Add to ORKGBieberbach groups are torsion free crystallographic groups. In this paper, our focus is on the Bieberbach groups with elementary abelian 2-group point group, 2 2 C C? . The central subgroup of the nonabelian tensor square of a group G is generated by g g ? for all g in G. The purpose of this paper is to compute the central subgroups of the nonabelian tensor squares of two Bieberbach groups with elementary abelian 2 point group of dimension three
Let G be a group. We denote by ν(G) a certain extension of the non-abelian tensor square G⊗G by G×G....
One of the homological functors of a group, is the nonabelian tensor square. It is important in the ...
A crystallographic group is a discrete subgroup of the set of isometries of Euclidean space where th...
Bieberbach groups are torsion free crystallographic groups. In this paper, our focus is on the Biebe...
Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the cen...
The torsion free crystallographic groups are called Bieberbach groups. These groups are extensions o...
A Bieberbach group with point group C2 xC2 is a free torsion crystallographic group. A central sub...
Bieberbach groups are torsion free crystallographic groups. In this paper, our focus is given on the...
The nonabelian tensor square is one of the important homological functors of a group. A Bieberbach g...
The nonabelian tensor product was originated in homotopy theory as well as in algebraic K-theory. Th...
The properties of a group can be explored by computing the homological functors of the group. One of...
A Bieberbach group is a torsion free crystallographic. In this paper, one Bieberbach group with elem...
A crystallographic group is a discrete subgroup G of the set of isometries of Euclidean space ,nE wh...
The exterior square of a group is one of the homological functors which were originated in the homot...
Several homological invariants namely the nonabelian tensor square, the exterior square and the Schu...
Let G be a group. We denote by ν(G) a certain extension of the non-abelian tensor square G⊗G by G×G....
One of the homological functors of a group, is the nonabelian tensor square. It is important in the ...
A crystallographic group is a discrete subgroup of the set of isometries of Euclidean space where th...
Bieberbach groups are torsion free crystallographic groups. In this paper, our focus is on the Biebe...
Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the cen...
The torsion free crystallographic groups are called Bieberbach groups. These groups are extensions o...
A Bieberbach group with point group C2 xC2 is a free torsion crystallographic group. A central sub...
Bieberbach groups are torsion free crystallographic groups. In this paper, our focus is given on the...
The nonabelian tensor square is one of the important homological functors of a group. A Bieberbach g...
The nonabelian tensor product was originated in homotopy theory as well as in algebraic K-theory. Th...
The properties of a group can be explored by computing the homological functors of the group. One of...
A Bieberbach group is a torsion free crystallographic. In this paper, one Bieberbach group with elem...
A crystallographic group is a discrete subgroup G of the set of isometries of Euclidean space ,nE wh...
The exterior square of a group is one of the homological functors which were originated in the homot...
Several homological invariants namely the nonabelian tensor square, the exterior square and the Schu...
Let G be a group. We denote by ν(G) a certain extension of the non-abelian tensor square G⊗G by G×G....
One of the homological functors of a group, is the nonabelian tensor square. It is important in the ...
A crystallographic group is a discrete subgroup of the set of isometries of Euclidean space where th...