Zobrazeno 1 - 10
of 375
pro vyhledávání: '"Zvonimir Janko"'
Autor:
Yakov G. Berkovich, Zvonimir Janko
This is the sixth volume of a comprehensive and elementary treatment of finite group theory. This volume contains many hundreds of original exercises (including solutions for the more difficult ones) and an extended list of about 1000 open problems.
Autor:
Yakov G. Berkovich, Zvonimir Janko
This is the fifth volume of a comprehensive and elementary treatment of finite p-group theory. Topics covered in this volume include theory of linear algebras and Lie algebras. The book contains many dozens of original exercises (with difficult exerc
Autor:
Yakov G. Berkovich, Zvonimir Janko
This is the fourth volume of a comprehensive and elementary treatment of finite p-group theory. As in the previous volumes, minimal nonabelian p-groups play an important role. Topics covered in this volume include: subgroup structure of metacyclic p-
Autor:
Yakov Berkovich, Zvonimir Janko
This is the third volume of a comprehensive and elementary treatment of finite p-group theory. Topics covered in this volume: impact of minimal nonabelian subgroups on the structure of p-groups, classification of groups all of whose nonnormal subgrou
Autor:
Yakov Berkovich, Zvonimir Janko
This is the second of three volumes devoted to elementary finite p-group theory. Similar to the first volume, hundreds of important results are analyzed and, in many cases, simplified. Important topics presented in this monograph include: (a) classif
Autor:
Zvonimir Janko
Publikováno v:
Glasnik Matematicki. 52:99-105
Autor:
Zvonimir Janko
Publikováno v:
Journal of Algebra. 465:41-61
We say that a subgroup H is isolated in a group G if for each x ∈ G we have either x ∈ H or 〈 x 〉 ∩ H = { 1 } . Here we shall determine certain classes of finite nonabelian p-groups which possess some isolated subgroups ( Theorem 1 , Theore
Autor:
Zvonimir Janko, Yakov Berkovich
Publikováno v:
Glasnik matematički
Volume 54
Issue 1
Volume 54
Issue 1
Below we state a great number of research problems concerning finite p-groups. This list is a continuation of the six lists in [1, 2, 3, 4, 5, 6]. Below we also stated some new theorems with proofs. For explanation of notation see the beginning of th
Autor:
Zvonimir Janko
Publikováno v:
Glasnik matematički
Volume 51
Issue 1
Volume 51
Issue 1
Here we classify finite non-Dedekindian p-groups which are not generated by their non-normal subgroups. (Theorem 1).