S n Lie sl n (C) :={ n n } C (i) (ii) V V {} Specht Lie sl n (C) -p Hecke - Lie 98 -Drinfeld Lie - Hecke Lie () - v, q Hecke H n (q) C U v (sl n ) C L

n , 1) maps the space of all homogeneous elements of degree n of an arbitrary free associative algebra onto its subspace of homogeneous Lie elements of degree n. A second

This paper is a sequel to [1] where the existence of homoclinic solutions was proved for a family of singular Hamiltonian systems which were subjected to almost periodic forcing...

In Section 2 we construct the higher rank Askey–Wilson algebra AW(n) as a subalgebra of U q (sl 2 ) ⊗n through different extension processes, which we prove to be equivalent.. Section

のようにすべきだと考えていますか。 やっと開通します。長野、太田地区方面 　

In the case of the Ariki–Koike algebra, that is, the Hecke algebra of the complex reflection group G(l, 1, n), they are Laurent polynomials whose factors determine when Specht

In [18] we introduced the concept of hypo-nilpotent ideals of n-Lie algebras, and proved that an m-dimensional simplest filiform 3-Lie algebra N 0 can’t be a nilradical of

If a non-saturated subset in the set of weights of the kth fundamental representation of SL(n) is found, then the analogous non-saturated subset exists in the set of weights of the

Given T and G as in Theorem 1.5, the authors of [2] first prepared T and G as follows: T is folded such that it looks like a bi-polar tree, namely, a tree having two vertices