Tangent spaces of diffeological spaces and their variants

Masaki Taho
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Abstract

Several methods have been proposed to define tangent spaces for diffeological spaces. Among them, the internal tangent functor is obtained as the left Kan extension of the tangent functor for manifolds. However, the right Kan extension of the same functor has not been well-studied. In this paper, we investigate the relationship between this right Kan extension and the external tangent space, another type of tangent space for diffeological spaces. We prove that by slightly modifying the inclusion functor used in the right Kan extension, we obtain a right tangent space functor, which is almost isomorphic to the external tangent space. Furthermore, we show that when a diffeological space satisfies a favorable property called smoothly regular, this right tangent space coincides with the right Kan extension mentioned earlier.
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差分空间的切线空间及其变体
人们提出了几种方法来定义差分空间的切空间。其中,内切函子是作为流形的切函子的左 Kanextension 而得到的。然而,同一函子的右 Kanextension 还没有得到很好的研究。在本文中,我们研究了这个右坎扩展与外切空间(衍空间的另一种切空间)之间的关系。我们证明,通过稍微修改右坎扩展中使用的包含函子,我们得到了一个右切空间函子,它与外切空间几乎同构。此外,我们还证明了当差分空间满足一种称为平滑正则的有利性质时,这个右切空间与前面提到的右坎扩展重合。
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