beebe@math.utah.edu
2003-Aug-25 22:29 UTC
(PR#3979) Re: [Rd] Re: R 1.7.x and inaccurate log1p() on OpenBSD
Brian Ripley writes today:>> There is already a usable log1p implementation in src/nmath/log1p, for >> platforms without it. All we need to do is to arrange to use it on those >> systems with broken versions. That's not easy without access to such a >> platform to test it, though.I need the same kind of test in my own software, so I made some experiments and came up with the code below for configure.in. I've tested it so far only on NetBSD 1.6 and Sun Solaris 9; it produced the expected settings #define HAVE_BROKEN_LOG1P 1 #define HAVE_LOG1P 1 on NetBSD and /* #undef HAVE_BROKEN_LOG1P */ #define HAVE_LOG1P 1 on Solaris. Notice that the test code checks arguments over a range of powers of two suitable for IEEE 754 with support for subnormals, but will bail out early if necessary. It should therefore work as intended on VAX OpenVMS and IBM S/390; I only rarely have access to such systems. AH_TEMPLATE(HAVE_BROKEN_LOG1P, [Define if log1p() is broken.]) AH_TEMPLATE(HAVE_LOG1P, [Define if log1p() is available.]) ... AC_SEARCH_LIBS(log1p, [m], AC_DEFINE(HAVE_LOG1P)) ... dnl Check for broken log1p() implementations if test "$ac_cv_search_log1p" = "none required" then AC_MSG_CHECKING(for apparently-accurate log1p()) AC_TRY_RUN( [ #include <stdio.h> #include <math.h> int main(void) { int k; double d; double x; /* log(1+x) = x - (1/2)x^2 + (1/3)x^3 - (1/4)x^4 ... */ /* = x for x sufficiently small */ for (k = -54; k > -1074; --k) { x = pow(2.0, (double)(k)); if (x == 0.0) return (0); /* OK: reached underflow limit */ d = log1p(x); if (d == 0.0) return (1); /* ERROR: inaccurate log1p() */ if (d != x) return (1); /* ERROR: inaccurate log1p() */ } return (0); } ], [ AC_MSG_RESULT(yes) ], [ AC_MSG_RESULT(no) AC_DEFINE(HAVE_BROKEN_LOG1P) ] ) fi ------------------------------------------------------------------------------- - Nelson H. F. Beebe Tel: +1 801 581 5254 - - Center for Scientific Computing FAX: +1 801 581 4148 - - University of Utah Internet e-mail: beebe@math.utah.edu - - Department of Mathematics, 110 LCB beebe@acm.org beebe@computer.org - - 155 S 1400 E RM 233 beebe@ieee.org - - Salt Lake City, UT 84112-0090, USA URL: http://www.math.utah.edu/~beebe -
Apparently Analagous Threads
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