Institutional Repository
| There exists a maximal 3-c.e. enumeration degree | |
| Cooper SB; Li AS; Sorbi A; Yang Ye; Cooper; SB (通讯作者); Univ Leeds; Sch Math; Dept Pure Math; Leeds LS2 9JT; W Yorkshire England | |
| 2003 | |
| Source | Israel Journal of Mathematics
 |
| Volume | 137Issue:*Pages:285-320 |
| Indexed Type | sci |
| Keyword | Density Problem Unsolvability |
| Department | 基础软件国家工程研究中心 |
| Content Type | 期刊论文 |
| URI | http://ir.iscas.ac.cn/handle/311060/3816 |
| Collection | 基础软件国家工程研究中心 |
| Corresponding Author | Cooper; SB (通讯作者); Univ Leeds; Sch Math; Dept Pure Math; Leeds LS2 9JT; W Yorkshire England |
| Recommended Citation GB/T 7714 | Cooper SB,Li AS,Sorbi A,et al. There exists a maximal 3-c.e. enumeration degree[J]. Israel Journal of Mathematics,2003,137(*):285-320. |
| APA | Cooper SB.,Li AS.,Sorbi A.,Yang Ye.,Cooper.,...&W Yorkshire England.(2003).There exists a maximal 3-c.e. enumeration degree.Israel Journal of Mathematics,137(*),285-320. |
| MLA | Cooper SB,et al."There exists a maximal 3-c.e. enumeration degree".Israel Journal of Mathematics 137.*(2003):285-320. |
| Files in This Item: | ||||||
| File Name/Size | DocType | Version | Access | License | ||
| 4.pdf(610KB) | 开放获取 | -- | Application Full Text | |||
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