Abstract
AbstractBifurcation theory provides a very general means to classify the local changes in numbers of zeros of vector fields, but not a general means to find where a given bifurcation occurs, at least at higher codimensions. Instead, it turns out, these bifurcations can be found by looking for their underlying catastrophes. Here I show that the concept of underlying catastrophes can be extended to the umbilics. The umbilics are important in opening up qualitatively different forms of bifurcations beyond the ‘corank 1’ catastrophes of folds, cusps, swallowtails, etc. An example is given showing how four zeros of a vector field bifurcating from a single point, may do so either via a 3-parameter swallowtail catastrophe involving equilibria of similar stabilities, or via a 4-parameter umbilic catastrophe involving equilibria of opposing stabilities. This opens an avenue to studying spatiotemporal pattern formation around high codimension bifurcation points, and I conclude with some illustrative examples.
Publisher
Springer Science and Business Media LLC
Reference36 articles.
1. Al Saadi, F.A., Champneys, A.R., Jeffrey, M.R.: Wave-pinned patterns for cell polarity—a catastrophe theory explanation (2022) (in review)
2. Arnold, V.I., Afrajmovich, V.S., Il’yashenko, Y.S., Shil’nikov, L.P.: Dynamical Systems V: Bifurcation Theory and Catastrophe Theory. Encyclopedia of Mathematical Sciences. Springer, Berlin (1994)
3. Arnold, V.I., Goryunov, V.V., Lyashko, O.V., Vasiliev, V.A.: Dynamical Systems VIII: Singularity Theory I. Classification and Applications, Volume 39 of Encyclopedia of Mathematical Sciences. Springer, Berlin (1993)
4. Boardman, J.M.: Singularities of differentiable maps. Publications mathématiques de l’IHÉS 33, 21–57 (1967)
5. Callahan, J.: Bifurcation geometry of $$e_6$$. Math. Model. 1, 283–309 (1980)
Cited by
1 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献