TY - JOUR
T1 - On differential structures of polynomial spaces in control theory
AU - Hernández, Baltazar Aguirre
AU - Frías-Armenta, Martn Eduardo
AU - Verduzco, Fernando
N1 - Funding Information:
This work is partly supported by CONACYT CB-2010/150532.
PY - 2012/9
Y1 - 2012/9
N2 - A valuable number of works has been published about Hurwitz and Schur polynomials in order to known better their properties. For example it is known that the sets of Hurwitz and Schur polynomials are open and no convex sets. Besides, the set of monic Schur polynomials is contractible. Now we study this set using ideas from differential topology, and we prove that the space of Schur complex polynomials with positive leading coefficient, and the space of Hurwitz complex polynomials which leading coefficient having positive real part, have structure of trivial vector bundle, and each space of (Schur complex and real, Hurwitz complex) polynomials has a differential structure diffeomorphic to some known spaces.
AB - A valuable number of works has been published about Hurwitz and Schur polynomials in order to known better their properties. For example it is known that the sets of Hurwitz and Schur polynomials are open and no convex sets. Besides, the set of monic Schur polynomials is contractible. Now we study this set using ideas from differential topology, and we prove that the space of Schur complex polynomials with positive leading coefficient, and the space of Hurwitz complex polynomials which leading coefficient having positive real part, have structure of trivial vector bundle, and each space of (Schur complex and real, Hurwitz complex) polynomials has a differential structure diffeomorphic to some known spaces.
KW - Hurwitz complex polynomials
KW - Schur polynomials
KW - trivial vector bundle
UR - http://www.scopus.com/inward/record.url?scp=84866915411&partnerID=8YFLogxK
U2 - 10.1007/s11518-012-5197-y
DO - 10.1007/s11518-012-5197-y
M3 - Artículo
SN - 1004-3756
VL - 21
SP - 372
EP - 382
JO - Journal of Systems Science and Systems Engineering
JF - Journal of Systems Science and Systems Engineering
IS - 3
ER -