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Topic review - qring |
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qring |
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hello,
Please can you me say how can i prove , by use of singular, that the functions 3x^{2}, 5y{4} + z^{6}, 7z^{6} + 6yz^{5}
are "holomorphically" (or alg.) independents on the structural sheaf of holomorphics functions of the surface {x^{3} + y^{5} + z^{7} + yz^{6}=0} ?
thank you very much... PS: i have no answer about tjurina and milnor question....
hello,
Please can you me say how can i prove , by use of singular, that the functions 3x^{2}, 5y{4} + z^{6}, 7z^{6} + 6yz^{5}
are "holomorphically" (or alg.) independents on the structural sheaf of holomorphics functions of the surface {x^{3} + y^{5} + z^{7} + yz^{6}=0} ?
thank you very much... PS: i have no answer about tjurina and milnor question....
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Posted: Sat Oct 07, 2006 7:52 am |
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It is currently Fri May 13, 2022 10:56 am
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