System of bilinear equations

In mathematics, a system of bilinear equations is a special sort of system of polynomial equations, where each equation equates a bilinear form with a constant (possibly zero). More precisely, given two sets of variables represented as coordinate vectors {{math|x}} and y, then each equation of the system can be written $y^TA_ix=g_i,$ where, {{math|i}} is an integer whose value ranges from 1 to the number of equations, each $A_i$ is a matrix, and each $g_i$ is a real number. Systems of bilinear equations arise in many subjects including engineering, biology, and statistics.

References

Charles R. Johnson, Joshua A. Link 'Solution theory for complete bilinear systems of equations' - http://onlinelibrary.wiley.com/doi/10.1002/nla.676/abstract
Vinh, Le Anh 'On the solvability of systems of bilinear equations in finite fields' - https://arxiv.org/abs/0903.1156
Yang Dian 'Solution theory for system of bilinear equations' - https://digitalarchive.wm.edu/handle/10288/13726
Scott Cohen and Carlo Tomasi. 'Systems of bilinear equations'. Technical report, Stanford, CA, USA, 1997.- ftp://reports.stanford.edu/public_html/cstr/reports/cs/tr/97/1588/CS-TR-97-1588.pdf

Category:Equations

System of bilinear equations

See also

References