TY - JOUR

T1 - Pseudodifferential operators on filtered manifolds as generalized fixed points

AU - Ewert, Eske

PY - 2023

Y1 - 2023

N2 - On filtered manifolds one can define a different notion of order for the differential operators. In this paper, we use generalized fixed point algebras to construct a pseudodifferential extension that reflects this behaviour. In the corresponding calculus, the principal symbol of an operator is a family of operators acting on certain nilpotent Lie groups. The role of ellipticity as a Fredholm condition is replaced by the Rockland condition on these groups. Our approach allows to understand this in terms of the representations of the corresponding algebra of principal symbols. Moreover, we compute the K-theory of this algebra.

AB - On filtered manifolds one can define a different notion of order for the differential operators. In this paper, we use generalized fixed point algebras to construct a pseudodifferential extension that reflects this behaviour. In the corresponding calculus, the principal symbol of an operator is a family of operators acting on certain nilpotent Lie groups. The role of ellipticity as a Fredholm condition is replaced by the Rockland condition on these groups. Our approach allows to understand this in terms of the representations of the corresponding algebra of principal symbols. Moreover, we compute the K-theory of this algebra.

KW - filtered manifolds

KW - generalized fixed point algebras

KW - index theory

KW - Pseudodifferential calculus

KW - Rockland condition

KW - tangent groupoid

UR - http://www.scopus.com/inward/record.url?scp=85151085384&partnerID=8YFLogxK

U2 - 10.4171/JNCG/502

DO - 10.4171/JNCG/502

M3 - Article

AN - SCOPUS:85151085384

VL - 17

SP - 333

EP - 383

JO - Journal of noncommutative geometry

JF - Journal of noncommutative geometry

SN - 1661-6952

IS - 1

ER -