Linear Algebra and Circuits
Abstract
The study of linear systems on a field k is a very important branch of algebra and geometry.
The use of theory of Groebner bases simplify the argument.
Systems of equations that are linear in the variables Yi,with coefficients are in a noetherian ring R , that is not a field,can appear in many problems. If R is the polynomial ring in the variables Xi and coefficients in a field k , we give some criterions for the resolution of such systems.
[DOI: 10.1685/CSC06038] About DOI
The use of theory of Groebner bases simplify the argument.
Systems of equations that are linear in the variables Yi,with coefficients are in a noetherian ring R , that is not a field,can appear in many problems. If R is the polynomial ring in the variables Xi and coefficients in a field k , we give some criterions for the resolution of such systems.
[DOI: 10.1685/CSC06038] About DOI
Full Text:
[DOI: 10.1685/] About DOI
Url Resolver: : http://dx.doi.org/10.1685/
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