An estimate for surface measure of small balls in Carnot groups

Pub Date : 2020-04-01 DOI:10.18910/75920
A. Rudenko
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Abstract

We introduce a family of quasidistances in ${\mathbb R}^d$, such that some of them are equivalent to natural distances on Carnot groups. We find the sufficient conditions for the balls w.r.t. a quasidistance from our family to be comparable to ellipsoids. Using comparability to ellipsoids we find asymptotics of surface measure of intersections of small balls with linear submanifolds and the conditions for finiteness of the integral w.r.t. the surface measure of negative power of the distance. We provide several examples of Carnot groups, where comparability to ellipsoids can be shown for natural distances, and therefore we can study the asymptotics and finitness of the integrals explicitly. We also show an example of a Carnot group, where the comparability to ellipsoids does not hold.
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卡诺群中小球表面测度的估计
我们在${\mathbb R}^d$中引入了一个拟距离族,使得其中一些拟距离等价于卡诺群上的自然距离。我们发现了球w.r.t.与我们族的拟距离与椭球相当的充分条件。利用与椭球的可比性,我们得到了小球与线性子流形相交的表面测度的渐近性,以及积分相对于距离负幂的表面测度有限性的条件。我们提供了卡诺群的几个例子,其中自然距离可以显示出与椭球的可比性,因此我们可以明确地研究积分的渐近性和有限性。我们还展示了卡诺群的一个例子,其中与椭球体的可比性不成立。
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