Compute the regularized incomplete beta integral \\(I_x(a, b)\\).
The regularized incomplete beta integral is defined as:
\\(I_x(a, b) = \frac{B(x; a, b)}{B(a, b)}\\)
where
\\(B(x; a, b) = \int_0^x t^{a-1} (1 - t)^{b-1} dt\\)
is the incomplete beta function and \\(B(a, b)\\) is the complete beta function.
Constants
String | OP_NAME | The name of this op, as known by TensorFlow core engine |
Public Methods
Output<T> |
asOutput()
Returns the symbolic handle of the tensor.
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static <T extends TNumber> Betainc<T> | |
Output<T> |
z()
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Inherited Methods
Constants
public static final String OP_NAME
The name of this op, as known by TensorFlow core engine
Public Methods
public Output<T> asOutput ()
Returns the symbolic handle of the tensor.
Inputs to TensorFlow operations are outputs of another TensorFlow operation. This method is used to obtain a symbolic handle that represents the computation of the input.
public static Betainc<T> create (Scope scope, Operand<T> a, Operand<T> b, Operand<T> x)
Factory method to create a class wrapping a new Betainc operation.
Parameters
scope | current scope |
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Returns
- a new instance of Betainc