projnormal.formulas.projected_normal.moments
Approximation to the moments of the general projected normal distribution.
Functions
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Compute the mean of \(y = x/\sqrt{x^T x}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) via Taylor approximation. |
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Compute the second moment matrix of \(y = x/\sqrt{x^T x}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) via Taylor approximation. |
- mean(mean_x, covariance_x)
Compute the mean of \(y = x/\sqrt{x^T x}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) via Taylor approximation. (\(y\) has a projected normal distribution.).
- Parameters:
mean_x (
torch.Tensor) – Mean of x. Shape is(n_dim,).covariance_x (
torch.Tensor) – Covariance of x. Shape is(n_dim, n_dim).
- Returns:
Expected value for the projected normal. Shape is
(n_dim,).- Return type:
torch.Tensor
- second_moment(mean_x, covariance_x)
Compute the second moment matrix of \(y = x/\sqrt{x^T x}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) via Taylor approximation. (\(y\) has a projected normal distribution.).
- Parameters:
mean_x (
torch.Tensor) – Mean of x. Shape is(n_dim,).covariance_x (
torch.Tensor) – Covariance of x. Shape is(n_dim, n_dim).
- Returns:
Second moment matrix of \(y\). Shape is
(n_dim, n_dim).- Return type:
torch.Tensor