On 2017-03-13 08:45, Volker Braun wrote: > As always, you can get the latest beta version from the "develop" git > branch. Alternatively, the self-contained source tarball is at > http://www.sagemath.org/download-latest.html
Fresh clone on Linux Mint 17.3, make ptestlong brings up: Due to the still not fixed https://trac.sagemath.org/ticket/20270: sage -t --long src/sage/interfaces/expect.py # 1 doctest failed sage -t --long src/sage/repl/interpreter.py # 3 doctests failed sage -t --long src/sage/repl/interface_magic.py # 3 doctests failed sage -t --long src/sage/repl/ipython_tests.py # 4 doctests failed Some time out (why do we get these so often???): sage -t --long src/sage/modular/abvar/torsion_subgroup.py # Timed out Full timeoutlog below. Best Daniel sage -t --long src/sage/modular/abvar/torsion_subgroup.py Timed out ********************************************************************** Tests run before process (pid=25096) timed out: sage: J = J0(50) ## line 20 ## sage: T = J.rational_torsion_subgroup(); T ## line 21 ## Torsion subgroup of Abelian variety J0(50) of dimension 2 sage: T.multiple_of_order() ## line 23 ## 15 sage: T.divisor_of_order() ## line 25 ## 15 sage: T.gens() ## line 27 ## [[(1/15, 3/5, 2/5, 14/15)]] sage: T.invariants() ## line 29 ## [15] sage: d = J.decomposition(); d ## line 31 ## [ Simple abelian subvariety 50a(1,50) of dimension 1 of J0(50), Simple abelian subvariety 50b(1,50) of dimension 1 of J0(50) ] sage: d[0].rational_torsion_subgroup().order() ## line 36 ## 3 sage: d[1].rational_torsion_subgroup().order() ## line 38 ## 5 sage: for N in range(1,38): for A in J0(N).new_subvariety().decomposition(): T = A.rational_torsion_subgroup() print('%-5s%-5s%-5s%-5s'%(N, A.dimension(), T.divisor_of_order(), T.multiple_of_order())) ## line 46 ## 11 1 5 5 14 1 6 6 15 1 8 8 17 1 4 4 19 1 3 3 20 1 6 6 21 1 8 8 23 2 11 11 24 1 8 8 26 1 3 3 26 1 7 7 27 1 3 3 29 2 7 7 30 1 6 6 31 2 5 5 32 1 4 4 33 1 4 4 34 1 6 6 35 1 3 3 35 2 16 16 36 1 6 6 37 1 1 1 37 1 3 3 sage: T = J0(54).rational_torsion_subgroup() ## line 76 ## sage: loads(dumps(T)) == T ## line 77 ## True sage: sig_on_count() # check sig_on/off pairings (virtual doctest) ## line 79 ## 0 sage: T = J0(14).rational_torsion_subgroup(); T ## line 120 ## Torsion subgroup of Abelian variety J0(14) of dimension 1 sage: type(T) ## line 122 ## <class 'sage.modular.abvar.torsion_subgroup.RationalTorsionSubgroup_with_category'> sage: sig_on_count() # check sig_on/off pairings (virtual doctest) ## line 124 ## 0 sage: T = J1(13).rational_torsion_subgroup(); T ## line 133 ## Torsion subgroup of Abelian variety J1(13) of dimension 2 sage: T._repr_() ## line 135 ## 'Torsion subgroup of Abelian variety J1(13) of dimension 2' sage: sig_on_count() # check sig_on/off pairings (virtual doctest) ## line 137 ## 0 sage: G = J0(11).rational_torsion_subgroup(); H = J0(13).rational_torsion_subgroup() ## line 156 ## sage: G == G ## line 157 ## True sage: G < H # since 11 < 13 ## line 159 ## True sage: G > H ## line 161 ## False sage: sig_on_count() # check sig_on/off pairings (virtual doctest) ## line 163 ## 0 sage: A = J0(11) ## line 196 ## sage: A.rational_torsion_subgroup().order() ## line 197 ## 5 sage: A = J0(23) ## line 199 ## sage: A.rational_torsion_subgroup().order() ## line 200 ## 11 sage: T = J0(37)[1].rational_torsion_subgroup() ## line 202 ## sage: T.order() ## line 203 ## 3 sage: J = J1(13) ## line 206 ## sage: J.rational_torsion_subgroup().order() ## line 207 ## 19 sage: J = J1(23) ## line 212 ## sage: J.rational_torsion_subgroup().order() ## line 213 ## sage: J.rational_torsion_subgroup().order(proof=False) ## line 218 ## 408991 sage: sig_on_count() # check sig_on/off pairings (virtual doctest) ## line 221 ## 0 sage: J0(11).rational_torsion_subgroup().lattice() ## line 242 ## -- You received this message because you are subscribed to the Google Groups "sage-release" group. To unsubscribe from this group and stop receiving emails from it, send an email to sage-release+unsubscr...@googlegroups.com. To post to this group, send email to sage-release@googlegroups.com. Visit this group at https://groups.google.com/group/sage-release. For more options, visit https://groups.google.com/d/optout.