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引用次数: 0
摘要
我们研究了泊松括号不变量,它衡量了封闭交映曲面上光滑统一体分割的泊松不共通性水平。受波尔特罗维奇[P3]的一般猜想的启发,并以布霍夫斯基-坦尼[BT]的初步工作为基础,我们证明,对于从属于由面积至多为 c 的圆盘构成的开放盖的任何光滑统一分割,并且在表面为球面时盖的某些局部化条件下,那么泊松括号不变量与 c 的乘积自下而上由一个普遍常数限定。布霍夫斯基-洛古诺夫-坦尼[BLT]最近针对由所有封闭表面上的可位移集组成的开遮得到了类似的结果,而他们的方法被石鲁[SL]扩展到了由不可位移圆盘组成的开遮。我们研究了所有这些结果的尖锐性。
We study the Poisson bracket invariant, which measures the level of Poisson noncommutativity of a smooth partition of unity, on closed symplectic surfaces. Motivated by a general conjecture of Polterovich [P3] and building on preliminary work of Buhovsky–Tanny [BT], we prove that for any smooth partition of unity subordinate to an open cover by discs of area at most c, and under some localization condition on the cover when the surface is a sphere, then the product of the Poisson bracket invariant with c is bounded from below by a universal constant. Similar results were obtained recently by Buhovsky–Logunov–Tanny [BLT] for open covers consisting of displaceable sets on all closed surfaces, and their approach was extended by Shi–Lu [SL] to open covers by nondisplaceable discs. We investigate the sharpness of all these results.
期刊介绍:
The Israel Journal of Mathematics is an international journal publishing high-quality original research papers in a wide spectrum of pure and applied mathematics. The prestigious interdisciplinary editorial board reflects the diversity of subjects covered in this journal, including set theory, model theory, algebra, group theory, number theory, analysis, functional analysis, ergodic theory, algebraic topology, geometry, combinatorics, theoretical computer science, mathematical physics, and applied mathematics.
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