论文信息 - Functional Space Consisted by Continuous Functions on Topological Space

Functional Space Consisted by Continuous Functions on Topological Space

Summary In this article, using the Mizar system [1], [2], first we give a definition of a functional space which is constructed from all continuous functions defined on a compact topological space [5]. We prove that this functional space is a Banach space [3]. Next, we give a definition of a function space which is constructed from all continuous functions with bounded support. We also prove that this function space is a normed space.

Yasunari Shidama | Keiichi Miyajima | Hiroshi Yamazaki

[1] Yasunari Shidama,et al. The Continuous Functions on Normed Linear Spaces , 2004 .

[2] Hiroshi Yamazaki. Functional Sequence in Norm Space , 2020, Formaliz. Math..

[3] Adam Naumowicz,et al. The Role of the Mizar Mathematical Library for Interactive Proof Development in Mizar , 2017, Journal of Automated Reasoning.

[4] Adam Naumowicz,et al. Mizar: State-of-the-art and Beyond , 2015, CICM.

[5] Yasumasa Suzuki,et al. Banach Space of Bounded Real Sequences , 2004 .