strictly Hurwitz polynomial

strictly Hurwitz polynomial

[′strik·lē ′hər‚vits ‚päl·i′nō·mē·əl]
(mathematics)
A polynomial whose roots all have strictly negative real parts.
References in periodicals archive ?
where p is the complex frequency variable, h(p) is an arbitrary polynomial and g(p) is a strictly Hurwitz polynomial. The polynomial f(p) is monic and represents the transmission zeros of the network [13].