English

Polynomial and horizontally polynomial functions on Lie groups

Group Theory 2020-11-30 v1 Differential Geometry Functional Analysis Metric Geometry

Abstract

We generalize both the notion of polynomial functions on Lie groups and the notion of horizontally affine maps on Carnot groups. We fix a subset SS of the algebra g\mathfrak g of left-invariant vector fields on a Lie group G\mathbb G and we assume that SS Lie generates g\mathfrak g. We say that a function f:GRf:\mathbb G\to \mathbb R (or more generally a distribution on G\mathbb G) is SS-polynomial if for all XSX\in S there exists kNk\in \mathbb N such that the iterated derivative XkfX^k f is zero in the sense of distributions. First, we show that all SS-polynomial functions (as well as distributions) are represented by analytic functions and, if the exponent kk in the previous definition is independent on XSX\in S, they form a finite-dimensional vector space. Second, if G\mathbb G is connected and nilpotent we show that SS-polynomial functions are polynomial functions in the sense of Leibman. The same result may not be true for non-nilpotent groups. Finally, we show that in connected nilpotent Lie groups, being polynomial in the sense of Leibman, being a polynomial in exponential chart, and the vanishing of mixed derivatives of some fixed degree along directions of g\mathfrak g are equivalent notions.

Keywords

Cite

@article{arxiv.2011.13665,
  title  = {Polynomial and horizontally polynomial functions on Lie groups},
  author = {Gioacchino Antonelli and Enrico Le Donne},
  journal= {arXiv preprint arXiv:2011.13665},
  year   = {2020}
}

Comments

33 pages

R2 v1 2026-06-23T20:32:57.018Z