梯度李群作用的舒宾计算

Eske Ewert, Philipp Schmitt
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引用次数: 0

摘要

在这篇文章中,我们使用与 van Erp 和 Yuncken 类似的类群方法,在某些非紧凑空间上建立了舒宾型伪微分算子的微积分。更具体地说,我们考虑了分级李群在分级向量空间上的作用,并研究了泛化基本向量场和多项式乘法的伪微分算子。在这种微积分中,我们的椭圆算子的双域例子是具有势的罗克兰算子和罗滕斯泰纳-鲁赞斯基对海森堡群的谐振子的泛化。我们对有级群的作用进行变形,定义了一个切线群,它将伪微分算子与其主(共)符号连接起来。我们证明,我们的算子构成了一个渐近完备的微积分。微积分中的椭圆元素具有参数,是次椭圆的,可以用洛克兰条件来描述。此外,我们还研究了我们的算子在索波列夫空间上的映射性质和谱,并将我们的微积分与 $\mathbb R^n$ 上的舒宾微积分及其各向异性广义进行了比较。
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Shubin calculi for actions of graded Lie groups
In this article, we develop a calculus of Shubin type pseudodifferential operators on certain non-compact spaces, using a groupoid approach similar to the one of van Erp and Yuncken. More concretely, we consider actions of graded Lie groups on graded vector spaces and study pseudodifferential operators that generalize fundamental vector fields and multiplication by polynomials. Our two main examples of elliptic operators in this calculus are Rockland operators with a potential and the generalizations of the harmonic oscillator to the Heisenberg group due to Rottensteiner-Ruzhansky. Deforming the action of the graded group, we define a tangent groupoid which connects pseudodifferential operators to their principal (co)symbols. We show that our operators form a calculus that is asymptotically complete. Elliptic elements in the calculus have parametrices, are hypoelliptic, and can be characterized in terms of a Rockland condition. Moreover, we study the mapping properties as well as the spectra of our operators on Sobolev spaces and compare our calculus to the Shubin calculus on $\mathbb R^n$ and its anisotropic generalizations.
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