真实的和复杂的刺猬,它们的辛面积,曲率和进化

Pub Date : 2020-09-24 DOI:10.4310/jsg.2021.v19.n3.a3
Yves Martinez-Maure
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引用次数: 2

摘要

经典(实)刺猬可以看作是R n+1中凸体的形式差分的几何实现。像凸体一样,刺猬可以通过它们的支撑功能来识别。采用射影的观点,证明了任意全纯函数h: c_n !C可以看作是C n+1中复hedgehog基因H H的“支持函数”。同样,我们在c2中引入了这样一个刺猬H H的演化曲线的概念,以及一个自然的(但显然迄今未知的)复曲率的概念,这使我们能够将这个演化曲线解释为复曲率中心的轨迹。当然,我们可以认为发展“复杂刺猬的布伦-闵可夫斯基理论”(用辛体积代替欧几里得体积)可能是一种很有前途的研究方式。我们在这个方向上给出。接下来,我们回到具有线性复杂结构的r2n中的真实刺猬。我们引入并研究了刺猬进化的概念。我们特别关注具有由纯单位四元数基准决定的线性Kahler结构的r4。同时,研究了hedgehog参数化条件下Hopf圆定向图像的辛面积,并引入了该图像的四元数曲率函数。最后,我们考虑了刺猬的卷积,并将刺猬在r4n中的特殊情况视为超kahler向量空间。
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Real and complex hedgehogs, their symplectic area, curvature and evolutes
Classical (real) hedgehogs can be regarded as the geometrical realiza-tions of formal di¤erences of convex bodies in R n+1. Like convex bodies, hedgehogs can be identi…ed with their support functions. Adopting a pro-jective viewpoint, we prove that any holomorphic function h : C n ! C can be regarded as the 'support function' of a complex hedgehog H h in C n+1. In the same vein, we introduce the notion of evolute of such a hedgehog H h in C 2 , and a natural (but apparently hitherto unknown) notion of complex curvature, which allows us to interpret this evolute as the locus of the centers of complex curvature. It is of course permissible to think that the development of a 'Brunn-Minkowski theory for complex hedgehogs' (replacing Euclidean volumes by symplectic ones) might be a promising way of research. We give …rst two results in this direction. We next return to real hedgehogs in R 2n endowed with a linear complex structure. We introduce and study the notion of evolute of a hedgehog. We particularly focus our attention on R 4 endowed with a linear Kahler structure determined by the datum of a pure unit quaternion. In parallel, we study the symplectic area of the images of the oriented Hopf circles under hedgehog parametrizations and introduce a quaternionic curvature function for such an image. Finally, we consider brie ‡y the convolution of hedgehogs, and the particular case of hedgehogs in R 4n regarded as a hyperkahler vector space.
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