Supertransversality and $\Pi$-symmetric supermanifolds

Fatemeh Alikhani; Mehdi Ghorbani; Saad Varsaie

arXiv:2211.06680·math.DG·June 30, 2025

Supertransversality and $\Pi$-symmetric supermanifolds

Fatemeh Alikhani, Mehdi Ghorbani, Saad Varsaie

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TL;DR

This paper extends the classical concept of transversality to supergeometry, demonstrating stability and genericity properties in supermanifolds, and explores transversality within $\

Contribution

It introduces supertransversality, proves its stability and genericity, and applies it to $\

Findings

01

Supertransversality is stable in smooth supermanifolds.

02

Sard's theorem extension proves genericity in supergeometry.

03

Transversality in $\

Abstract

The main objective of this article is to extend the concept of transversality to supergeometry. Transversality has two important properties in the classical case, namely " stability" and " genericity", which we show in the following that in the category of smooth supermanifolds, supertransversality has stable property. By extending Sard's theorem to supergeometry, genericity property is proved. In the final section, we examine transversality in the category of $Π$ -symmetric supermanifolds. The theory presented here is a step towards an extension of the concept of Euler-Poincar\'e characteristic to supermanifolds.

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Taxonomy

TopicsAdvanced Topics in Algebra · Algebraic structures and combinatorial models · Advanced Combinatorial Mathematics