Dear all
I am fooling around (again!) with the spec of a math library that I want the students to work on as a project. Language is Common Lisp.
Essentially the library is an extended generic math library built on the basis of the many ones floating around.
Now. Here comes IEEE. And “infinity"
Among many implementations there is more or less a consensus about how to “represent” IEEE infinities in CL.
E.g.
LW >
math:long-float-positive-infinity
+1D++0 #| +1D++0 is double-float plus-infinity |#
CCL ?
math:long-float-positive-infinity
1D++0
and so on.
NaN is not as clearly defined.
LW 45 >
math:nan
1D+-0 #| 1D+-0 is double-float not-a-number |#
CCL ?
math:nan
1D+-0 #| not-a-number |#
But to get a NaN in SBCL/CMUCL requires a trick. I use
(sb-kernel:make-double-float -524288 0)) ; Courtesy of Raymond Toy.
In any case… There are two issues that I would like to brainstorm a bit.
The first one pertains rounding modes. Give the current state of affairs, it does not seem possible to access them in all the CL implementations. CMUCL/SBCL give you the necessary hooks, but LW doesn’t. Let’s skip this.
The second is just a simple question.
Given that we *do* have (with some acrobatics) access to IEEE infinities, would you add
symbolic constants to such library like
(defconstant +posinf+ ‘+posinf+)
or would you just rely on the IEEE infinities?
Generic functions like
(defgeneric plus (x y) …)
Will obviously be affected.
I just want to get a feeling about the overall wisdom of this crowd.
All the best
Marco