KOLÁŘ, Martin, Ilya KOSSOVSKIY and Dmitri ZAITSEV. Normal forms in Cauchy-Riemann geometry. In Berhanu, S; Mir, N; Straube, EJ. ANALYSIS AND GEOMETRY IN SEVERAL COMPLEX VARIABLES. 681st ed. PROVIDENCE: AMER MATHEMATICAL SOC, 2017, p. 153-177. ISBN 978-1-4704-2255-4. Available from: https://dx.doi.org/10.1090/conm/681/13685. |
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@inproceedings{1409647, author = {Kolář, Martin and Kossovskiy, Ilya and Zaitsev, Dmitri}, address = {PROVIDENCE}, booktitle = {ANALYSIS AND GEOMETRY IN SEVERAL COMPLEX VARIABLES}, doi = {http://dx.doi.org/10.1090/conm/681/13685}, edition = {681}, editor = {Berhanu, S; Mir, N; Straube, EJ}, keywords = {Real hypersurfaces; finite type; polynomial models; CR manifolds; Automorphisms;}, howpublished = {tištěná verze "print"}, language = {eng}, location = {PROVIDENCE}, isbn = {978-1-4704-2255-4}, pages = {153-177}, publisher = {AMER MATHEMATICAL SOC}, title = {Normal forms in Cauchy-Riemann geometry}, year = {2017} }
TY - JOUR ID - 1409647 AU - Kolář, Martin - Kossovskiy, Ilya - Zaitsev, Dmitri PY - 2017 TI - Normal forms in Cauchy-Riemann geometry PB - AMER MATHEMATICAL SOC CY - PROVIDENCE SN - 9781470422554 KW - Real hypersurfaces KW - finite type KW - polynomial models KW - CR manifolds KW - Automorphisms; N2 - One of effective ways to solve the equivalence problem and describe moduli spaces for real submanifolds in complex space is the normal form approach. In this survey, we outline some normal form constructions in CR-geometry and formulate a number of open problems. ER -
KOLÁŘ, Martin, Ilya KOSSOVSKIY and Dmitri ZAITSEV. Normal forms in Cauchy-Riemann geometry. In Berhanu, S; Mir, N; Straube, EJ. \textit{ANALYSIS AND GEOMETRY IN SEVERAL COMPLEX VARIABLES}. 681st ed. PROVIDENCE: AMER MATHEMATICAL SOC, 2017, p.~153-177. ISBN~978-1-4704-2255-4. Available from: https://dx.doi.org/10.1090/conm/681/13685.
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