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- Title
Quaternionic Hermitian spinor systems and compatibility conditions.
- Authors
Damiano, Alberto; Eelbode, David; Sabadini, Irene
- Abstract
In this paper we show that the systems introduced in [[Eelbode, Adv. Appl. Clifford Algebr. 17: 635--649, 2007]] and [[Peñña-Peñña, Sabadini, Sommen, Complex Anal. Oper. Theory 1: 97--113, 2007]] are equivalent, both giving the notion of quaternionic Hermitian monogenic functions. This makes it possible to prove that the free resolution associated to the system is linear in any dimension, and that the first cohomology module is nontrivial, thus generalizing the results in [[Peñña-Peñña, Sabadini, Sommen, Complex Anal. Oper. Theory 1: 97--113, 2007]]. Furthermore, exploiting the decomposition of the spinor space into ( m)-irreducibles, we find a certain number of ''algebraic'' compatibility conditions for the system, suggesting that the usual spinor reduction is not applicable.
- Subjects
HERMITIAN operators; SPINOR analysis; DIMENSIONAL analysis; ALGEBRA; HOMOLOGY theory; MATHEMATICAL decomposition; GEOMETRY
- Publication
Advances in Geometry, 2011, Vol 11, Issue 1, p169
- ISSN
1615-715X
- Publication type
Article
- DOI
10.1515/ADVGEOM.2010.045