(\alpha)] = \langle H
\rangle_{\psi(\alpha)}$ of the Hamiltonian $H$ in the state
$\ket{\psi(\alpha)}$, given by
$$E[\psi(\alpha)] = \frac{\langle \psi(\alpha), H\psi(\alpha)
\rangle}{\langle \psi(\alpha), \psi(\alpha) \rangle} =
\frac{\sum_{s,s' \in S} \psi^* (s,\alpha) H_{ss'}
\psi(s',\alpha)}{\sum_{s' \in S} |\psi(s',\alpha)|^2} =
\frac{\sum_{s \in S} |\psi(s,\alpha)|^2 \left(\sum_{s' \in S}
H_{ss'} \frac{\psi(s',\alpha)}{\psi(s,\alpha)}\right)}{\sum_{s' \in
S} |\psi(s',\alpha)|^2} = \sum_{s \in S} p(s,\alpha)
E_{\text{loc}}(s,\alpha)$$
where we define the variational local energies $E_{\text{loc}}(s,\alpha)
= \sum_{s' \in S} H_{ss'} \frac{\psi(s',\alpha)}{\psi(s,\alpha)}$, with
$H_{ss'}$ being the matrix element of $H$ in between the states
$\ket{s}$ and $\ket{s'}$. Thus $E[\psi(\alpha)] = \sum_{s \in S}
p(s,\alpha) E_{\text{loc}}(s,\alpha)$ is the statistical expectation of
the local energies weighted by the real probability distribution
$p(\alpha):S \to [0,1]$.
Transverse Field Ising Model
In this demonstration, we assume the prototypical Ising spin model for a
one-dimensional lattice of spin $\frac{1}{2}$ particles, whose
Hamiltonian is a $2^n \times 2^n$ matrix given by
$$H = -J \sum_{j=1}^{n-1} \sigma_z^{(j)} \sigma_z^{(j+1)} - B
\sum_{j=1}^n \sigma_x^{(j)}$$
where we use the shorthand notation $\sigma_z^{(j)} \sigma_z^{(j+1)} =
I^{(1)} \otimes \cdots \otimes \sigma_z^{(j)} \otimes \sigma_z^{(j+1)}
\otimes \cdots \otimes I^{(n)}$ to denote the tensor product of the $2
\times 2$ identity matrix with the Pauli matrix $\sigma_z$ located at
positions $j$ and $j+1$, and where $\sigma_x^{(j)} = I^{(1)} \otimes
\cdots \otimes \sigma_x^{(j)} \otimes \cdots \otimes I^{(n)}$ denotes
$\sigma_x$ at position $j$. The constant $J$ represents the nearest
neighbor coupling strength, and $B$ represents the strength of the
transverse field restricted to $|B| < 1$ to correspond to the ordered
phase of the Ising material. When $J>0$, nearest neighbors tend to align
parallel (ferromagnetic), and tend to align anti-parallel when $J<0$
(anti-ferromagnetic). The local energy of a configuration $s \in S$ in
the Ising model can be seen to be
$$E_{\text{loc}}(s,\alpha) =-J \sum_{j=1}^{n-1} \sigma_j
\sigma_{j+1} - B \sum_{s' \in S_f}
\frac{\psi(s',\alpha)}{\psi(s,\alpha)}$$
where $\sigma_j = -2s_j + 1 \in \{1,-1\}$ and $S_f$ consists of $n$
configurations in which each respective spin in the configuration $s$
has been inverted.
Stochastic Optimization
Evaluating the energy functional $E[\psi(\alpha)] = \sum_{s \in S}
p(s,\alpha) E_{\text{loc}}(s,\alpha)$ at each $\alpha \in \mathcal{M}$
involves an explicit calculation of the distribution $p(\alpha):S \to
[0,1]$ for each $s \in S$ and a sum over $2^n$ states. Using Monte Carlo
methods, we may draw $N$ possibly overlapping samples $\tilde{S}$ from
$S$ according to the distribution $p(\alpha)$ such that the drawn
samples $\tilde{S}$ are represented in proportion to their contribution
to $p(\alpha)$. In other words, the samples drawn will tend to be from
regions of $S$ associated with the highest probabilities and which
therefore contribute the most to $E[\psi(\alpha)]$. We may then make the
reasonable approximation
$$E[\psi(\alpha)] \approx \frac{1}{N} \sum_{s \in \tilde{S}}
E_{\text{loc}}(s,\alpha)$$
of the energy functional as a simple average of the local energies over
the drawn samples $\tilde{S}$ weighted by equal probabilities $1/N$. The
samples can be drawn using the well-known Metropolis-Hastings algorithm,
a Markov Chain Monte Carlo algorithm of the following form:
SUBROUTINEmetropolis_hastings:
markov_chain(1) ← random_sample(n)
FOR i ∈ [2,N] DO
s ← markov_chain(i-1)
rind ← random_index(lo=1, hi=n)
s_prop ← invert_spin(config=s, at=rind)
IF r_unif(0,1) < |ψ(s_prop)/ψ(s)|^2THEN
markov_chain(i) ← s_prop
ELSE
markov_chain(i) ← s
END IF
END FOR
RETURN markov_chain
ENDSUBROUTINE metropolis_hastings
In practice, we allow for a thermalization period, or "burn-in" period,
during which the sampling process moves the initial random sample into
the stationary distribution before we can begin recording samples. As we
can see, the acceptance probabilities in the Metropolis-Hastings
algorithm and the form of the local energy involve only ratios of the
wave-functions $\psi(s,\alpha)$ for different configurations, and
therefore we are justified in ignoring the normalization factor in our
derivation of $\psi(s,\alpha)$. Once all samples are drawn, we may
estimate the energy functional as an average of the local energies over
the drawn samples.
The stochastic optimization algorithm is a first order optimization that
involves infinitesimal variations to the parameters $\alpha \in
\mathcal{M}$ according to the update rule
$$\alpha \leftarrow \alpha + \delta\alpha$$
where the variation $\delta\alpha$ is in the direction opposite the
generalized forces $F(\alpha)$ having components
$$F_l(\alpha) = \langle \partial_l^\dagger H \rangle_{\psi(\alpha)}
- \langle \partial_l^\dagger \rangle_{\psi(\alpha)} \langle H
\rangle_{\psi(\alpha)} = \frac{\langle \partial_l \psi(\alpha), H
\psi(\alpha) \rangle}{\langle \psi(\alpha), \psi(\alpha) \rangle} -
\frac{\langle \partial_l \psi(\alpha), \psi(\alpha) \rangle}{\langle
\psi(\alpha), \psi(\alpha) \rangle} \frac{\langle \psi(\alpha), H
\psi(\alpha) \rangle}{\langle \psi(\alpha), \psi(\alpha) \rangle} =
\sum_{s \in S} p(s,\alpha) O_l^*(s,\alpha) E_{\text{loc}}(s,
\alpha) - \bigg[ \sum_{s \in S} p(s,\alpha) O_l^*(s,\alpha) \bigg]
\bigg[ \sum_{s \in S} p(s,\alpha) E_{\text{loc}}(s,\alpha) \bigg]
\approx \frac{1}{N} \sum_{s \in \tilde{S}} O_l^*(s,\alpha)
E_{\text{loc}}(s, \alpha) - \bigg[ \frac{1}{N} \sum_{s \in
\tilde{S}} O_l^*(s,\alpha) \bigg] \bigg[ \frac{1}{N} \sum_{s \in
\tilde{S}} E_{\text{loc}}(s, \alpha) \bigg]$$
where we define the logarithmic derivatives
$$O_l(s,\alpha) = \frac{\partial}{\partial \alpha_l} \ln \psi(s,
\alpha) = \frac{1}{\psi(s, \alpha)} \frac{\partial}{\partial
\alpha_l} \psi(s, \alpha)$$
of the variational wave-functions $\psi(s, \alpha)$ in terms of diagonal
operators $O_l$ given by $O_l \psi(s, \alpha) = O_l(s,\alpha)$. In
statistical terms, the forces $F_l$ are the expected values of the
product of deviation operators $\Delta \partial_l^\dagger =
\partial_l^\dagger - \langle \partial_l^\dagger \rangle_{\psi(\alpha)}$
and $\Delta H = H - \langle H \rangle_{\psi(\alpha)}$ in the variational
state $\ket{\psi(\alpha)}$. i.e.
$$F_l(\alpha) = \langle \Delta \partial_l^\dagger \Delta H
\rangle_{\psi(\alpha)} = \langle \partial_l^\dagger H - \langle
\partial_l^\dagger \rangle_{\psi(\alpha)} H - \partial_l^\dagger
\langle H \rangle_{\psi(\alpha)} + \langle \partial_l^\dagger
\rangle_{\psi(\alpha)} \langle H \rangle_{\psi(\alpha)}
\rangle_{\psi(\alpha)} = \langle \partial_l^\dagger H
\rangle_{\psi(\alpha)} - \langle \partial_l^\dagger
\rangle_{\psi(\alpha)} \langle H \rangle_{\psi(\alpha)}$$
as a correlation function. We then pre-condition the forces $F(\alpha)$
with a Hermitian positive-definite matrix $S^{-1}(\alpha)$ prior to
updating the parameters $\alpha \in \mathcal{M}$, such that the update
rule is
$$\alpha \leftarrow \alpha + \delta\alpha = \alpha - \delta\tau
S^{-1}(\alpha) F(\alpha)$$
for some small time step $\delta \tau > 0$, where the matrix $S(\alpha)$
is known as the stochastic reconfiguration matrix whose components
are the correlation functions
$$S_{kl}(\alpha) = \langle \Delta \partial_k^\dagger \Delta
\partial_l \rangle_{\psi(\alpha)} = \langle \partial_k^\dagger
\partial_l \rangle_{\psi(\alpha)} - \langle \partial_k^\dagger
\rangle_{\psi(\alpha)} \langle \partial_l \rangle_{\psi(\alpha)} =
\frac{\langle \partial_k \psi(\alpha), \partial_l \psi(\alpha)
\rangle}{\langle \psi(\alpha), \psi(\alpha) \rangle} - \frac{\langle
\partial_k \psi(\alpha), \psi(\alpha) \rangle}{\langle \psi(\alpha),
\psi(\alpha) \rangle} \frac{\langle \psi(\alpha), \partial_l
\psi(\alpha) \rangle}{\langle \psi(\alpha), \psi(\alpha) \rangle} =
\sum_{s \in S} p(s,\alpha) O_k^*(s,\alpha) O_l(s,\alpha) - \bigg[
\sum_{s \in S} p(s,\alpha) O_k^*(s,\alpha) \bigg] \bigg[ \sum_{s
\in S} p(s,\alpha) O_l(s,\alpha) \bigg] \approx \frac{1}{N} \sum_{s
\in \tilde{S}} O_k^*(s,\alpha) O_l(s,\alpha) - \bigg[ \frac{1}{N}
\sum_{s \in \tilde{S}} O_k^*(s,\alpha) \bigg] \bigg[ \frac{1}{N}
\sum_{s \in \tilde{S}} O_l(s,\alpha) \bigg]$$
of the derivative deviations.
Derivation of Optimization Algorithm
Let $V$ be a neighborhood of a point $\alpha \in \mathcal{M}$ with a
local chart of coordinate functions $\alpha_l:\mathcal{M} \to
\mathbb{C}$ such that $\alpha_l(\alpha) = 0$ is the origin of the local
coordinate system. To derive the stochastic optimization update rule, we
first expand the function $\ket{\psi}:\mathcal{M} \to \mathcal{H}$ in a
Taylor series
$$\ket{\psi} = \ket{\psi(\alpha)} + \sum_l \frac{\partial}{\partial
\alpha_l} \ket{\psi(\alpha)} \alpha_l + \frac{1}{2} \sum_{kl}
\frac{\partial^2}{\partial \alpha_k \partial \alpha_l}
\ket{\psi(\alpha)} \alpha_k \alpha_l + \cdots$$
about $\alpha \in \mathcal{M}$. At some nearby point $\alpha +
\delta\alpha \in V$, we have
$$\ket{\psi(\alpha + \delta\alpha)} = \ket{\psi(\alpha)} + \sum_l
\delta\alpha_l \frac{\partial}{\partial \alpha_l} \ket{\psi(\alpha)}
+ \frac{1}{2} \sum_{kl} \delta\alpha_k \delta\alpha_l
\frac{\partial^2}{\partial \alpha_k \partial \alpha_l}
\ket{\psi(\alpha)} + \cdots \in \mathcal{H}$$
where $\delta\alpha_l \in \mathbb{C}$ is an infinitesimal variation in
the $l$-th direction, which is approximated to first order as an affine
function
$$\ket{\psi(\alpha + \delta\alpha)} \approx \ket{\psi(\alpha)} +
\sum_l \delta\alpha_l \frac{\partial}{\partial \alpha_l}
\ket{\psi(\alpha)} \in \mathcal{H}$$
on $V$. Here, the $\delta\alpha_l$ represent the amount of change to
$\alpha$ in each direction needed to linearly approximate the function
$\ket{\psi}$ at $\alpha + \delta\alpha \in V$ from the neighboring point
$\alpha \in \mathcal{M}$, so that the affine approximation becomes exact
in the limit $\delta\alpha_l \to 0$.
Similarly, we define a path $\alpha:[\tau, \tau + \delta \tau] \to
\mathcal{M}$ in $\mathcal{M}$ where $\delta\tau > 0$ such that
$\alpha(\tau) = \alpha \in \mathcal{M}$ and $\alpha(\tau + \delta \tau)
= \alpha + \delta\alpha \in V$, and expand the path about $\tau \in
\mathbb{R}$ to see
$$\alpha(\tau + \delta \tau) = \alpha(\tau) + \delta\tau \frac{d
\alpha}{d\tau}(\tau) + \frac{\delta\tau^2}{2} \frac{d^2
\alpha}{d\tau^2}(\tau) + \cdots \approx \alpha(\tau) + \delta\tau
\frac{d \alpha}{d\tau}(\tau) \in \mathcal{M}$$
which is an affine function on the closed interval $[\tau, \tau + \delta
\tau] \subset \mathbb{R}$. Evaluating $\ket{\psi}:\mathcal{M} \to
\mathcal{H}$ at $\alpha(\tau + \delta \tau) \in V$, we find that
$$\ket{\psi(\alpha(\tau + \delta \tau))} \approx
\ket{\psi(\alpha(\tau))} + \delta\tau
\frac{d}{d\tau}\ket{\psi(\alpha(\tau))} \in \mathcal{H}$$
is an affine function on $V$ which becomes exact in the limit
$\delta\tau \to 0$. We may compare the first order terms of
$\ket{\psi(\alpha(\tau + \delta \tau))}$ and $\ket{\psi(\alpha +
\delta\alpha)}$ to find that
$$\delta \tau \frac{d}{d\tau} \ket{\psi(\alpha(\tau))} = \delta \tau
\sum_l \frac{\partial}{\partial \alpha_l} \ket{\psi(\alpha(\tau))}
\frac{d \alpha_l}{d\tau}(\tau) = \sum_l \delta\alpha_l(\tau)
\frac{\partial}{\partial \alpha_l} \ket{\psi(\alpha(\tau))}$$
is a linear combination of the tangent vectors $\frac{d
\alpha_l}{d\tau}(\tau)$ at $\alpha(\tau) \in \mathcal{M}$, so that the
total variation $\delta\alpha(\tau) = \delta \tau \frac{d
\alpha}{d\tau}(\tau)$ needed to linearly approximate the function
$\ket{\psi}$ at $\alpha(\tau + \delta\tau) \in V$ from the neighboring
point $\alpha(\tau) \in \mathcal{M}$ at time $\tau$ is in the direction
of the tangent vector $\frac{d \alpha}{d\tau}(\tau)$ at $\alpha(\tau)
\in \mathcal{M}$ such that
$$\alpha(\tau + \delta \tau) \approx \alpha(\tau) +
\delta\alpha(\tau) = \alpha(\tau) + \delta \tau \frac{d
\alpha}{d\tau}(\tau)$$
is the infinitesimal change in the parameters $\alpha(\tau) \in
\mathcal{M}$ at time $\tau$ over the interval $[\tau, \tau + \delta
\tau]$. Letting $T_\alpha \mathcal{M}$ denote the tangent space of
$\mathcal{M}$ at $\alpha(\tau) \in \mathcal{M}$ and $T_{\psi(\alpha)}
\mathcal{H}$ denote the tangent space of $\mathcal{H}$ at
$\ket{\psi(\alpha(\tau))} \in \mathcal{H}$, we push forward the local
vector field $\frac{d \alpha}{d\tau}$ on $V \subset \mathcal{M}$ to the
local vector field $\frac{d}{d\tau} \ket{\psi(\alpha)}$ on the image
$\tilde{V} = \ket{\psi(V)} \subset \mathcal{H}$ of $V$ under the mapping
$\ket{\psi}:\mathcal{M} \to \mathcal{H}$, and note that
$$\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} \in T_{\psi(\alpha)}
\tilde{V}$$
is the pushforward of the tangent vector $\frac{d \alpha}{d\tau}(\tau)
\in T_\alpha \mathcal{M}$ at $\alpha(\tau) \in \mathcal{M}$.
By the time-dependent Schrödinger equation, the state
$\ket{\psi(\alpha(t))} \in \mathcal{H}$ at some time $t$ will evolve
according to $i \frac{d}{dt} \ket{\psi(\alpha(t))} = H
\ket{\psi(\alpha(t))}$, which is satisfied (up to a constant) by the
propagator $U(t_2 - t_1) = \exp[-i(t_2-t_1)H]$ given the Hamiltonian
$H$. Here, the Hamiltonian $H$ is the infinitesimal generator of the
one-parameter unitary group of time translations whose elements are the
unitary transformations $U(t_2 - t_1):\mathcal{H} \to \mathcal{H}$ on
the state space $\mathcal{H}$ for any $t_1, t_2 \in \mathbb{R}$. By
performing a Wick rotation $\tau = it$, the state
$\ket{\psi(\alpha(\tau))} \in \mathcal{H}$ at some imaginary time $\tau$
will evolve according to the imaginary-time Schrödinger equation
$-\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} = H
\ket{\psi(\alpha(\tau))}$, which is satisfied (up to a constant) by the
non-unitary propagator $U(\tau_2 - \tau_1) = \exp[-(\tau_2-\tau_1)H]$.
Taking $\tau_1 = \tau$ and $\tau_2 = \tau + \delta\tau$, we propagate
the state $\ket{\psi(\alpha(\tau))} \in \mathcal{H}$ by
$$\ket{\psi(\alpha(\tau + \delta \tau))} = U(\delta\tau)
\ket{\psi(\alpha(\tau))} = \ket{\psi(\alpha(\tau))} - \delta \tau H
\ket{\psi(\alpha(\tau))} + \frac{(-\delta\tau)^2}{2}H^2
\ket{\psi(\alpha(\tau))} + \cdots \approx \ket{\psi(\alpha(\tau))} -
\delta \tau H \ket{\psi(\alpha(\tau))} \in \mathcal{H}$$
approximated to first order over the interval $[\tau, \tau + \delta
\tau]$, which becomes exact in the limit $\delta\tau \to 0$. Enforcing a
different normalization for the propagator, we may also evolve the state
$\ket{\psi(\alpha(\tau))} \in \mathcal{H}$ according to $-
\Delta\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} = \Delta H
\ket{\psi(\alpha(\tau))}$ involving the deviations $\Delta
\frac{d}{d\tau} = \frac{d}{d\tau} - \left\langle \frac{d}{d\tau}
\right\rangle_{\psi(\alpha)}$ and $\Delta H = H - \langle H
\rangle_{\psi(\alpha)}$, which is often more advantageous in a
stochastic framework.
To determine the actual form of the tangent vector $\frac{d
\alpha}{d\tau}(\tau) \in T_\alpha \mathcal{M}$ at time $\tau$, we impose
the constraint that the projection
$$\left\langle \frac{d}{d\tau} \psi(\alpha(\tau)), \bigg[ \Delta
\frac{d}{d\tau} + \Delta H \bigg] \psi(\alpha(\tau)) \right\rangle =
0$$
of the state $[ \Delta \frac{d}{d\tau} + \Delta H ]
\ket{\psi(\alpha(\tau))} \in T_{\psi(\alpha)} \mathcal{H}$ onto the
tangent vector $\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} \in
T_{\psi(\alpha)} \tilde{V}$ vanishes, a type of Galerkin condition known
as the Dirac-Frenkel-McLachlan variational principle. This condition is
motivated by the fact that the subspace $\tilde{V} \subset \mathcal{H}$
is typically of much smaller dimension than $\mathcal{H}$ itself since
$\mathcal{M}$ is typically of much smaller dimension than $\mathcal{H}$
as manifolds, resulting in a situation where the tangent vector
$\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} \in T_{\psi(\alpha)}
\tilde{V}$ is contained to a low dimensional subspace but $H
\ket{\psi(\alpha(\tau))} \in T_{\psi(\alpha)} \mathcal{H}$ is not
necessarily contained to this subspace. In order for the imaginary-time
Schrödinger equation $-\frac{d}{d\tau} \ket{\psi(\alpha(\tau))} = H
\ket{\psi(\alpha(\tau))}$ to hold, we must have that the norm of the
state $[\frac{d}{d\tau} + H] \ket{\psi(\alpha(\tau))}$ is vanishing, or
equivalently that its projection onto the subspace containing
$\frac{d}{d\tau} \ket{\psi(\alpha(\tau))}$ is vanishing, i.e. that there
is no overlap between $[\frac{d}{d\tau} + H] \ket{\psi(\alpha(\tau))}$
and $\frac{d}{d\tau} \ket{\psi(\alpha(\tau))}$. The same argument holds
for the state $[\Delta\frac{d}{d\tau} + \Delta H]
\ket{\psi(\alpha(\tau))}$ formed by the deviation operators. From the
overlap condition, we have explicitly
$$0 = \sum_k \frac{d \alpha_k^*}{d\tau}(\tau)
\frac{\partial}{\partial \alpha_k} \bra{\psi(\alpha(\tau))} \bigg[
\sum_l \frac{d \alpha_l}{d\tau}(\tau) \frac{\partial}{\partial
\alpha_l} \ket{\psi(\alpha(\tau))} - \sum_l \frac{d
\alpha_l}{d\tau}(\tau) \langle \partial_l \rangle_{\psi(\alpha)}
\ket{\psi(\alpha(\tau))} + H \ket{\psi(\alpha(\tau))} - \langle H
\rangle_{\psi(\alpha)} \ket{\psi(\alpha(\tau))} \bigg] = \sum_k
\frac{d \alpha_k^*}{d\tau}(\tau) \bigg[ \sum_l \frac{d
\alpha_l}{d\tau}(\tau) \langle \partial_k^\dagger \partial_l
\rangle_{\psi(\alpha)} - \sum_l \frac{d \alpha_l}{d\tau}(\tau)
\langle \partial_k^\dagger \rangle_{\psi(\alpha)} \langle \partial_l
\rangle_{\psi(\alpha)} + \langle \partial_k^\dagger H
\rangle_{\psi(\alpha)} - \langle \partial_k^\dagger
\rangle_{\psi(\alpha)} \langle H \rangle_{\psi(\alpha)} \bigg] =
\sum_k \frac{d \alpha_k^*}{d\tau}(\tau) \bigg[ \sum_l \frac{d
\alpha_l}{d\tau}(\tau) S_{kl}(\alpha) + F_k(\alpha) \bigg]$$
which is true when each term is identically zero, i.e. when
$$\sum_l \frac{d \alpha_l}{d\tau}(\tau) S_{kl}(\alpha) = -
F_k(\alpha)$$
is true. This system of linear equations can be written in matrix form
as
$$S(\alpha) \frac{d \alpha}{d\tau}(\tau) = -F(\alpha)$$
whose formal solution is
$$\frac{d \alpha}{d\tau}(\tau) = - S^{-1}(\alpha) F(\alpha)$$
such that
$$\alpha(\tau + \delta \tau) \approx \alpha(\tau) +
\delta\alpha(\tau) = \alpha(\tau) + \delta \tau \frac{d
\alpha}{d\tau}(\tau) = \alpha(\tau) - \delta \tau S^{-1}(\alpha)
F(\alpha)$$
is the infinitesimal change in the parameters $\alpha(\tau) \in
\mathcal{M}$ due to the non-unitary, imaginary-time evolution of the
state $\ket{\psi(\alpha(\tau))}$ over the interval $[\tau, \tau + \delta
\tau]$.
It must be noted that the initialization of the parameters can have a
dramatic effect on the performance of the algorithm. The initial state
$\ket{\psi(\alpha(0))}$ must be chosen such that $\langle \psi_0,
\psi(\alpha(0)) \rangle \neq 0$, or else learning is not possible. The
more overlap there is with the ground state, the more efficient the
algorithm will be. With at least some overlap, we will expect that
$\ket{\psi(\alpha(\tau))} \to \ket{\psi_0}$ as $\tau \to \infty$ for a
sufficiently small time step $\delta\tau$. This can be seen by noting
the change in the energy functional over the interval $[\tau, \tau +
\delta \tau]$, by taking the expectation of $H$ in the state
$\ket{\psi(\alpha(\tau + \delta\tau))} \approx \ket{\psi(\alpha(\tau))}
\delta \tau \Delta H \ket{\psi(\alpha(\tau))} =
\ket{\psi(\alpha(\tau))} + \delta \tau \Delta \frac{d}{d\tau}
\ket{\psi(\alpha(\tau))}$, i.e.
$$E[\psi(\alpha(\tau + \delta\tau))] = E[\psi(\alpha(\tau))] -
2\delta\tau F^\dagger(\alpha) S^{-1}(\alpha) F(\alpha) +
\mathcal{O}(\delta\tau^2)$$
where $\mathcal{O}(\delta\tau^2)$ denotes the term involving
$\delta\tau^2$. Since $\delta\tau > 0$ and $S(\alpha)$ is
positive-definite, the second term will be strictly negative, such that
the change in energy $E[\psi(\alpha(\tau + \delta\tau))] -
E[\psi(\alpha(\tau))] < 0$ for a sufficiently small time step
$\delta\tau$.
Fortran Implementation
We implement the stochastic optimization algorithm as a type-bound
procedure of a type RestrictedBoltzmannMachine:
type RestrictedBoltzmannMachine
private
integer:: v_units =0 !! Number of visible units
integer:: h_units =0 !! Number of hidden units
real(kind=rk), allocatable, dimension(:) :: a, p_a, r_a !! Visible biases & ADAM arrays
complex(kind=rk), allocatable, dimension(:) :: b, p_b, r_b !! Hidden biases & ADAM arrays
complex(kind=rk), allocatable, dimension(:,:) :: w, p_w, r_w !! Weights & ADAM arrays
character(len=1) :: alignment ='N' !! For tracking spin alignment
logical:: initialized =.false. !! Initialization status
contains
private
procedure, pass(self), public :: stochastic_optimization !! Public training routine
procedure, pass(self) :: init !! Initialization routine
procedure, pass(self) :: sample_distribution !! MCMC routine for sampling p(s)
procedure, pass(self) :: prob_ratio !! Probability ratio p(s_2)/p(s_1)
procedure, pass(self) :: ising_energy !! Ising local energy
procedure, pass(self) :: propagate !! Routine for updating weights and biases
end type RestrictedBoltzmannMachine
In practice, we define the visible layer biases a as type real due
to the fact that the logarithmic derivatives $O_{a_j}(s,a,b,w) = s_j$
are real for all $j \in [1,n]$ such that the imaginary component will
remain zero over the course of learning. Additionally, we define
complementary arrays for each a, b, and w, which we use to
supplement the stochastic optimization algorithm with ADAM (Adaptive
Moment Estimation) for the purpose of numerical stability and for
smoothing the learning process for less well-behaved energy functionals.
The following is a dependency tree for the type-bound procedures:
The stochastic_optimization routine takes advantage of the coarray
features of Fortran 2008 and, in particular, the collective subroutine
extensions of Fortran 2018, allowing for many images of the program to
run concurrently with collective communication. This allows us to
average the weights across images in each epoch of learning, which
dramatically improves stability and time to convergence in a stochastic
framework.
From a main program, we simply need to initialize the random number
generator, instantiate a RestrictedBoltzmannMachine, and call the
stochastic_optimization routine with the desired Ising model
parameters:
The output data consists of energies and spin correlations, which will
be written to separate csv files in the /data folder upon successful
execution.
Note: with init, the biases are initialized to zero prior to training,
and the weights have both real and imaginary parts initialized with
samples from a standard Gaussian distribution using a routine adapted
from
ROOT.
Building with fpm
The only dependency of this project is the Intel MKL distribution of
LAPACK. With a system installation of Intel
oneAPI
Base and HPC toolkits (including MKL), the project can be built and run
on Windows 10/11 and Linux with
fpm from the project root using a
single command, assuming the shell environment has sourced the oneAPI
environment variables beforehand.
To target an $n$ core CPU with SIMD instructions, the project can be
built and run on Windows 10/11 using the command
Here, n is the number of images to execute, which generally should
equal the number of CPU cores available. We then enable the generation
of multi-threaded code with OpenMP and SIMD compilation. Finally, the
link flag specifies the MKL and OpenMP runtime libraries for static
linking, provided by the Intel Link Line
Advisor.
To target an $n$ core CPU and an Intel GPU for acceleration, the project
can be built and run on Windows 10/11 using the command
Figure 1: Statistical expectation of
the energy and standard error of the mean for the anti-ferromagnetic
Ising chain of 
Figure 2: Correlations for
the anti-ferromagnetic Ising chain of 
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