The following pages link to The Group is a CI-Group (Q3646334):
Displaying 22 items.
- On isomorphisms of vertex-transitive graphs (Q281629) (← links)
- On the Cayley isomorphism problem for Cayley objects of nilpotent groups of some orders (Q405288) (← links)
- Further restrictions on the structure of finite DCI-groups: an addendum (Q902949) (← links)
- On the isomorphism problem for Cayley graphs of abelian groups whose Sylow subgroups are elementary abelian or cyclic (Q1648657) (← links)
- Some new groups which are not CI-groups with respect to graphs (Q1700767) (← links)
- Elementary proofs that \(Z_p^2\) and \(Z_p^3\) are CI-groups (Q1817587) (← links)
- The Cayley isomorphism property for \(\mathbb{Z}_p^3\times\mathbb{Z}_q\) (Q2031617) (← links)
- The group \(C_p^4 \times C_q\) is a DCI-group (Q2065876) (← links)
- Normal Cayley digraphs of generalized quaternion groups with CI-property (Q2113682) (← links)
- Cyclic groups are CI-groups for balanced configurations (Q2416931) (← links)
- Elementary abelian \(p\)-groups of rank greater than or equal to \(4p-2\) are not CI-groups. (Q2458252) (← links)
- CI-property of \(C_p^2 \times C_n\) and \(C_p^2 \times C_q^2\) for digraphs (Q2689010) (← links)
- Recognizing and Testing Isomorphism of Cayley Graphs over an Abelian Group of Order 4p in Polynomial Time (Q3296729) (← links)
- ON ISOMORPHISMS OF VERTEX-TRANSITIVE CUBIC GRAPHS (Q3458368) (← links)
- (Q4808163) (← links)
- The Cayley isomorphism property for the group C^5_2 × C_p (Q4993961) (← links)
- Normal Cayley digraphs of cyclic groups with CI-property (Q5080177) (← links)
- Generalized dihedral CI-groups (Q5090191) (← links)
- (Q5130663) (← links)
- Enumerating Cayley (di-)graphs on dihedral groups (Q5383850) (← links)
- The Cayley isomorphism property for the group C4×Cp2 (Q5856797) (← links)
- An elementary Abelian group of rank 4 is a CI-group (Q5937246) (← links)
