Differences between revisions 1 and 10 (spanning 9 versions)

What SAGE Can Do

Calculus

Computing a Groebner basis is fast because of the SINGULAR computer algebra system.

The notebook is a useful tool for basic math education because of its flexible visualization/output capabilities.

Basic arithmetic over finite extension fields is fast because of the Givaro library.

The reduced row echelon form of e.g. dense 20,000x20,000 matrices over GF(2) can be computed in seconds and 50MB of RAM.
Computation of reduced row echelon forms of sparse matrices is supported.

-  ⇤ ← Revision 1 as of 2007-04-16 17:59:23 → 
  Size: 265
  Editor: anonymous
  Comment:
+   ← Revision 10 as of 2007-04-17 08:10:48 → ⇥
  Size: 857
  Editor: MartinAlbrecht
  Comment: removed self-advertising, added some brief nodes about linear/commutative algebra
-Deletions are marked like this.
+Additions are marked like this.
 Line 5:
-== Commutative Algebra ==
+== Commutative Algebra ==
 * Computing a Groebner basis is fast because of the SINGULAR computer algebra system.

== Crypto ==

 * Classical ciphers are well supported.

== Elementary Education ==

 * The notebook is a useful tool for basic math education because of its flexible visualization/output capabilities.
-Line 8:
+Line 17:
+ * Basic arithmetic over finite extension fields is fast because of the Givaro library.
-Line 15:
+Line 26:
-== Number Theory ==
+ * The reduced row echelon form of e.g. dense 20,000x20,000 matrices over GF(2) can be computed in seconds and 50MB of RAM.
 * Computation of reduced row echelon forms of sparse matrices is supported.

== Number Theory ==