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Comment: summarized #3544
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summarized #4296, #3124, #3571, #4612, #4626, #4874, #4965
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Deletions are marked like this. | Additions are marked like this. |
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* Switch to eMPIRe * Switch to ecl * Update Python to 2.5.4 * Ppdate Pari to 2.3.4svn |
* Switch to [[http://www.mpir.org|eMPIRe]] as an implementation of multi-precision integers and rationals * Switch to [[http://ecls.sourceforge.net|ecl]] for a Common Lisp implementation * Update [[http://www.python.org|Python]] to 2.5.4 * Update [[http://pari.math.u-bordeaux.fr|Pari]] to 2.3.4svn |
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* Improved precision and performance when calculating analytic rank (William Stein) -- When calculating the analytic rank of an elliptic curve, the default is to use Cremona's {{{gp}}} script, where the precision is automatically doubled until it doesn't fail. The precision is started at 16 rather than the previous default precision. The computation is now about 3 times faster usually by starting off using this smaller precision. |
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* {{{ivalue}}} field in {{{integer_mod.pyx}}} is no longer public (Craig Citro) -- The {{{ivalue}}} field for {{{IntegerMod_int}}} is no longer public. This gives about a 1.5 to 2X speedup when multiplying {{{IntegerMod_ints}}}. * Some fixes for {{{is_perfect_power}}} and {{{bessel_J(0,0)}}} (Craig Citro, Rob Bradshaw, Robert Miller) -- A temporary work around for an upstream bug in GMP when using {{{is_perfect_power()}}}. Resolved a Pari interface bug when using {{{bessel_J(0,0)}}}. * Improved performance for generic polynomial rings, and for univariate polynomial arithmetic over {{{Z/nZ[x]}}} (Yann Laigle-Chapuy, Martin Albrecht) -- Improved performance when performing modulo arithmetic between elements of a generic polynomial ring. Univariate polynomial arithmetic over {{{Z/nZ[x]}}} now has considerable speed-up at approximately 20x. |
Sage 3.3 Release Tour
Sage 3.3 was released on FIXME. For the official, comprehensive release notes, see sage-3.3.txt. In general terms, the following points are some of the foci of this release:
- Clean up various doctest failures from 3.2.3
- Fix some build issues from 3.2.3 on the new set of supported images
- Merge small to medium sized patches ready to go in
Switch to eMPIRe as an implementation of multi-precision integers and rationals
Switch to ecl for a Common Lisp implementation
Update Python to 2.5.4
Update Pari to 2.3.4svn
Here's a summary of features in this release, categorized under various headings.
Algebra
Transitivity for permutation groups (William Stein) -- In the permutation group module permgroup.py, the query function is_transitive() returns whether or not the group is transitive on [1..G.degree()]. A few surrounding docstrings are fixed and doctest coverage for the file sage/groups/perm_gps/permgroup.py is now 100%.
Algebraic Geometry
Improved precision and performance when calculating analytic rank (William Stein) -- When calculating the analytic rank of an elliptic curve, the default is to use Cremona's gp script, where the precision is automatically doubled until it doesn't fail. The precision is started at 16 rather than the previous default precision. The computation is now about 3 times faster usually by starting off using this smaller precision.
Basic Arithmetic
ivalue field in integer_mod.pyx is no longer public (Craig Citro) -- The ivalue field for IntegerMod_int is no longer public. This gives about a 1.5 to 2X speedup when multiplying IntegerMod_ints.
Some fixes for is_perfect_power and bessel_J(0,0) (Craig Citro, Rob Bradshaw, Robert Miller) -- A temporary work around for an upstream bug in GMP when using is_perfect_power(). Resolved a Pari interface bug when using bessel_J(0,0).
Improved performance for generic polynomial rings, and for univariate polynomial arithmetic over Z/nZ[x] (Yann Laigle-Chapuy, Martin Albrecht) -- Improved performance when performing modulo arithmetic between elements of a generic polynomial ring. Univariate polynomial arithmetic over Z/nZ[x] now has considerable speed-up at approximately 20x.
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