AbstractAn Alexander quandle is a module M over Z[t,t−1] whose quandle operation is defined by x⁎y=tx+(1−t)y, x,y∈M. The automorphism group of a general Alexander quandle, previously unknown, is determined in the present paper
In this paper a class of (m,n)-rings with a left and right zero is described as a variety of algebra...
AbstractThe automorphism group AutFn and outer automorphism group OutFn of a free group Fn of rank n...
AbstractFor odd primes p, we examine Ĥ∗(Aut(F2(p−1));Z(p)), the Farrell cohomology of the group of ...
The usual algebraic construction used to study the symmetries of an object is the group of automorph...
AbstractWe prove that if Uℏ(g) is a quasitriangular QUE algebra with universal R-matrix R, and Oℏ(G∗...
Let k [n] = k[x 1, , x n ] be the polynomial algebra in n variables and let $ {\mathbb{...
The finite topological quandles can be represented as $n\times n$ matrices, recently defined by S. N...
AbstractLet Uq(glm⊕p) be the quantized universal enveloping algebra of glm⊕p. Let θ be the automorph...
AbstractLet G be a group and A a group of automorphisms of G. An A-orbit of G is a set of the form {...
In this note we confirm the conjecture of Calegari, Garoufalidis and Zagier in their recent paper in...
It is known that any quantization of a quasitriangular Lie bialgebra g gives rise to a braiding on t...
AbstractFor finite subsets A1,…,An of a field, their sumset is given by {a1+⋯+an:a1∈A1,…,an∈An}. In ...
AbstractLet G be an exceptional Lie group G2, F4, E6, E7 or E8, and also set p is the corresponding ...
AbstractLet p>3 be a prime and a,b∈Z. In the paper we mainly determine the number Vp(x4+ax2+bx) of i...
AbstractIn this paper we generalize a recent result of Wittmann on densities of the 4-rank of class ...
In this paper a class of (m,n)-rings with a left and right zero is described as a variety of algebra...
AbstractThe automorphism group AutFn and outer automorphism group OutFn of a free group Fn of rank n...
AbstractFor odd primes p, we examine Ĥ∗(Aut(F2(p−1));Z(p)), the Farrell cohomology of the group of ...
The usual algebraic construction used to study the symmetries of an object is the group of automorph...
AbstractWe prove that if Uℏ(g) is a quasitriangular QUE algebra with universal R-matrix R, and Oℏ(G∗...
Let k [n] = k[x 1, , x n ] be the polynomial algebra in n variables and let $ {\mathbb{...
The finite topological quandles can be represented as $n\times n$ matrices, recently defined by S. N...
AbstractLet Uq(glm⊕p) be the quantized universal enveloping algebra of glm⊕p. Let θ be the automorph...
AbstractLet G be a group and A a group of automorphisms of G. An A-orbit of G is a set of the form {...
In this note we confirm the conjecture of Calegari, Garoufalidis and Zagier in their recent paper in...
It is known that any quantization of a quasitriangular Lie bialgebra g gives rise to a braiding on t...
AbstractFor finite subsets A1,…,An of a field, their sumset is given by {a1+⋯+an:a1∈A1,…,an∈An}. In ...
AbstractLet G be an exceptional Lie group G2, F4, E6, E7 or E8, and also set p is the corresponding ...
AbstractLet p>3 be a prime and a,b∈Z. In the paper we mainly determine the number Vp(x4+ax2+bx) of i...
AbstractIn this paper we generalize a recent result of Wittmann on densities of the 4-rank of class ...
In this paper a class of (m,n)-rings with a left and right zero is described as a variety of algebra...
AbstractThe automorphism group AutFn and outer automorphism group OutFn of a free group Fn of rank n...
AbstractFor odd primes p, we examine Ĥ∗(Aut(F2(p−1));Z(p)), the Farrell cohomology of the group of ...
DOI
Add to ORKG