regStep

Approximation of a general step, such that the characteristic is continuous and differentiable

Information

This information is part of the Modelica Standard Library maintained by the Modelica Association.

This function is used to approximate the equation

    y = if x > 0 then y1 else y2;

by a smooth characteristic, so that the expression is continuous and differentiable:

   y = smooth(1, if x >  x_small then y1 else
                 if x < -x_small then y2 else f(y1, y2));

In the region -x_small < x < x_small a 2nd order polynomial is used for a smooth transition from y1 to y2.

Syntax

y = regStep(x, y1, y2, x_small)

Inputs (4)

x

Type: Real

Description: Abscissa value

y1

Type: Real

Description: Ordinate value for x > 0

y2

Type: Real

Description: Ordinate value for x < 0

x_small

Default Value: 1e-5

Type: Real

Description: Approximation of step for -x_small <= x <= x_small; x_small >= 0 required

Outputs (1)

y

Type: Real

Description: Ordinate value to approximate y = if x > 0 then y1 else y2