Article
Full entry |
PDF
(0.3 MB)
Feedback
PDF
(0.3 MB)
Feedback
Keywords:
invariant operator; AHS structure; paraconformal structure; almost Grassmannian structure; translation principle
invariant operator; AHS structure; paraconformal structure; almost Grassmannian structure; translation principle
Summary:
References:
[1] Bailey, T. N.; Eastwood, M. G.: Complex paraconformal manifolds: their differential geometry and twistor theory. Forum Math. 3 (1991), 61–103. MR 1085595
[2] Bailey, T. N.; Eastwood, M. G.; Gover, A. R.: Thomas’s structure bundle for conformal, projective and related structures. Rocky Mountain J. 24 (1994), 1191–1217. MR 1322223
[3] Baston, R. J.: Verma modules and differential conformal invariants. J. Differential Geometry 32 (1990), 851–898. MR 1078164 | Zbl 0732.53011
[4] Baston, R. J.; Eastwood, M. G.: The Penrose Transform: Its Interaction with Representation Theory. Oxford University Press, 1989. MR 1038279
[5] Čap, A.: A note on endomorphisms of modules over reductive Lie groups and algebras. Proceedings of the Conference Differential Geometry and Applications, Brno, 1995, pp. 127–131, electronically available at www.emis.de.
[CSS1] Čap, A.; Slovák, J.; Souček, V.: Invariant operators on manifolds with almost hermitian symmetric structures, I. invariant differentiation. Preprint ESI 186 (1994), electronically available at www.esi.ac.at. MR 1474550
[CSS2] Čap, A.; Slovák, J.; Souček, V.: Invariant operators on manifolds with almost hermitian symmetric structures, II. normal Cartan connections. Preprint ESI 194 (1995), electronically available at www.esi.ac.at. MR 1620484
[8] Eastwood, M. G.: Notes on conformal differential geometry. to appear in Rendiconti Circ. Mat. Palermo, Proceedings of the 15th Winter School on Geometry an Physics, Srní, 1995. MR 1463509 | Zbl 0911.53020
[9] Eastwood, M. G.; Rice, J. W.: Conformally invariant differential operators on Minkowski space and their curved analogues. Commun. Math. Phys. 109 (1987), 207–228. MR 0880414
[10] Eastwood, M. G.; Slovák, J.: Semiholonomic Verma modules. Preprint ESI 376 (1996), electronically available at www.esi.ac.at. MR 1483772
[11] Ehresmann, C.: Extension du calcul des jets aux jets non holonomes. C. R. Acad. Sci. Paris 239 (1954), 1762–1764. MR 0066734 | Zbl 0057.15603
[12] Ochiai, T.: Geometry associated with semisimple flat homogeneous spaces. Trans. Amer. Math. Soc. 152 (1970), 159–193. MR 0284936 | Zbl 0205.26004
Search
Partner of
