AbstractQuandles have two operations corresponding to the operations of conjugation x ▷ y = y−1xy and x ▷ −1 y = yxy−1 in a group. Simple quandles are classified in terms of certain triples 〈N, C, m〉, where N is a simple group, C is a conjugacy class in Aut N, and m ⩾ 1
AbstractWe prove the Arad–Herzog conjecture for various families of finite simple groups — if A and ...
We give a unified solution the conjugacy problem in Thompson's groups F, V , and T using strand diag...
Let G be a complex non-exceptional simple algebraic group and g its Lie algebra. With every point x ...
AbstractQuandles have two operations corresponding to the operations of conjugation x ▷ y = y−1xy an...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
The usual algebraic construction used to study the symmetries of an object is the group of automorph...
Click on the link to view the abstract.Keywords: Conjugacy class, simple groupsQuaestiones Mathemati...
A quandle is an algebraic structure whose axioms correspond to the Reidemeister moves of knot theory...
Quandles are self-distributive, right-invertible, idempotent algebras. A group with conjugation for ...
Quandles are distributive algebraic structures originally introduced independently by David ...
Abstract Let G be a simple complex classical group and g its Lie algebra. Let U (g) be the Drinfeld-...
For any twisted conjugate quandle $Q$, and in particular any Alexander quandle, there exists a group...
We present methods of constructing examples of quandles of order 3n, where n is greater or equal to ...
we explored various methods of constructing new quandles: taking the Cartesian product of any two qu...
We study the difference between quandles that arise from conjugation in groups and those which do no...
AbstractWe prove the Arad–Herzog conjecture for various families of finite simple groups — if A and ...
We give a unified solution the conjugacy problem in Thompson's groups F, V , and T using strand diag...
Let G be a complex non-exceptional simple algebraic group and g its Lie algebra. With every point x ...
AbstractQuandles have two operations corresponding to the operations of conjugation x ▷ y = y−1xy an...
AbstractThe two operations of conjugation in a group, x▷y=y-1xy and x▷-1y=yxy-1 satisfy certain iden...
The usual algebraic construction used to study the symmetries of an object is the group of automorph...
Click on the link to view the abstract.Keywords: Conjugacy class, simple groupsQuaestiones Mathemati...
A quandle is an algebraic structure whose axioms correspond to the Reidemeister moves of knot theory...
Quandles are self-distributive, right-invertible, idempotent algebras. A group with conjugation for ...
Quandles are distributive algebraic structures originally introduced independently by David ...
Abstract Let G be a simple complex classical group and g its Lie algebra. Let U (g) be the Drinfeld-...
For any twisted conjugate quandle $Q$, and in particular any Alexander quandle, there exists a group...
We present methods of constructing examples of quandles of order 3n, where n is greater or equal to ...
we explored various methods of constructing new quandles: taking the Cartesian product of any two qu...
We study the difference between quandles that arise from conjugation in groups and those which do no...
AbstractWe prove the Arad–Herzog conjecture for various families of finite simple groups — if A and ...
We give a unified solution the conjugacy problem in Thompson's groups F, V , and T using strand diag...
Let G be a complex non-exceptional simple algebraic group and g its Lie algebra. With every point x ...
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