Article · Wikipedia archive · Last revised Jul 5, 2026

Equisingularity

In algebraic geometry, an equisingularity is, roughly, a family of singularities that are not non-equivalent and is an important notion in singularity theory. There is no universal definition of equisingularity but Oscar Zariski's equisingularity is the most famous one. Zariski's equisingualrity, introduced in 1971 under the name " algebro-geometric equisingularity", gives a stratification that is different from the usual Whitney stratification on a real or complex algebraic variety.

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In algebraic geometry, an equisingularity is, roughly, a family of singularities that are not non-equivalent and is an important notion in singularity theory. There is no universal definition of equisingularity but Oscar Zariski's equisingularity is the most famous one. Zariski's equisingualrity, introduced in 1971 under the name " algebro-geometric equisingularity",1 gives a stratification that is different from the usual Whitney stratification on a real or complex algebraic variety.2

See also

See also

References

References

  1. O. Zariski, Some open questions in the theory of singularities, Bull. Amer. Math. Soc., 77 (1971), pp. 481–491.
  2. Parusiński 2020

Parusiński, Adam (2020). "Algebro-geometric equisingularity of Zariski". arXiv:2010.08927 [math.AG].

Further reading

Further reading