Singular point, index of a

One of the basic characteristics of an isolated singular point of a vector field. Let a vector field $ X $ be defined on $ \mathbf R ^ {n} $, and let $ Q $ be a sphere of small radius surrounding a singular point $ x _ {0} $ such that $ X \mid _ {Q} \neq 0 $. The degree of the mapping (cf. Degree of a mapping)

$$ f: Q \rightarrow S ^ {n-1} ,\ \ f( x) = X \frac{(z)}{\| X( x) \| }

,

$$

is then called the index, $ \mathop{\rm ind} _ {x _ {0} } ( X) $, of the singular point $ x _ {0} $ of the vector field $ X $, i.e.

$$

\mathop{\rm ind} _ {x _ {0}  } ( X)  =   \mathop{\rm deg}  f _ {x _ {0}  } .

$$

If $ x _ {0} $ is non-degenerate, then

$$

\mathop{\rm ind} _ {x _ {0}  } ( X)  =   \mathop{\rm sign}   \mathop{\rm det}  \left \|

\frac{\partial X ^ {j} }{\partial x ^ {i} }

\right \| .

$$

See also Poincaré theorem; Rotation of a vector field.

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