Last updated: 2023-03-16.

tf_quant_finance.models.HestonModel

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Heston Model with piecewise constant parameters.

Inherits From: GenericItoProcess

tf_quant_finance.models.HestonModel(
    mean_reversion, theta, volvol, rho, dtype=None, name=None
)

Represents the Ito process:

  dX(t) = -V(t) / 2 * dt + sqrt(V(t)) * dW_{X}(t),
  dV(t) = mean_reversion(t) * (theta(t) - V(t)) * dt
          + volvol(t) * sqrt(V(t)) * dW_{V}(t)

where W_{X} and W_{V} are 1D Brownian motions with a correlation rho(t). mean_reversion, theta, volvol, and rho are positive piecewise constant functions of time. Here V(t) represents the process variance at time t and X represents logarithm of the spot price at time t.

mean_reversion corresponds to the mean reversion rate, theta is the long run price variance, and volvol is the volatility of the volatility.

See [1] and [2] for details.

Example

import tf_quant_finance as tff
import numpy as np
volvol = tff.math.piecewise.PiecewiseConstantFunc(
    jump_locations=[0.5], values=[1, 1.1], dtype=np.float64)
process = tff.models.HestonModel(
    mean_reversion=0.5, theta=0.04, volvol=volvol, rho=0.1, dtype=np.float64)
times = np.linspace(0.0, 1.0, 1000)
num_samples = 10000  # number of trajectories
sample_paths = process.sample_paths(
    times,
    time_step=0.01,
    num_samples=num_samples,
    initial_state=np.array([1.0, 0.04]),
    random_type=random.RandomType.SOBOL)

References:

[1]: Cristian Homescu. Implied volatility surface: construction methodologies and characteristics. arXiv: https://arxiv.org/pdf/1107.1834.pdf [2]: Leif Andersen. Efficient Simulation of the Heston Stochastic Volatility Models. 2006. Link: http://www.ressources-actuarielles.net/ext/isfa/1226.nsf/d512ad5b22d73cc1c1257052003f1aed/1826b88b152e65a7c12574b000347c74/$FILE/LeifAndersenHeston.pdf

Methods

dim

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dim()

The dimension of the process.

drift_fn

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drift_fn()

Python callable calculating instantaneous drift.

The callable should accept two real Tensor arguments of the same dtype. The first argument is the scalar time t, the second argument is the value of Ito process X - Tensor of shape batch_shape + sample_shape + [dim], where batch_shape represents a batch of models and sample_shape represents samples for each of the models. The result is value of drift a(t, X). The return value of the callable is a real Tensor of the same dtype as the input arguments and of shape batch_shape + sample_shape + [dim]. For example, sample_shape can stand for [num_samples] for Monte Carlo sampling, or [num_grid_points_1, ..., num_grid_points_dim] for Finite Difference solvers.

Returns:

The instantaneous drift rate callable.

dtype

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dtype()

The data type of process realizations.

expected_total_variance

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expected_total_variance(
    future_times, initial_var, name=None
)

Computes the expected variance of the process up to future_time.

The Heston model affords a closed form expression for its expected variance:

E[S_T] = (V(0) - theta)(1 - e^{-mean_reversion * T})/ mean_reversion + theta * T

Where S_T represents the integral of the instantaneous variance process V from 0 to T [p138. of 1].

References

[1] Gatheral, Jim. The volatility surface: a practitioner’s guide. Vol. 357. John Wiley & Sons, 2011.

Args:

• future_times: real Tensor representing times in the future (T in the above notation).

• initial_var: real Tensor of shape compatible with future_time. The value of the variance process at time zero, V(0).

• name: Python str. The name to give this op. Default value: name of the instance + _expected_total_variance

Returns:

The expected variance at future_time.

Raises:

• ValueError: for non-constant parameters.

fd_solver_backward

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fd_solver_backward(
    start_time, end_time, coord_grid, values_grid, discounting=None,
    one_step_fn=None, boundary_conditions=None, start_step_count=0, num_steps=None,
    time_step=None, values_transform_fn=None, dtype=None, name=None, **kwargs
)

Returns a solver for Feynman-Kac PDE associated to the process.

This method applies a finite difference method to solve the final value problem as it appears in the Feynman-Kac formula associated to this Ito process. The Feynman-Kac PDE is closely related to the backward Kolomogorov equation associated to the stochastic process and allows for the inclusion of a discounting function.

For more details of the Feynman-Kac theorem see [1]. The PDE solved by this method is:

  V_t + Sum[mu_i(t, x) V_i, 1<=i<=n] +
    (1/2) Sum[ D_{ij} V_{ij}, 1 <= i,j <= n] - r(t, x) V = 0

In the above, V_t is the derivative of V with respect to t, V_i is the partial derivative with respect to x_i and V_{ij} the (mixed) partial derivative with respect to x_i and x_j. mu_i is the drift of this process and D_{ij} are the components of the diffusion tensor:

  D_{ij}(t,x) = (Sigma(t,x) . Transpose[Sigma(t,x)])_{ij}

This method evolves a spatially discretized solution of the above PDE from time t0 to time t1 < t0 (i.e. backwards in time). The solution V(t,x) is assumed to be discretized on an n-dimensional rectangular grid. A rectangular grid, G, in n-dimensions may be described by specifying the coordinates of the points along each axis. For example, a 2 x 4 grid in two dimensions can be specified by taking the cartesian product of [1, 3] and [5, 6, 7, 8] to yield the grid points with coordinates: [(1, 5), (1, 6), (1, 7), (1, 8), (3, 5) ... (3, 8)].

This method allows batching of solutions. In this context, batching means the ability to represent and evolve multiple independent functions V (e.g. V1, V2 …) simultaneously. A single discretized solution is specified by stating its values at each grid point. This can be represented as a Tensor of shape [d1, d2, … dn] where di is the grid size along the ith axis. A batch of such solutions is represented by a Tensor of shape: batch_shape + payoff_shape + [d1, d2, ... dn] where batch_shape is the batch of processes as in the underlying drift_fn and volatility_fn and payoff_shape are the equations to be solved for each batch element.

The evolution of the solution from t0 to t1 is often done by discretizing the differential equation to a difference equation along the spatial and temporal axes. The temporal discretization is given by a (sequence of) time steps [dt_1, dt_2, … dt_k] such that the sum of the time steps is equal to the total time step t0 - t1. If a uniform time step is used, it may equivalently be specified by stating the number of steps (n_steps) to take. This method provides both options via the time_step and num_steps parameters. However, not all methods need discretization along time direction (e.g. method of lines) so this argument may not be applicable to some implementations.

The workhorse of this method is the one_step_fn. For the commonly used methods, see functions in math.pde.steppers module.

The mapping between the arguments of this method and the above equation are described in the Args section below.

For a simple instructive example of implementation of this method, see models.GenericItoProcess.fd_solver_backward.

Examples

import tensorflow as tf
import numpy as np

import tf_quant_finance as tff
dtype = tf.float64

# Specify volatilities, interest rates and strikes for the options
volatilities = tf.constant([[0.3], [0.15], [0.1]], dtype)
rates = tf.constant([[0.01], [0.03], [0.01]], dtype)
expiries = 1.0

# Define Generic Ito Process

# Process dimensionality
dim = 1

# Batch size of the process
num_processes = 3

def drift_fn(t, x):
  del t
  # `x` is expected to be of shape [num_processes] + sample_shape + [dim]
  # We need to expand rank of rates to
  # `[num_processes] + extra_rank * [1] + [1]`
  expand_rank = x.shape.rank - 2
  rates_expand = tf.reshape(
      rates, [num_processes] + (expand_rank + 1) * [1])
  # Output is of shape [num_processes] + sample_shape + [dim]
  return rates_expand * x

def vol_fn(t, x):
  del t
  # `x` is expected to be of shape [num_processes] + sample_shape + [dim]
  # As before, need to expand rank of volatilities to
  # `[num_processes] + extra_rank * [1] + [1]`
  expand_rank = x.shape.rank - 2
  volatilities_expand = tf.reshape(
      volatilities, [num_processes] + (expand_rank + 1) * [1])
  # Output is of shape [num_processes] + sample_shape + [dim, dim]
  return (tf.expand_dims(volatilities_expand * x, axis=-1)
          * tf.eye(dim, batch_shape=x.shape.as_list()[:-1], dtype=x.dtype))

process = tff.models.GenericItoProcess(dim=dim,
                                       drift_fn=drift_fn,
                                       volatility_fn=vol_fn,
                                       dtype=dtype)
# Define a 2 strikes for each batch process,
num_strikes = 2
# Shape [num_processes, num_strikes, 1]. Here 1 at the end is just for
# convenience
strikes = tf.constant([[[50], [60]], [[100], [90]], [[120], [90]]], dtype)

# Price a batch of European call options
@tff.math.pde.boundary_conditions.dirichlet
def upper_boundary_fn(t, grid):
  del grid
  # Shape (num_processes, num_strikes)
  return tf.squeeze(s_max - strikes * tf.exp(-rates  * (expiries - t)))

# Define discounting function
def discounting(t, x):
  del t, x
  rates_expand = tf.expand_dims(rates, axis=-1)
  # Shape compatible with (num_processes, num_strikes)
  return rates_expand

# Build a uniform grid
s_min = 0
s_max = 200
num_grid_points = 256  # Number of grid points

grid = tff.math.pde.grids.uniform_grid(minimums=[s_min],
                                       maximums=[s_max],
                                       sizes=[num_grid_points],
                                       dtype=dtype)

# Shape [num_processes, num_strikes, num_grid_points]
final_value_grid = tf.nn.relu(grid[0] - strikes)

# Estimated prices for the European options
process.fd_solver_backward(
    start_time=expiries,
    end_time=0,
    time_step=0.1,
    coord_grid=grid,
    values_grid=final_value_grid,
    discounting=discounting,
    boundary_condtions=[(None, upper_boundary_fn)])[0]
# Shape of the output is [num_processes, num_strikes, num_grid_points]

Args:

• start_time: Real positive scalar Tensor. The start time of the grid. Corresponds to time t0 above.

• end_time: Real scalar Tensor smaller than the start_time and greater than zero. The time to step back to. Corresponds to time t1 above.

• coord_grid: List of n rank 1 real Tensors. n is the dimension of the domain. The i-th Tensor has shape, [d_i] where d_i is the size of the grid along axis i. The coordinates of the grid points. Corresponds to the spatial grid G above.

• values_grid: Real Tensor containing the function values at time start_time which have to be stepped back to time end_time. The shape of the Tensor must broadcast with batch_shape + payoff_shape + [d_1, d_2, ..., d_n]. batch_shape represents the batch of the processes as in the underlying drift_fn and volatility_fn. payoff_shape specifies equations to be solved for each batch element (with potentially different boundary/final conditions and for various coordinate grids). When the batch dimensions batch_shape or payoff_shape are present, the shape of values_gridmust be at leastbatch_shape + payoff_shape + dim * [1]`.

• discounting: Callable corresponding to r(t,x) above. If not supplied, zero discounting is assumed.

• one_step_fn: The transition kernel. A callable that consumes the following arguments by keyword:

  1. ‘time’: Current time

  2. ‘next_time’: The next time to step to. For the backwards in time evolution, this time will be smaller than the current time.

  3. ‘coord_grid’: The coordinate grid.

  4. ‘values_grid’: The values grid.

  5. ‘boundary_conditions’: The boundary conditions.

  6. ‘quadratic_coeff’: A callable returning the quadratic coefficients of the PDE (i.e. (1/2)D_{ij}(t, x) above). The callable accepts the time and coordinate grid as keyword arguments and returns a Tensor with shape that broadcasts with [dim, dim].

  7. ‘linear_coeff’: A callable returning the linear coefficients of the PDE (i.e. mu_i(t, x) above). Accepts time and coordinate grid as keyword arguments and returns a Tensor with shape that broadcasts with [dim].

  8. ‘constant_coeff’: A callable returning the coefficient of the linear homogeneous term (i.e. r(t,x) above). Same spec as above. The one_step_fn callable returns a 2-tuple containing the next coordinate grid, next values grid.

• boundary_conditions: The boundary conditions. Only rectangular boundary conditions are supported. A list of tuples of size n (space dimension of the PDE). The elements of the Tuple can be either a Python Callable or None representing the boundary conditions at the minimum and maximum values of the spatial variable indexed by the position in the list. E.g., for n=2, the length of boundary_conditions should be 2, boundary_conditions[0][0] describes the boundary (y_min, x), and boundary_conditions[1][0]- the boundary (y, x_min). None values mean that the second order terms for that dimension on the boundary are assumed to be zero, i.e., if boundary_conditions[k][0] is None, ‘dV/dt + Sum[a_ij d2(A_ij V)/dx_i dx_j, 1 <= i, j <= n, i!=k+1, j!=k+1]

  • Sum[b_i d(B_i V)/dx_i, 1 <= i <= n] + c V = 0.’ For not None values, the boundary conditions are accepted in the form alpha(t, x) V + beta(t, x) V_n = gamma(t, x), where V_n is the derivative with respect to the exterior normal to the boundary. Each callable receives the current time t and the coord_grid at the current time, and should return a tuple of alpha, beta, and gamma. Each can be a number, a zero-rank Tensor or a Tensor whose shape is the grid shape with the corresponding dimension removed. For example, for a two-dimensional grid of shape (b, ny, nx), where b is the batch size, boundary_conditions[0][i] with i = 0, 1 should return a tuple of either numbers, zero-rank tensors or tensors of shape (b, nx). Similarly for boundary_conditions[1][i], except the tensor shape should be (b, ny). alpha and beta can also be None in case of Neumann and Dirichlet conditions, respectively. Default value: None. Unlike setting None to individual elements of boundary_conditions, setting the entire boundary_conditions object to None means Dirichlet conditions with zero value on all boundaries are applied.

• start_step_count: Scalar integer Tensor. Initial value for the number of time steps performed. Default value: 0 (i.e. no previous steps performed).

• num_steps: Positive int scalar Tensor. The number of time steps to take when moving from start_time to end_time. Either this argument or the time_step argument must be supplied (but not both). If num steps is k>=1, uniform time steps of size (t0 - t1)/k are taken to evolve the solution from t0 to t1. Corresponds to the n_steps parameter above.

• time_step: The time step to take. Either this argument or the num_steps argument must be supplied (but not both). The type of this argument may be one of the following (in order of generality): (a) None in which case num_steps must be supplied. (b) A positive real scalar Tensor. The maximum time step to take. If the value of this argument is dt, then the total number of steps taken is N = (t0 - t1) / dt rounded up to the nearest integer. The first N-1 steps are of size dt and the last step is of size t0 - t1 - (N-1) * dt. (c) A callable accepting the current time and returning the size of the step to take. The input and the output are real scalar Tensors.

• values_transform_fn: An optional callable applied to transform the solution values at each time step. The callable is invoked after the time step has been performed. The callable should accept the time of the grid, the coordinate grid and the values grid and should return the values grid. All input arguments to be passed by keyword.

• dtype: The dtype to use.

• name: The name to give to the ops. Default value: None which means solve_backward is used.

• **kwargs: Additional keyword args: (1) pde_solver_fn: Function to solve the PDE that accepts all the above arguments by name and returns the same tuple object as required below. Defaults to tff.math.pde.fd_solvers.solve_backward.

Returns:

A tuple object containing at least the following attributes: final_values_grid: A Tensor of same shape and dtype as values_grid. Contains the final state of the values grid at time end_time. final_coord_grid: A list of Tensors of the same specification as the input coord_grid. Final state of the coordinate grid at time end_time. step_count: The total step count (i.e. the sum of the start_step_count and the number of steps performed in this call.). final_time: The final time at which the evolution stopped. This value is given by max(min(end_time, start_time), 0).

fd_solver_forward

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fd_solver_forward(
    start_time, end_time, coord_grid, values_grid, one_step_fn=None,
    boundary_conditions=None, start_step_count=0, num_steps=None, time_step=None,
    values_transform_fn=None, dtype=None, name=None, **kwargs
)

Returns a solver for the Fokker Plank equation of this process.

The Fokker Plank equation (also known as the Kolmogorov Forward equation) associated to this Ito process is given by:

  V_t + Sum[(mu_i(t, x) V)_i, 1<=i<=n]
    - (1/2) Sum[ (D_{ij} V)_{ij}, 1 <= i,j <= n] = 0

with the initial value condition $\(V(0, x) = u(x)\)$.

This method evolves a spatially discretized solution of the above PDE from time t0 to time t1 > t0 (i.e. forwards in time). The solution V(t,x) is assumed to be discretized on an n-dimensional rectangular grid. A rectangular grid, G, in n-dimensions may be described by specifying the coordinates of the points along each axis. For example, a 2 x 4 grid in two dimensions can be specified by taking the cartesian product of [1, 3] and [5, 6, 7, 8] to yield the grid points with coordinates: [(1, 5), (1, 6), (1, 7), (1, 8), (3, 5) ... (3, 8)].

This method allows batching of solutions. In this context, batching means the ability to represent and evolve multiple independent functions V (e.g. V1, V2 …) simultaneously. A single discretized solution is specified by stating its values at each grid point. This can be represented as a Tensor of shape [d1, d2, … dn] where di is the grid size along the ith axis. A batch of such solutions is represented by a Tensor of shape: batch_shape + payoff_shape + [d1, d2, ... dn] where batch_shape is the batch of processes as in the underlying drift_fn and volatility_fn and payoff_shape are the equations to be solved for each batch element.

The evolution of the solution from t0 to t1 is often done by discretizing the differential equation to a difference equation along the spatial and temporal axes. The temporal discretization is given by a (sequence of) time steps [dt_1, dt_2, … dt_k] such that the sum of the time steps is equal to the total time step t1 - t0. If a uniform time step is used, it may equivalently be specified by stating the number of steps (n_steps) to take. This method provides both options via the time_step and num_steps parameters. However, not all methods need discretization along time direction (e.g. method of lines) so this argument may not be applicable to some implementations.

The workhorse of this method is the one_step_fn. For the commonly used methods, see functions in math.pde.steppers module.

The mapping between the arguments of this method and the above equation are described in the Args section below.

For a simple instructive example of implementation of this method, see models.GenericItoProcess.fd_solver_forward.

Args:

• start_time: Real positive scalar Tensor. The start time of the grid. Corresponds to time t0 above.

• end_time: Real scalar Tensor smaller than the start_time and greater than zero. The time to step back to. Corresponds to time t1 above.

• coord_grid: List of n rank 1 real Tensors. n is the dimension of the domain. The i-th Tensor has shape, [d_i] where d_i is the size of the grid along axis i. The coordinates of the grid points. Corresponds to the spatial grid G above.

• values_grid: Real Tensor containing the function values at time start_time which have to be stepped back to time end_time. The shape of the Tensor must broadcast with batch_shape + payoff_shape + [d_1, d_2, ..., d_n]. batch_shape represents the batch of the processes as in the underlying drift_fn and volatility_fn. payoff_shape specifies equations to be solved for each batch element (with potentially different boundary/final conditions and for various coordinate grids). When the batch dimensions batch_shape or payoff_shape are present, the shape of values_gridmust be at leastbatch_shape + payoff_shape + dim * [1]`.

• one_step_fn: The transition kernel. A callable that consumes the following arguments by keyword:

  1. ‘time’: Current time

  2. ‘next_time’: The next time to step to. For the backwards in time evolution, this time will be smaller than the current time.

  3. ‘coord_grid’: The coordinate grid.

  4. ‘values_grid’: The values grid.

  5. ‘quadratic_coeff’: A callable returning the quadratic coefficients of the PDE (i.e. (1/2)D_{ij}(t, x) above). The callable accepts the time and coordinate grid as keyword arguments and returns a Tensor with shape that broadcasts with [dim, dim].

  6. ‘linear_coeff’: A callable returning the linear coefficients of the PDE (i.e. mu_i(t, x) above). Accepts time and coordinate grid as keyword arguments and returns a Tensor with shape that broadcasts with [dim].

  7. ‘constant_coeff’: A callable returning the coefficient of the linear homogeneous term (i.e. r(t,x) above). Same spec as above. The one_step_fn callable returns a 2-tuple containing the next coordinate grid, next values grid.

• boundary_conditions: The boundary conditions. Only rectangular boundary conditions are supported. A list of tuples of size n (space dimension of the PDE). The elements of the Tuple can be either a Python Callable or None representing the boundary conditions at the minimum and maximum values of the spatial variable indexed by the position in the list. E.g., for n=2, the length of boundary_conditions should be 2, boundary_conditions[0][0] describes the boundary (y_min, x), and boundary_conditions[1][0]- the boundary (y, x_min). None values mean that the second order terms for that dimension on the boundary are assumed to be zero, i.e., if boundary_conditions[k][0] is None, ‘dV/dt + Sum[a_ij d2(A_ij V)/dx_i dx_j, 1 <= i, j <= n, i!=k+1, j!=k+1]

  • Sum[b_i d(B_i V)/dx_i, 1 <= i <= n] + c V = 0.’ For not None values, the boundary conditions are accepted in the form alpha(t, x) V + beta(t, x) V_n = gamma(t, x), where V_n is the derivative with respect to the exterior normal to the boundary. Each callable receives the current time t and the coord_grid at the current time, and should return a tuple of alpha, beta, and gamma. Each can be a number, a zero-rank Tensor or a Tensor whose shape is the grid shape with the corresponding dimension removed. For example, for a two-dimensional grid of shape (b, ny, nx), where b is the batch size, boundary_conditions[0][i] with i = 0, 1 should return a tuple of either numbers, zero-rank tensors or tensors of shape (b, nx). Similarly for boundary_conditions[1][i], except the tensor shape should be (b, ny). alpha and beta can also be None in case of Neumann and Dirichlet conditions, respectively. Default value: None. Unlike setting None to individual elements of boundary_conditions, setting the entire boundary_conditions object to None means Dirichlet conditions with zero value on all boundaries are applied.

• start_step_count: Scalar integer Tensor. Initial value for the number of time steps performed. Default value: 0 (i.e. no previous steps performed).

• num_steps: Positive int scalar Tensor. The number of time steps to take when moving from start_time to end_time. Either this argument or the time_step argument must be supplied (but not both). If num steps is k>=1, uniform time steps of size (t0 - t1)/k are taken to evolve the solution from t0 to t1. Corresponds to the n_steps parameter above.

• time_step: The time step to take. Either this argument or the num_steps argument must be supplied (but not both). The type of this argument may be one of the following (in order of generality): (a) None in which case num_steps must be supplied. (b) A positive real scalar Tensor. The maximum time step to take. If the value of this argument is dt, then the total number of steps taken is N = (t1 - t0) / dt rounded up to the nearest integer. The first N-1 steps are of size dt and the last step is of size t1 - t0 - (N-1) * dt. (c) A callable accepting the current time and returning the size of the step to take. The input and the output are real scalar Tensors.

• values_transform_fn: An optional callable applied to transform the solution values at each time step. The callable is invoked after the time step has been performed. The callable should accept the time of the grid, the coordinate grid and the values grid and should return the values grid. All input arguments to be passed by keyword.

• dtype: The dtype to use.

• name: The name to give to the ops. Default value: None which means solve_forward is used.

• **kwargs: Additional keyword args: (1) pde_solver_fn: Function to solve the PDE that accepts all the above arguments by name and returns the same tuple object as required below. Defaults to tff.math.pde.fd_solvers.solve_forward.

Returns:

A tuple object containing at least the following attributes: final_values_grid: A Tensor of same shape and dtype as values_grid. Contains the final state of the values grid at time end_time. final_coord_grid: A list of Tensors of the same specification as the input coord_grid. Final state of the coordinate grid at time end_time. step_count: The total step count (i.e. the sum of the start_step_count and the number of steps performed in this call.). final_time: The final time at which the evolution stopped. This value is given by max(min(end_time, start_time), 0).

name

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name()

The name to give to ops created by this class.

sample_paths

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sample_paths(
    times, initial_state, num_samples=1, random_type=None, seed=None,
    time_step=None, skip=0, tolerance=1e-06, num_time_steps=None,
    precompute_normal_draws=True, times_grid=None, normal_draws=None, name=None
)

Returns a sample of paths from the process.

Using Quadratic-Exponential (QE) method described in [1] generates samples paths started at time zero and returns paths values at the specified time points.

Args:

• times: Rank 1 Tensor of positive real values. The times at which the path points are to be evaluated.

• initial_state: A rank 1 Tensor with two elements where the first element corresponds to the initial value of the log spot X(0) and the second to the starting variance value V(0).

• num_samples: Positive scalar int. The number of paths to draw.

• random_type: Enum value of RandomType. The type of (quasi)-random number generator to use to generate the paths. Default value: None which maps to the standard pseudo-random numbers.

• seed: Seed for the random number generator. The seed is only relevant if random_type is one of [STATELESS, PSEUDO, HALTON_RANDOMIZED, PSEUDO_ANTITHETIC,   STATELESS_ANTITHETIC]. For PSEUDO, PSEUDO_ANTITHETIC and HALTON_RANDOMIZED the seed should be an Python integer. For STATELESS and STATELESS_ANTITHETIC must be supplied as an integer Tensor of shape [2]. Default value: None which means no seed is set.

• time_step: Positive Python float to denote time discretization parameter.

• skip: int32 0-d Tensor. The number of initial points of the Sobol or Halton sequence to skip. Used only when random_type is ‘SOBOL’, ‘HALTON’, or ‘HALTON_RANDOMIZED’, otherwise ignored.

• tolerance: Scalar positive real Tensor. Specifies minimum time tolerance for which the stochastic process X(t) != X(t + tolerance). Default value: 1e-6.

• num_time_steps: An optional Scalar integer Tensor - a total number of time steps performed by the algorithm. The maximal distance between points in grid is bounded by times[-1] / (num_time_steps - times.shape[0]). Either this or time_step should be supplied. Default value: None.

• precompute_normal_draws: Python bool. Indicates whether the noise increments N(0, t_{n+1}) - N(0, t_n) are precomputed. For HALTON and SOBOL random types the increments are always precomputed. While the resulting graph consumes more memory, the performance gains might be significant. Default value: True.

• times_grid: An optional rank 1 Tensor representing time discretization grid. If times are not on the grid, then the nearest points from the grid are used. When supplied, num_time_steps and time_step are ignored. Default value: None, which means that times grid is computed using time_step and num_time_steps.

• normal_draws: A Tensor of shape broadcastable with [num_samples, num_time_points, 2] and the same dtype as times. Represents random normal draws to compute increments N(0, t_{n+1}) - N(0, t_n). When supplied, num_samples argument is ignored and the first dimensions of normal_draws is used instead. Default value: None which means that the draws are generated by the algorithm. By default normal_draws for each model in the batch are independent.

• name: Str. The name to give this op. Default value: sample_paths.

Returns:

A Tensors of shape [num_samples, k, 2] where k is the size of the times. For each sample and time the first dimension represents the simulated log-state trajectories of the spot price X(t), whereas the second one represents the simulated variance trajectories V(t).

Raises:

• ValueError: If time_step is not supplied.

References:

[1]: Leif Andersen. Efficient Simulation of the Heston Stochastic Volatility Models. 2006.

volatility_fn

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volatility_fn()

Python callable calculating the instantaneous volatility.

The callable should accept two real Tensor arguments of the same dtype and shape times_shape. The first argument is the scalar time t, the second argument is the value of Ito process X - Tensor of shape batch_shape + sample_shape + [dim], where batch_shape represents a batch of models and sample_shape represents samples for each of the models. The result is value of volatility S_{ij}(t, X). The return value of the callable is a real Tensor of the same dtype as the input arguments and of shape batch_shape + sample_shape + [dim, dim]. For example, sample_shape can stand for [num_samples] for Monte Carlo sampling, or [num_grid_points_1, ..., num_grid_points_dim] for Finite Difference solvers.

Returns:

The instantaneous volatility callable.