X-Git-Url: https://pintos-os.org/cgi-bin/gitweb.cgi?a=blobdiff_plain;f=tests%2Flibpspp%2Fsparse-xarray-test.at;h=00fa4fb00d513b41ddb039fac61097bbf0b43028;hb=67eaa039729c1e8b51122a0cbe5163d20f406f69;hp=a323e6b9615f712e251d35318e46ac5631dad957;hpb=691a034d7f2139076fa012739dffd40ef5db4a9b;p=pspp diff --git a/tests/libpspp/sparse-xarray-test.at b/tests/libpspp/sparse-xarray-test.at index a323e6b961..00fa4fb00d 100644 --- a/tests/libpspp/sparse-xarray-test.at +++ b/tests/libpspp/sparse-xarray-test.at @@ -13,7 +13,8 @@ dnl GNU General Public License for more details. dnl dnl You should have received a copy of the GNU General Public License dnl along with this program. If not, see . -dnl AT_BANNER([sparse external arrays]) +dnl +AT_BANNER([sparse external arrays]) m4_divert_push([PREPARE_TESTS]) [sparse_xarray_queue_limit () { @@ -55,6 +56,7 @@ m4_divert_push([PREPARE_TESTS]) m4_divert_pop([PREPARE_TESTS]) AT_SETUP([in-memory sparse_xarray]) +AT_KEYWORDS([slow]) dnl --values=3 would be a slightly better test but takes much longer. AT_CHECK([sparse-xarray-test \ --verbosity=0 --queue-limit=`sparse_xarray_queue_limit` \ @@ -64,6 +66,7 @@ AT_CLEANUP m4_define([SPARSE_XARRAY_ON_DISK], [AT_SETUP([on-disk sparse_xarray max-memory-rows=$1]) + AT_KEYWORDS([slow]) AT_CHECK([sparse-xarray-test \ --verbosity=0 --queue-limit=`sparse_xarray_queue_limit` \ --columns=2 --max-rows=3 --max-memory-rows=$1 --values=2], @@ -74,7 +77,7 @@ SPARSE_XARRAY_ON_DISK([1]) SPARSE_XARRAY_ON_DISK([2]) AT_SETUP([copying between in-memory sparse_xarrays]) -AT_KEYWORDS([sparse_xarray]) +AT_KEYWORDS([sparse_xarray slow]) AT_CHECK([sparse-xarray-test \ --verbosity=0 --queue-limit=`sparse_xarray_queue_limit` \ --columns=2 --max-rows=2 --max-memory-rows=2 --values=2 \ @@ -84,7 +87,7 @@ AT_CLEANUP m4_define([SPARSE_XARRAY_COPY_DISK], [AT_SETUP([copying between on-disk sparse_xarrays max-memory-rows=$1]) - AT_KEYWORDS([sparse_xarray]) + AT_KEYWORDS([sparse_xarray slow]) limit=`sparse_xarray_queue_limit` AT_CHECK([sparse-xarray-test \ --verbosity=0 --queue-limit=`expr $limit / 2` \