Eisenbud–Levine–Khimshiashvili signature formula

In mathematics, and especially differential topology and singularity theory, the Eisenbud–Levine–Khimshiashvili signature formula gives a way of computing the Poincaré–Hopf index of a real, analytic vector field at an algebraically isolated singularity. It is named after David Eisenbud, Harold I. Levine, and George Khimshiashvili. Intuitively, the index of a vector field near a zero is the number of times the vector field wraps around the sphere. Because analytic vector fields have a rich algebraic structure, the techniques of commutative algebra can be brought to bear to compute their index. The signature formula expresses the index of an analytic vector field in terms of the signature of a certain quadratic form.

Nomenclature

Consider the ''n''-dimensional space R^''n''. Assume that R^''n'' has some fixed coordinate system, and write x for a point in R^''n'', where

Let ''X'' be a vector field on R^''n''. For there exist functions such that one may express ''X'' as
:$X = f_1()\,\frac + \cdots + f_n()\,\frac .$

To say that ''X'' is an ''analytic vector field'' means that each of the functions is an analytic function. One says that ''X'' is ''singular'' at a point p in R^''n'' (or that p is a ''singular point'' of ''X'') if , i.e. ''X'' vanishes at p. In terms of the functions it means that for all . A singular point p of ''X'' is called ''isolated'' (or that p is an ''isolated singularity'' of ''X'') if and there exists an open neighbourhood , containing p, such that for all q in ''U'', different from p. An isolated singularity of ''X'' is called algebraically isolated if, when considered over the complex domain, it remains isolated.

Since the Poincaré–Hopf index ''at a point'' is a purely local invariant (cf. Poincaré–Hopf theorem), one may restrict one's study to that of germs. Assume that each of the ƒ_''k'' from above are ''function germs'', i.e. In turn, one may call ''X'' a ''vector field germ''.

Construction

Let ''A''_''n'',0 denote the ring of analytic function germs . Assume that ''X'' is a vector field germ of the form
:$X = f_1()\,\frac + \cdots + f_n()\,\frac$
with an algebraically isolated singularity at 0. Where, as mentioned above, each of the Æ’_''k'' are function germs . Denote by ''I_X'' the ideal generated by the Æ’_''k'', i.e. Then one considers the local algebra, ''B_X'', given by the quotient
:$B_X := A_ / I_X \, .$

The Eisenbud–Levine–Khimshiashvili signature formula states that the index of the vector field ''X'' at 0 is given by the signature of a certain non-degenerate bilinear form (to be defined below) on the local algebra ''B_X''.

The dimension of $B_X$ is finite if and only if the complexification of ''X'' has an isolated singularity at 0 in C^''n''; i.e. ''X'' has an algebraically isolated singularity at 0 in R^''n''. In this case, ''B_X'' will be a finite-dimensional, real algebra.

Definition of the bilinear form

Using the analytic components of ''X'', one defines another analytic germ given by
:$F() := (f_1(), \ldots, f_n()) ,$
for all . Let denote the determinant of the Jacobian matrix of ''F'' with respect to the basis Finally, let denote the equivalence class of J_''F'', modulo ''I_X''. Using ∗ to denote multiplication in ''B_X'' one is able to define a non-degenerate bilinear form β as follows:
:$\beta : B_X \times B_X \stackrel B_X \stackrel \R; \ \ \beta(g,h) = \ell(g*h) ,$

where $\scriptstyle \ell$ is ''any'' linear function such that
: \ell \left( \left J_F \right\right) > 0 .
As mentioned: the signature of β is exactly the index of ''X'' at 0.

Example

Consider the case of a vector field on the plane. Consider the case where ''X'' is given by
:$X := (x^3 - 3xy^2) \, \frac + (3x^2y - y^3) \, \frac .$
Clearly ''X'' has an algebraically isolated singularity at 0 since if and only if The ideal ''I_X'' is given by and

:$B_X = A_ / (x^3 - 3xy^2, 3x^2y - y^3) \cong \R\langle 1, x, y, x^2, xy, y^2, xy^2, y^3, y^4 \rangle .$

The first step for finding the non-degenerate, bilinear form β is to calculate the multiplication table of ''B_X''; reducing each entry modulo ''I_X''. Whence

Direct calculation shows that , and so Next one assigns values for $\scriptstyle \ell$. One may take
:$\ell(1) = \ell(x) = \ell(y) = \ell(x^2) = \ell(xy) = \ell(y^2) = \ell(xy^2) = \ell(y^3) = 0, \ \text \ \ell(y^4) = 3 .$
This choice was made so that \scriptstyle \ell\left( \left J_F \right\right) \, > \, 0 as was required by the hypothesis, and to make the calculations involve integers, as opposed to fractions. Applying this to the multiplication table gives the matrix representation of the bilinear form β with respect to the given basis:
$\left[ \begin 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 3 \\ 0 & 0 & 0 & 0 & 0 & 0 & 1 & 0 & 0 \\ 0 & 0 & 0 & 0 & 0 & 0 & 0 & 3 & 0 \\ 0 & 0 & 0 & 3 & 0 & 1 & 0 & 0 & 0 \\ 0 & 0 & 0 & 0 & 1 & 0 & 0 & 0 & 0 \\ 0 & 0 & 0 & 1 & 0 & 3 & 0 & 0 & 0 \\ 0 & 1 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \\ 0 & 0 & 3 & 0 & 0 & 0 & 0 & 0 & 0 \\ 3 & 0 & 0 & 0 & 0 & 0 & 0 & 0 & 0 \\ \end \right]$
The eigenvalues of this matrix are There are 3 negative eigenvalues (), and six positive eigenvalues (); meaning that the signature of β is . It follows that ''X'' has Poincaré–Hopf index +3 at the origin.

Topological verification

With this particular choice of ''X'' it is possible to verify the Poincaré–Hopf index is +3 by a direct application of the definition of Poincaré–Hopf index. This is very rarely the case, and was the reason for the choice of example. If one takes polar coordinates on the plane, i.e. and then and Restrict ''X'' to a circle, centre 0, radius , denoted by ''C''_0,ε; and consider the map given by
:$G\colon X \longmapsto \frac .$
The Poincaré–Hopf index of ''X'' is, by definition, the topological degree of the map ''G''. Restricting ''X'' to the circle ''C''_0,ε, for arbitrarily small ε, gives
:$G(\theta) = (\cos(3\theta),\sin(3\theta)) , \,$
meaning that as θ makes one rotation about the circle ''C''_0,ε in an anti-clockwise direction; the image ''G''(θ) makes three complete, anti-clockwise rotations about the unit circle ''C''_0,1. Meaning that the topological degree of ''G'' is +3 and that the Poincaré–Hopf index of ''X'' at 0 is +3.

References

{{DEFAULTSORT:Eisenbud-Levine-Khimshiashvili signature formula
Theorems in differential topology
Singularity theory