projnormal.formulas.projected_normal_c.probability

Probability density function (PDF) for the general projected normal distribution with an additive constant const in the denominator .

Functions

log_pdf(mean_x, covariance_x, const, y)	Compute the log-pdf at points y for the distribution of the variable \(y = x/\sqrt{x^T x + c}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) and \(c\) is a positive constant.
pdf(mean_x, covariance_x, const, y)	Compute the pdf at points y for the distribution of the variable \(y = x/\sqrt{x^T x + c}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) and \(c\) is a positive constant.

log_pdf(mean_x, covariance_x, const, y)

Compute the log-pdf at points y for the distribution of the variable \(y = x/\sqrt{x^T x + c}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) and \(c\) is a positive constant.

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).

• y (torch.Tensor) – Points where to evaluate the PDF. Shape is (n_points, n_dim).

• const (torch.Tensor) – Constant added to the denominator. Must be positive. Shape is ().

Returns:

Log-PDF evaluated at each y. Shape is (n_points,).

Return type:

torch.Tensor

pdf(mean_x, covariance_x, const, y)

Compute the pdf at points y for the distribution of the variable \(y = x/\sqrt{x^T x + c}\), where \(x \sim \mathcal{N}(\mu_x, \Sigma_x)\) and \(c\) is a positive constant.

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).

• y (torch.Tensor) – Points where to evaluate the PDF. Shape is (n_points, n_dim).

• const (torch.Tensor) – Constant added to the denominator. Must be positive. Shape is ().

Returns:

PDF evaluated at each y. Shape is (n_points,).

Return type:

torch.Tensor