TY - JOUR
T1 - LÜROTH’S AND IGUSA’S THEOREMS OVER DIVISION RINGS
AU - Legrand, François
AU - Paran, Elad
N1 - Publisher Copyright:
© 2024, Osaka University. All rights reserved.
PY - 2024/4
Y1 - 2024/4
N2 - Let H be a division ring of finite dimension over its center, let H[T] be the ring of polynomials in a central variable over H, andletH(T) be its quotient skew field. We show that every intermediate division ring between H and H(T) is itself of the form H(f)forsome f in the center of H(T). This generalizes the classical Lüroth’s theorem. More generally, we extend Igusa’s theorem characterizing the transcendence degree 1 subfields of rational function fields, from fields to division rings.
AB - Let H be a division ring of finite dimension over its center, let H[T] be the ring of polynomials in a central variable over H, andletH(T) be its quotient skew field. We show that every intermediate division ring between H and H(T) is itself of the form H(f)forsome f in the center of H(T). This generalizes the classical Lüroth’s theorem. More generally, we extend Igusa’s theorem characterizing the transcendence degree 1 subfields of rational function fields, from fields to division rings.
UR - http://www.scopus.com/inward/record.url?scp=85191234045&partnerID=8YFLogxK
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AN - SCOPUS:85191234045
SN - 0030-6126
VL - 61
SP - 261
EP - 274
JO - Osaka Journal of Mathematics
JF - Osaka Journal of Mathematics
IS - 2
ER -