We found a match
Your institution may have rights to this item. Sign in to continue.
- Title
Classifying codimension two multigerms.
- Authors
Oset Sinha, R.; Ruas, M.; Wik Atique, R.
- Abstract
We generalise the operations of augmentation and concatenations defined in Cooper et al. (Compos Math 131(2):121-160, ) in order to obtain multigerms of analytic (or smooth) maps $$(\mathbb {K}^n,S)\rightarrow (\mathbb {K}^p,0)$$ with $$\mathbb {K}=\mathbb {C}$$ or $$\mathbb {R}$$ from monogerms and some special multigerms. We then prove that any corank 1 codimension 2 multigerm in Mather's nice dimensions $$(n,p)$$ with $$n\ge p-1$$ can be constructed using augmentations and these operations.
- Publication
Mathematische Zeitschrift, 2014, Vol 278, Issue 1/2, p547
- ISSN
0025-5874
- Publication type
Article
- DOI
10.1007/s00209-014-1326-2