Changeset 7f92483 in git
- Timestamp:
- Oct 7, 2010, 11:51:45 AM (14 years ago)
- Branches:
- (u'spielwiese', 'fe61d9c35bf7c61f2b6cbf1b56e25e2f08d536cc')
- Children:
- 74270fcc741b7e84fe134ae44fa743f228c4c83d
- Parents:
- ce136a3deb909101f53d2844ba9fdd9bdc1c7842
- File:
-
- 1 edited
Legend:
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Singular/LIB/paraplanecurves.lib
rce136a r7f92483 23 23 and y as algebraic and computes an integral basis in C(x)[y] of the integral 24 24 closure of C[x] in C(x,y) using the normalization algorithm from 25 @ref{normal .lib}: see @ref{integralbasis.lib}. In a future edition of the25 @ref{normal_lib}: see @ref{integralbasis_lib}. In a future edition of the 26 26 library, also van Hoeij's algorithm for computing the integral basis will 27 27 be available. @* … … 248 248 Considering C in the chart z<>0, the algorithm regards x as transcendental 249 249 and y as algebraic and computes an integral basis in C(x)[y] of the integral 250 closure of C[x] in C(x,y) using the normalization algorithm from @ref{normal .lib}:251 see @ref{integralbasis .lib}. In a future edition of the library, also van Hoeij's250 closure of C[x] in C(x,y) using the normalization algorithm from @ref{normal_lib}: 251 see @ref{integralbasis_lib}. In a future edition of the library, also van Hoeij's 252 252 algorithm for computing the integral basis will be available. @* 253 253 From the integral basis, the adjoint ideal is obtained by linear algebra. … … 450 450 transcendental and y as algebraic and computes an integral basis in C(x)[y] of 451 451 the integral closure of C[x] in C(x,y) using the normalization algorithm 452 from @ref{normal .lib}: see @ref{integralbasis.lib}. In a future edition of the library,452 from @ref{normal_lib}: see @ref{integralbasis_lib}. In a future edition of the library, 453 453 also van Hoeij's algorithm for computing the integral basis will be available.@* 454 454 From the integral basis, the adjoint ideal is obtained by linear algebra.
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