Differences between revisions 5 and 10 (spanning 5 versions)
Revision 5 as of 2009-06-19 14:06:05
Size: 2218
Editor: Minh Nguyen
Comment: reminder to summarize feature
Revision 10 as of 2009-06-24 01:04:47
Size: 11550
Editor: Minh Nguyen
Comment: Summarize #6123, #6178, #5510, #6089, #6110
Deletions are marked like this. Additions are marked like this.
Line 11: Line 11:
 * FIXME: summarize #5845

 * FIXME: summarize #6229

 * FIXME: summarize #6250
 * Correct precision bound in {{{hilbert_class_polynomial()}}} and miscellaneous new functions (John Cremona) -- The two new functions are {{{elliptic_j()}}} in {{{sage/functions/special.py}}}, and {{{is_primitive()}}} in the class {{{BinaryQF}}} of {{{sage/quadratic_forms/binary_qf.py}}}. The function {{{elliptic_j(z)}}} returns the elliptic modular {{{j}}}-function evaluated at {{{z}}}. The function {{{is_primitive()}}} determines whether the binary quadratic form {{{ax^2 + bxy + cy^2}}} satisfies {{{gcd(a,b,c) = 1}}}, i.e. that it is primitive. Here are some examples on using these new functions:
 {{{
sage: elliptic_j(CC(i))
1728.00000000000
sage: elliptic_j(sqrt(-2.0))
8000.00000000000
sage: Q = BinaryQF([6,3,9])
sage: Q.is_primitive()
False
sage: Q = BinaryQF([1,1,1])
sage: Q.is_primitive()
True
 }}}


 * Efficient Lagrange interpolation polynomial (Yann Laigle-Chapuy) -- Calculating the Lagrange interpolation polynomial of a set of points is now up to 48% faster than previously. The following timing statistics were obtained using the machine sage.math:
 {{{
# BEFORE

sage: R = PolynomialRing(QQ, 'x')
sage: %timeit R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
1000 loops, best of 3: 824 µs per loop
sage: R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
-23/84*x^3 - 11/84*x^2 + 13/7*x + 1
sage: R = PolynomialRing(GF(2**3,'a'), 'x')
sage: a = R.base_ring().gen()
sage: timeit("R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])")
625 loops, best of 3: 111 µs per loop
sage: R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])
a^2*x^2 + a^2*x + a^2


# AFTER

sage: R = PolynomialRing(QQ, 'x')
sage: %timeit R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
1000 loops, best of 3: 425 µs per loop
sage: R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
-23/84*x^3 - 11/84*x^2 + 13/7*x + 1
sage: R = PolynomialRing(GF(2**3,'a'), 'x')
sage: a = R.base_ring().gen()
sage: timeit("R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])")
625 loops, best of 3: 86.4 µs per loop
sage: R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])
a^2*x^2 + a^2*x + a^2
 }}}


 * Deprecate the method {{{__len__()}}} for a matrix group (Nicolas Thiery) -- The method {{{__len__()}}} of the class {{{MatrixGroup_gap}}} in {{{sage/groups/matrix_gps/matrix_group.py}}} is now deprecated and will be removed in a future release. To get the number of elements in a matrix group, users are advised to use the method {{{cardinality()}}} instead. The method {{{order()}}} is essentially the same as {{{cardinality()}}}, so {{{order()}}} will be deprecated in a future release.
Line 21: Line 65:
 * FIXME: summarize #6218  * Optimize hyperelliptic curve arithmetic (Nick Alexander) -- Arithmetics with hyperelliptic curves can be up to 6x faster than previously. The following timing statistics were obtained using the maching sage.math:
 {{{
#BEFORE

sage: F = GF(next_prime(10^30))
sage: x = F['x'].gen()
sage: f = x^7 + x^2 + 1
sage: H = HyperellipticCurve(f, 2*x)
sage: J = H.jacobian()(F)
verbose 0 (902: multi_polynomial_ideal.py, dimension) Warning: falling back to very slow toy implementation.
sage: Q = J(H.lift_x(F(1)))
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.65 s, sys: 0.02 s, total: 0.67 s
Wall time: 0.68 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 1.08 s, sys: 0.00 s, total: 1.08 s
Wall time: 1.08 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.72 s, sys: 0.02 s, total: 0.74 s
Wall time: 0.74 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.67 s, sys: 0.00 s, total: 0.67 s
Wall time: 0.67 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.66 s, sys: 0.00 s, total: 0.66 s
Wall time: 0.66 s


# AFTER

sage: F = GF(next_prime(10^30))
sage: x = F['x'].gen()
sage: f = x^7 + x^2 + 1
sage: H = HyperellipticCurve(f, 2*x)
sage: J = H.jacobian()(F)
verbose 0 (919: multi_polynomial_ideal.py, dimension) Warning: falling back to very slow toy implementation.
sage: Q = J(H.lift_x(F(1)))
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.14 s, sys: 0.01 s, total: 0.15 s
Wall time: 0.15 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.10 s, sys: 0.00 s, total: 0.10 s
Wall time: 0.10 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.09 s, sys: 0.00 s, total: 0.09 s
Wall time: 0.10 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.09 s, sys: 0.01 s, total: 0.10 s
Wall time: 0.10 s
sage: %time ZZ.random_element(10**10) * Q;
CPU times: user 0.10 s, sys: 0.00 s, total: 0.10 s
Wall time: 0.11 s
 }}}
Line 30: Line 126:
 * FIXME: summarize #6234  * FIXME: summarize #6170
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 * FIXME: summarize #6014  * Hexads in {{{S(5,6,12)}}} and mathematical blackjack (David Joyner) -- Implements kittens, hexads and mathematical blackjack as described in the following papers:
  * R. Curtis. The Steiner system {{{S(5,6,12)}}}, the Mathieu group {{{M_{12}}}}, and the kitten. In M. Atkinson (ed.) Computational Group Theory, Academic Press, 1984.
  * J. Conway. Hexacode and tetracode -- MINIMOG and MOG. In M. Atkinson (ed.) Computational Group Theory, Academic Press, 1984.
  * J. Conway and N. Sloane. Lexicographic codes: error-correcting codes from game theory. IEEE Transactions on Information Theory, 32:337-348, 1986.
  * J. Kahane and A. Ryba. The hexad game. Electronic Journal of Combinatorics, 8, 2001. http://www.combinatorics.org/Volume_8/Abstracts/v8i2r11.html
Line 48: Line 148:
 * FIXME: summarize #6051  * Enable Singular's coefficient rings which are not fields (Martin Albrecht) -- Singular 3-1-0 supports coefficient rings which are not fields. In particular, it supports {{{ZZ}}} and {{{ZZ/nZZ}}} now. These are now natively supported in Sage.
Line 54: Line 154:
 * FIXME: summarize #6185  * S-box to CNF Conversion (Martin Albrecht) -- New method {{{cnf()}}} in the class {{{SBox}}} of {{{sage/crypto/mq/sbox.py}}} for converting an S-box to conjunctive normal form. Here are some examples on S-box to CNF conversion:
 {{{
sage: S = mq.SBox(1,2,0,3); S
(1, 2, 0, 3)
sage: S.cnf()

[(1, 2, -3),
 (1, 2, 4),
 (1, -2, 3),
 (1, -2, -4),
 (-1, 2, -3),
 (-1, 2, -4),
 (-1, -2, 3),
 (-1, -2, 4)]
sage: # convert this representation to the DIMACS format
sage: print S.cnf(format='dimacs')
p cnf 4 8
1 2 -3 0
1 2 4 0
1 -2 3 0
1 -2 -4 0
-1 2 -3 0
-1 2 -4 0
-1 -2 3 0
-1 -2 4 0

sage: # as a truth table
sage: log = SymbolicLogic()
sage: s = log.statement(S.cnf(format='symbolic'))
sage: log.truthtable(s)[1:]

[['False', 'False', 'False', 'False', 'False'],
 ['False', 'False', 'False', 'True', 'False'],
 ['False', 'False', 'True', 'False', 'False'],
 ['False', 'False', 'True', 'True', 'True'],
 ['False', 'True', 'False', 'False', 'True'],
 ['False', 'True', 'False', 'True', 'True'],
 ['False', 'True', 'True', 'False', 'True'],
 ['False', 'True', 'True', 'True', 'True'],
 ['True', 'False', 'False', 'False', 'True'],
 ['True', 'False', 'False', 'True', 'True'],
 ['True', 'False', 'True', 'False', 'True'],
 ['True', 'False', 'True', 'True', 'True'],
 ['True', 'True', 'False', 'False', 'True'],
 ['True', 'True', 'False', 'True', 'True'],
 ['True', 'True', 'True', 'False', 'True'],
 ['True', 'True', 'True', 'True', 'True']]
 }}}
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 * FIXME: summarize #5975  * LaTeX output for (combinatorial) graphs (Robert Beezer, Fidel Barrera Cruz) -- Implement the option {{{tkz_style}}} to output graphs in LaTeX format so that they could be processed by pgf/tkz. Here's an example of the Petersen graph visualized using tkz:
 {{{
g = graphs.PetersenGraph()
g.set_latex_options(tkz_style='Art')
view(g, pdflatex=True)
 }}}
{{attachment:petersen-latex.png}}
Line 69: Line 222:
 * FIXME: summarize #6263

 * FIXME: summarize #6123
 * Python interface to partition backtrack functions (Robert Miller) -- New module in {{{sage/groups/perm_gps/partn_ref/refinement_python.pyx}}} provides Python frontends to the Cython-based partition backtrack functions. This allows one to write the three input functions ({{{all_children_are_equivalent}}}, {{{refine_and_return_invariant}}}, and {{{compare_structures}}}) in pure Python, and still use the Cython algorithms. Experimentation with specific partition backtrack implementations no longer requires compilation, as the input functions can be dynamically changed at runtime. Note that this is not intended for production quality implementations of partition refinement, but instead for experimentation, learning, and use of the Python debugger.
Line 80: Line 231:
 * FIXME: summarize #6178

 * FIXME: summarize #5510

 * FIXME: summarize #2256
 * Hermite normal form over principal ideal domains (David Loeffler) -- This adds echelon form (or Hermite normal form) over principal ideal domains. Here an example:
 {{{
sage: L.<w> = NumberField(x^2 - x + 2)
sage: OL = L.ring_of_integers()
sage: m = matrix(OL, 2, 2, [1,2,3,4+w])
sage: m.echelon_form()
[ 1 -2]
[ 0 w - 2]
sage: m.echelon_form(transformation=True)
([ 1 -2]
[ 0 w - 2], [-3*w - 2 w + 1]
[ -3 1])
 }}}
Line 90: Line 249:
 * FIXME: summarize #6089

 * FIXME: summarize #6110
 * Bypassing jsMath with view command (John Palmieri) -- This provides a way to not always use jsMath when rendering LaTeX for the {{{view}}} command in the notebook. It works by looking for certain strings in the LaTeX code for the object, and if it finds them, it creates and displays a PNG file, bypassing jsMath altogether. The "certain strings" are stored in a list which is initially empty, but can be populated by using
 {{{
latex.jsmath_avoid_list(...)
 }}}
 or
 {{{
latex.add_to_jsmath_avoid_list(...)
 }}}


 * A "decorator" to allow pickling nested classes (Carl Witty, Nicolas Thiery) -- The {{{nested_pickle}}} decorator modifies nested classes to be picklable. (In Python 2.6 it should be usable as a decorator, although that hasn't been tested; Python 2.5 doesn't support class decorators, so you can't use that syntax in Sage until Sage upgrades to Python 2.6.)
Line 145: Line 312:
 * Update the [[http://m4ri.sagemath.org|M4RI]] spkg to version {{{libm4ri-20090617}}} (Martin Albrecht).

Sage 4.0.2 Release Tour

Sage 4.0.2 was released on FIXME. For the official, comprehensive release note, please refer to FIXME. A nicely formatted version of this release tour can be found at FIXME. The following points are some of the foci of this release:

Algebra

  • Correct precision bound in hilbert_class_polynomial() and miscellaneous new functions (John Cremona) -- The two new functions are elliptic_j() in sage/functions/special.py, and is_primitive() in the class BinaryQF of sage/quadratic_forms/binary_qf.py. The function elliptic_j(z) returns the elliptic modular j-function evaluated at z. The function is_primitive() determines whether the binary quadratic form ax^2 + bxy + cy^2 satisfies gcd(a,b,c) = 1, i.e. that it is primitive. Here are some examples on using these new functions:

    sage: elliptic_j(CC(i))
    1728.00000000000
    sage: elliptic_j(sqrt(-2.0))
    8000.00000000000
    sage: Q = BinaryQF([6,3,9])
    sage: Q.is_primitive()
    False
    sage: Q = BinaryQF([1,1,1])
    sage: Q.is_primitive()
    True
  • Efficient Lagrange interpolation polynomial (Yann Laigle-Chapuy) -- Calculating the Lagrange interpolation polynomial of a set of points is now up to 48% faster than previously. The following timing statistics were obtained using the machine sage.math:
    # BEFORE
    
    sage: R = PolynomialRing(QQ, 'x')
    sage: %timeit R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
    1000 loops, best of 3: 824 µs per loop
    sage: R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
    -23/84*x^3 - 11/84*x^2 + 13/7*x + 1
    sage: R = PolynomialRing(GF(2**3,'a'), 'x')
    sage: a = R.base_ring().gen()
    sage: timeit("R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])")
    625 loops, best of 3: 111 µs per loop
    sage: R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])
    a^2*x^2 + a^2*x + a^2
    
    
    # AFTER
    
    sage: R = PolynomialRing(QQ, 'x')
    sage: %timeit R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
    1000 loops, best of 3: 425 µs per loop
    sage: R.lagrange_polynomial([(0,1),(2,2),(3,-2),(-4,9)])
    -23/84*x^3 - 11/84*x^2 + 13/7*x + 1
    sage: R = PolynomialRing(GF(2**3,'a'), 'x')
    sage: a = R.base_ring().gen()
    sage: timeit("R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])")
    625 loops, best of 3: 86.4 µs per loop
    sage: R.lagrange_polynomial([(a^2+a,a),(a,1),(a^2,a^2+a+1)])
    a^2*x^2 + a^2*x + a^2
  • Deprecate the method __len__() for a matrix group (Nicolas Thiery) -- The method __len__() of the class MatrixGroup_gap in sage/groups/matrix_gps/matrix_group.py is now deprecated and will be removed in a future release. To get the number of elements in a matrix group, users are advised to use the method cardinality() instead. The method order() is essentially the same as cardinality(), so order() will be deprecated in a future release.

Algebraic Geometry

  • Optimize hyperelliptic curve arithmetic (Nick Alexander) -- Arithmetics with hyperelliptic curves can be up to 6x faster than previously. The following timing statistics were obtained using the maching sage.math:
    #BEFORE
    
    sage: F = GF(next_prime(10^30))
    sage: x = F['x'].gen()
    sage: f = x^7 + x^2 + 1
    sage: H = HyperellipticCurve(f, 2*x)
    sage: J = H.jacobian()(F)
    verbose 0 (902: multi_polynomial_ideal.py, dimension) Warning: falling back to very slow toy implementation.
    sage: Q = J(H.lift_x(F(1)))
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.65 s, sys: 0.02 s, total: 0.67 s
    Wall time: 0.68 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 1.08 s, sys: 0.00 s, total: 1.08 s
    Wall time: 1.08 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.72 s, sys: 0.02 s, total: 0.74 s
    Wall time: 0.74 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.67 s, sys: 0.00 s, total: 0.67 s
    Wall time: 0.67 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.66 s, sys: 0.00 s, total: 0.66 s
    Wall time: 0.66 s
    
    
    # AFTER
    
    sage: F = GF(next_prime(10^30))
    sage: x = F['x'].gen()
    sage: f = x^7 + x^2 + 1
    sage: H = HyperellipticCurve(f, 2*x)
    sage: J = H.jacobian()(F)
    verbose 0 (919: multi_polynomial_ideal.py, dimension) Warning: falling back to very slow toy implementation.
    sage: Q = J(H.lift_x(F(1)))
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.14 s, sys: 0.01 s, total: 0.15 s
    Wall time: 0.15 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.10 s, sys: 0.00 s, total: 0.10 s
    Wall time: 0.10 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.09 s, sys: 0.00 s, total: 0.09 s
    Wall time: 0.10 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.09 s, sys: 0.01 s, total: 0.10 s
    Wall time: 0.10 s
    sage: %time ZZ.random_element(10**10) * Q;
    CPU times: user 0.10 s, sys: 0.00 s, total: 0.10 s
    Wall time: 0.11 s

Basic Arithmetic

Build

  • FIXME: summarize #6170

Calculus

Coding Theory

  • Hexads in S(5,6,12) and mathematical blackjack (David Joyner) -- Implements kittens, hexads and mathematical blackjack as described in the following papers:

    • R. Curtis. The Steiner system S(5,6,12), the Mathieu group M_{12}, and the kitten. In M. Atkinson (ed.) Computational Group Theory, Academic Press, 1984.

    • J. Conway. Hexacode and tetracode -- MINIMOG and MOG. In M. Atkinson (ed.) Computational Group Theory, Academic Press, 1984.
    • J. Conway and N. Sloane. Lexicographic codes: error-correcting codes from game theory. IEEE Transactions on Information Theory, 32:337-348, 1986.
    • J. Kahane and A. Ryba. The hexad game. Electronic Journal of Combinatorics, 8, 2001. http://www.combinatorics.org/Volume_8/Abstracts/v8i2r11.html

Combinatorics

Commutative Algebra

  • Enable Singular's coefficient rings which are not fields (Martin Albrecht) -- Singular 3-1-0 supports coefficient rings which are not fields. In particular, it supports ZZ and ZZ/nZZ now. These are now natively supported in Sage.

Cryptography

  • S-box to CNF Conversion (Martin Albrecht) -- New method cnf() in the class SBox of sage/crypto/mq/sbox.py for converting an S-box to conjunctive normal form. Here are some examples on S-box to CNF conversion:

    sage: S = mq.SBox(1,2,0,3); S
    (1, 2, 0, 3)
    sage: S.cnf()
    
    [(1, 2, -3),
     (1, 2, 4),
     (1, -2, 3),
     (1, -2, -4),
     (-1, 2, -3),
     (-1, 2, -4),
     (-1, -2, 3),
     (-1, -2, 4)]
    sage: # convert this representation to the DIMACS format
    sage: print S.cnf(format='dimacs')
    p cnf 4 8
    1 2 -3 0
    1 2 4 0
    1 -2 3 0
    1 -2 -4 0
    -1 2 -3 0
    -1 2 -4 0
    -1 -2 3 0
    -1 -2 4 0
    
    sage: # as a truth table
    sage: log = SymbolicLogic()
    sage: s = log.statement(S.cnf(format='symbolic'))
    sage: log.truthtable(s)[1:]
    
    [['False', 'False', 'False', 'False', 'False'],
     ['False', 'False', 'False', 'True', 'False'],
     ['False', 'False', 'True', 'False', 'False'],
     ['False', 'False', 'True', 'True', 'True'],
     ['False', 'True', 'False', 'False', 'True'],
     ['False', 'True', 'False', 'True', 'True'],
     ['False', 'True', 'True', 'False', 'True'],
     ['False', 'True', 'True', 'True', 'True'],
     ['True', 'False', 'False', 'False', 'True'],
     ['True', 'False', 'False', 'True', 'True'],
     ['True', 'False', 'True', 'False', 'True'],
     ['True', 'False', 'True', 'True', 'True'],
     ['True', 'True', 'False', 'False', 'True'],
     ['True', 'True', 'False', 'True', 'True'],
     ['True', 'True', 'True', 'False', 'True'],
     ['True', 'True', 'True', 'True', 'True']]

Graph Theory

  • LaTeX output for (combinatorial) graphs (Robert Beezer, Fidel Barrera Cruz) -- Implement the option tkz_style to output graphs in LaTeX format so that they could be processed by pgf/tkz. Here's an example of the Petersen graph visualized using tkz:

    g = graphs.PetersenGraph()
    g.set_latex_options(tkz_style='Art')
    view(g, pdflatex=True)

petersen-latex.png

Graphics

Group Theory

  • Python interface to partition backtrack functions (Robert Miller) -- New module in sage/groups/perm_gps/partn_ref/refinement_python.pyx provides Python frontends to the Cython-based partition backtrack functions. This allows one to write the three input functions (all_children_are_equivalent, refine_and_return_invariant, and compare_structures) in pure Python, and still use the Cython algorithms. Experimentation with specific partition backtrack implementations no longer requires compilation, as the input functions can be dynamically changed at runtime. Note that this is not intended for production quality implementations of partition refinement, but instead for experimentation, learning, and use of the Python debugger.

Interfaces

Linear Algebra

  • Hermite normal form over principal ideal domains (David Loeffler) -- This adds echelon form (or Hermite normal form) over principal ideal domains. Here an example:
    sage: L.<w> = NumberField(x^2 - x + 2)
    sage: OL = L.ring_of_integers()
    sage: m = matrix(OL, 2, 2, [1,2,3,4+w])
    sage: m.echelon_form()
    [    1    -2]
    [    0 w - 2]
    sage: m.echelon_form(transformation=True)
    ([    1    -2]
    [    0 w - 2], [-3*w - 2    w + 1]
    [      -3        1])

Miscellaneous

  • Bypassing jsMath with view command (John Palmieri) -- This provides a way to not always use jsMath when rendering LaTeX for the view command in the notebook. It works by looking for certain strings in the LaTeX code for the object, and if it finds them, it creates and displays a PNG file, bypassing jsMath altogether. The "certain strings" are stored in a list which is initially empty, but can be populated by using

    latex.jsmath_avoid_list(...)
    or
    latex.add_to_jsmath_avoid_list(...)
  • A "decorator" to allow pickling nested classes (Carl Witty, Nicolas Thiery) -- The nested_pickle decorator modifies nested classes to be picklable. (In Python 2.6 it should be usable as a decorator, although that hasn't been tested; Python 2.5 doesn't support class decorators, so you can't use that syntax in Sage until Sage upgrades to Python 2.6.)

Modular Forms

Notebook

  • FIXME: summarize #6259
  • FIXME: summarize #6225
  • FIXME: summarize #5371

Number Theory

  • FIXME: summarize #5976
  • FIXME: summarize #5842
  • FIXME: summarize #6205
  • FIXME: summarize #6193
  • FIXME: summarize #6044
  • FIXME: summarize #6046

Numerical

Packages

  • Upgrade NumPy to version 1.3.0 latest upstream release (Jason Grout).

  • Upgrade SciPy to version 0.7 latest upstream release (Jason Grout).

  • Upgrade Singular to version 3-1-0 latest upstream release (Martin Albrecht).

  • Upgrade FLINT to version 1.3.0 latest upstream release (Nick Alexander).

  • Update the MPIR spkg to version mpir-1.2.p3.spkg (Nick Alexander).

  • Update the M4RI spkg to version libm4ri-20090617 (Martin Albrecht).

  • Remove Guava as a standard Sage package (David Joyner).

  • FIXME: summarize #6298

Symbolics

Topology