Polynomial Characteristic Equations
Morris, J.; Head, J.W.
1955-12-01 00:00:00
IN the investigation of stability problems in physical science it is essential that stability criteria be available to ensure that the characteristic equation, which is usually an algebraic polynomial equation, is such that the roots, if real, are negative and, if complex, have their real parts negative.
http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.pngAircraft Engineering and Aerospace TechnologyEmerald Publishinghttp://www.deepdyve.com/lp/emerald-publishing/polynomial-characteristic-equations-p4qLFK1l4C
IN the investigation of stability problems in physical science it is essential that stability criteria be available to ensure that the characteristic equation, which is usually an algebraic polynomial equation, is such that the roots, if real, are negative and, if complex, have their real parts negative.
Journal
Aircraft Engineering and Aerospace Technology
– Emerald Publishing
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