ı-quantum groups,arising from quantum symmetric pairs,are coideal subalgebras of quantum groups.ı-quantum groups are a vast generalization of quantum groups,as quantum groups can be viewed asıquantum groups of diagona...ı-quantum groups,arising from quantum symmetric pairs,are coideal subalgebras of quantum groups.ı-quantum groups are a vast generalization of quantum groups,as quantum groups can be viewed asıquantum groups of diagonal type.Recently,the braid group symmetries and Drinfeld new presentations of quantum groups have been generalized to affineı-quantum groups.In this paper,we construct PBW type bases for splitı-quantum groups of type ADE,based on their braid group symmetries and Drinfeld new presentations.This can be viewed as anı-analogue of the PBW-basis for affine quantum groups,and it generalizes the PBW-basis ofı-quantum groups of finite type.展开更多
In this work we axe concerned with the universal associative envelope of a finite-dimensional simple symplectic anti-Jordan triple system (AJTS). We prove that if T is a triple system as above, then there exists an ...In this work we axe concerned with the universal associative envelope of a finite-dimensional simple symplectic anti-Jordan triple system (AJTS). We prove that if T is a triple system as above, then there exists an associative algebra U(T) and an injective homomorphism ε : T→ U(T), where U(T) is an AJTS under the triple product defined by (a, b, c) = abc- cba. Moreover, U(T) is a universal object with respect to such homomorphisms. We explicitly determine the PBW-basis of U(T), the center Z(U(T)) and the Gelfand-Kirillov dimension of U(T).展开更多
文摘ı-quantum groups,arising from quantum symmetric pairs,are coideal subalgebras of quantum groups.ı-quantum groups are a vast generalization of quantum groups,as quantum groups can be viewed asıquantum groups of diagonal type.Recently,the braid group symmetries and Drinfeld new presentations of quantum groups have been generalized to affineı-quantum groups.In this paper,we construct PBW type bases for splitı-quantum groups of type ADE,based on their braid group symmetries and Drinfeld new presentations.This can be viewed as anı-analogue of the PBW-basis for affine quantum groups,and it generalizes the PBW-basis ofı-quantum groups of finite type.
文摘In this work we axe concerned with the universal associative envelope of a finite-dimensional simple symplectic anti-Jordan triple system (AJTS). We prove that if T is a triple system as above, then there exists an associative algebra U(T) and an injective homomorphism ε : T→ U(T), where U(T) is an AJTS under the triple product defined by (a, b, c) = abc- cba. Moreover, U(T) is a universal object with respect to such homomorphisms. We explicitly determine the PBW-basis of U(T), the center Z(U(T)) and the Gelfand-Kirillov dimension of U(T).
