head 1.3; access; symbols pkgsrc-2023Q4:1.3.0.74 pkgsrc-2023Q4-base:1.3 pkgsrc-2023Q3:1.3.0.72 pkgsrc-2023Q3-base:1.3 pkgsrc-2023Q2:1.3.0.70 pkgsrc-2023Q2-base:1.3 pkgsrc-2023Q1:1.3.0.68 pkgsrc-2023Q1-base:1.3 pkgsrc-2022Q4:1.3.0.66 pkgsrc-2022Q4-base:1.3 pkgsrc-2022Q3:1.3.0.64 pkgsrc-2022Q3-base:1.3 pkgsrc-2022Q2:1.3.0.62 pkgsrc-2022Q2-base:1.3 pkgsrc-2022Q1:1.3.0.60 pkgsrc-2022Q1-base:1.3 pkgsrc-2021Q4:1.3.0.58 pkgsrc-2021Q4-base:1.3 pkgsrc-2021Q3:1.3.0.56 pkgsrc-2021Q3-base:1.3 pkgsrc-2021Q2:1.3.0.54 pkgsrc-2021Q2-base:1.3 pkgsrc-2021Q1:1.3.0.52 pkgsrc-2021Q1-base:1.3 pkgsrc-2020Q4:1.3.0.50 pkgsrc-2020Q4-base:1.3 pkgsrc-2020Q3:1.3.0.48 pkgsrc-2020Q3-base:1.3 pkgsrc-2020Q2:1.3.0.44 pkgsrc-2020Q2-base:1.3 pkgsrc-2020Q1:1.3.0.24 pkgsrc-2020Q1-base:1.3 pkgsrc-2019Q4:1.3.0.46 pkgsrc-2019Q4-base:1.3 pkgsrc-2019Q3:1.3.0.42 pkgsrc-2019Q3-base:1.3 pkgsrc-2019Q2:1.3.0.40 pkgsrc-2019Q2-base:1.3 pkgsrc-2019Q1:1.3.0.38 pkgsrc-2019Q1-base:1.3 pkgsrc-2018Q4:1.3.0.36 pkgsrc-2018Q4-base:1.3 pkgsrc-2018Q3:1.3.0.34 pkgsrc-2018Q3-base:1.3 pkgsrc-2018Q2:1.3.0.32 pkgsrc-2018Q2-base:1.3 pkgsrc-2018Q1:1.3.0.30 pkgsrc-2018Q1-base:1.3 pkgsrc-2017Q4:1.3.0.28 pkgsrc-2017Q4-base:1.3 pkgsrc-2017Q3:1.3.0.26 pkgsrc-2017Q3-base:1.3 pkgsrc-2017Q2:1.3.0.22 pkgsrc-2017Q2-base:1.3 pkgsrc-2017Q1:1.3.0.20 pkgsrc-2017Q1-base:1.3 pkgsrc-2016Q4:1.3.0.18 pkgsrc-2016Q4-base:1.3 pkgsrc-2016Q3:1.3.0.16 pkgsrc-2016Q3-base:1.3 pkgsrc-2016Q2:1.3.0.14 pkgsrc-2016Q2-base:1.3 pkgsrc-2016Q1:1.3.0.12 pkgsrc-2016Q1-base:1.3 pkgsrc-2015Q4:1.3.0.10 pkgsrc-2015Q4-base:1.3 pkgsrc-2015Q3:1.3.0.8 pkgsrc-2015Q3-base:1.3 pkgsrc-2015Q2:1.3.0.6 pkgsrc-2015Q2-base:1.3 pkgsrc-2015Q1:1.3.0.4 pkgsrc-2015Q1-base:1.3 pkgsrc-2014Q4:1.3.0.2 pkgsrc-2014Q4-base:1.3 pkgsrc-2014Q3:1.2.0.18 pkgsrc-2014Q3-base:1.2 pkgsrc-2014Q2:1.2.0.16 pkgsrc-2014Q2-base:1.2 pkgsrc-2014Q1:1.2.0.14 pkgsrc-2014Q1-base:1.2 pkgsrc-2013Q4:1.2.0.12 pkgsrc-2013Q4-base:1.2 pkgsrc-2013Q3:1.2.0.10 pkgsrc-2013Q3-base:1.2 pkgsrc-2013Q2:1.2.0.8 pkgsrc-2013Q2-base:1.2 pkgsrc-2013Q1:1.2.0.6 pkgsrc-2013Q1-base:1.2 pkgsrc-2012Q4:1.2.0.4 pkgsrc-2012Q4-base:1.2 pkgsrc-2012Q3:1.2.0.2 pkgsrc-2012Q3-base:1.2 pkgsrc-2012Q2:1.1.1.1.0.20 pkgsrc-2012Q2-base:1.1.1.1 pkgsrc-2012Q1:1.1.1.1.0.18 pkgsrc-2012Q1-base:1.1.1.1 pkgsrc-2011Q4:1.1.1.1.0.16 pkgsrc-2011Q4-base:1.1.1.1 pkgsrc-2011Q3:1.1.1.1.0.14 pkgsrc-2011Q3-base:1.1.1.1 pkgsrc-2011Q2:1.1.1.1.0.12 pkgsrc-2011Q2-base:1.1.1.1 pkgsrc-2011Q1:1.1.1.1.0.10 pkgsrc-2011Q1-base:1.1.1.1 pkgsrc-2010Q4:1.1.1.1.0.8 pkgsrc-2010Q4-base:1.1.1.1 pkgsrc-2010Q3:1.1.1.1.0.6 pkgsrc-2010Q3-base:1.1.1.1 pkgsrc-2010Q2:1.1.1.1.0.4 pkgsrc-2010Q2-base:1.1.1.1 pkgsrc-2010Q1:1.1.1.1.0.2 pkgsrc-2010Q1-base:1.1.1.1 pkgsrc-20100219:1.1.1.1 TNF:1.1.1; locks; strict; comment @# @; 1.3 date 2014.10.09.14.06.42; author wiz; state Exp; branches; next 1.2; commitid fBDATFVmQ3454xTx; 1.2 date 2012.09.11.23.04.30; author asau; state Exp; branches; next 1.1; 1.1 date 2010.02.19.13.56.53; author wiz; state Exp; branches 1.1.1.1; next ; 1.1.1.1 date 2010.02.19.13.56.53; author wiz; state Exp; branches; next ; desc @@ 1.3 log @Remove pkgviews: don't set PKG_INSTALLATION_TYPES in Makefiles. @ text @# $NetBSD: Makefile,v 1.2 2012/09/11 23:04:30 asau Exp $ DISTNAME= prng-3.0.2 CATEGORIES= math MASTER_SITES= http://statistik.wu-wien.ac.at/software/prng/ MAINTAINER= wenheping@@gmail.com HOMEPAGE= http://statistik.wu-wien.ac.at/software/prng/ COMMENT= Portable, high-performance ANSI-C pseudorandom number generators LICENSE= gnu-gpl-v2 USE_TOOLS+= makeinfo GNU_CONFIGURE= yes INFO_FILES= yes TEST_TARGET= check .include "../../mk/bsd.pkg.mk" @ 1.2 log @"user-destdir" is default these days @ text @d1 1 a1 1 # $NetBSD: Makefile,v 1.1.1.1 2010/02/19 13:56:53 wiz Exp $ a12 2 PKG_INSTALLATION_TYPES= overwrite pkgviews @ 1.1 log @Initial revision @ text @d1 1 a1 1 # $NetBSD$ a13 1 PKG_DESTDIR_SUPPORT= user-destdir @ 1.1.1.1 log @Initial import of prng-3.0.2, packaged for wip by Wen Heping. PRNG is a collection of portable, high-performance ANSI-C implementations of pseudorandom number generators such as linear congruential, inversive congruential, and explicit inversive congruential random number generators (LCG, ICG and EICG, respectively) created by Otmar Lendl and Josef Leydold. @ text @@