The simplest case of Hough transform is the linear transform for
detecting straight lines. In the image space, the straight line can be
described as y = mx + b and can be graphically plotted for each pair
of image points (x, y)

So this tells you what `x`

and `y`

correspond to back in the image.

In the Hough transform, a main idea is to consider the characteristics
of the straight line not as image points (x1, y1), (x2, y2), ..., but
instead, in terms of its parameters, such as the slope parameter m and
the intercept parameter b.

Based on that fact, the straight line y =
mx + b can be represented as a point (b, m) in the parameter space.
However, one faces the problem that vertical lines give rise to
unbounded values of the parameters m and b. For computational reasons,
it is therefore better to use a different pair of parameters, denoted
and (theta), for the lines in the Hough transform.

The parameter rho represents the distance between the line and the
origin, while theta is the angle of the vector from the origin to this
closest point.

This tells you what `rho`

and `theta`

correspond to: they are the representation in polar coordinates of slope and intercept of the line you are trying to describe in your image.

On SourceForge you can find a `C++`

implementation of hough transform.

A description from which you should be able to interpret the code which I pointed out in the previous link may be the following:

The Hough transform algorithm uses an array, called an accumulator, to
detect the existence of a line y = mx + b.

For example, the linear Hough transform problem has two unknown
parameters: m and b.

For each pixel and its neighborhood, the Hough transform algorithm
determines if there is enough evidence of an edge at that pixel. If
so, it will calculate the parameters of that line, and then look for
the accumulator's bin that the parameters fall into, and increase the
value of that bin.

By finding the bins with the highest values, typically by looking for
local maxima in the accumulator space, the most likely lines can be
extracted