Catastrophe conditions for vector fields in $\mathbb R^n$
Abstract: Practical conditions are given here for finding and classifying high codimension intersection points of $n$ hypersurfaces in $n$ dimensions. By interpreting those hypersurfaces as the nullclines of a vector field in $\mathbb Rn$, we broaden the concept of Thom's catastrophes to find bifurcation points of (non-gradient) vector fields of any dimension. We introduce a family of determinants ${B}_j$, such that a codimension $r$ bifurcation point is found by solving the system ${B}_1=...={B}_r=0$, subject to certain non-degeneracy conditions. The determinants ${B}_j$ generalize the derivatives $\frac{\partialj\;}{\partial xj}F(x)$ that vanish at a catastrophe of a scalar function $F(x)$. We do not extend catastrophe theory or singularity theory themselves, but provide a means to apply them more readily to the multi-dimensional dynamical models that appear, for example, in the study of various engineered or living systems. For illustration we apply our conditions to locate butterfly and star catastrophes in a second order PDE.
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