Groups of order 395
This article gives information about, and links to more details on, groups of order 395
See pages on algebraic structures of order 395 | See pages on groups of a particular order
This article gives basic information comparing and contrasting groups of order 395. See also more detailed information on specific subtopics through the links:
| Information type | Page summarizing information for groups of order 395 |
|---|---|
| element structure (element orders, conjugacy classes, etc.) | element structure of groups of order 395 |
| subgroup structure | subgroup structure of groups of order 395 |
| linear representation theory | linear representation theory of groups of order 395 projective representation theory of groups of order 395 modular representation theory of groups of order 395 |
| endomorphism structure, automorphism structure | endomorphism structure of groups of order 395 |
| group cohomology | group cohomology of groups of order 395 |
Statistics at a glance
| Quantity | Value | Explanation |
|---|---|---|
| Total number of groups | 1 | See classification of cyclicity-forcing numbers |
| Number of abelian groups | 1 | only one group |
| Number of simple groups | 0 | cyclic group of composite order |
| Number of nilpotent groups | 1 | See number of nilpotent groups equals product of number of groups of order each maximal prime power divisor, which in turn follows from equivalence of definitions of finite nilpotent group. |
There is, up to isomorphism, a unique group of order , namely cyclic group:Z395. That is, is a cyclicity-forcing number.
