tf.lbeta

tf.lbeta(
    x,
    name='lbeta'
)

Defined in tensorflow/python/ops/special_math_ops.py.

See the guide: Math > Basic Math Functions

Computes \(ln(|Beta(x)|)\), reducing along the last dimension.

Given one-dimensional z = [z_0,...,z_{K-1}], we define

And for n + 1 dimensional x with shape [N1, ..., Nn, K], we define

In other words, the last dimension is treated as the z vector.

Note that if z = [u, v], then \(Beta(z) = int_0^1 t^{u-1} (1 - t)^{v-1} dt\), which defines the traditional bivariate beta function.

If the last dimension is empty, we follow the convention that the sum over the empty set is zero, and the product is one.

Args:

• x: A rank n + 1 Tensor, n >= 0 with type float, or double.
• name: A name for the operation (optional).

Returns:

The logarithm of \(|Beta(x)|\) reducing along the last dimension.