Symmetries of 3-webs around a point
Abstract: Let W be a planar 3-web defined on a neighborhood of a point M. We call "symmetry of W around M" any local diffeomorphism which fixes M and maps each foliation of W to a (not necessarily the same) foliation of W. We say that it is a simple symmetry if it respects each foliation, a mirror symmetry if its respects one foliation and permutes the two other and a circular symmetry if it permutes circularly the three foliations. Hexagonal (i.e. flat) planar 3-webs have always the three types of symmetry. We study here the non-flat case. We give a classification of 3-webs which admits simple or mirror symmetries. We give a method to build all the 3-webs with a circular symmetry and we exhibit a precise non-flat example.
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