泛代数上的Groebner-Shirshov基理论

综述了域上或交换代数上的线性（-）代数的相应的簇（范畴）的 Groebner-Shirshov 基理论的新成果，如:结合代数（包括群（半群）代数），自由代数的张量积，李代数，Di-代数，pre-李代数，Rota-Baxter代数，metabelian李代数，L-代数，半环代数，范畴代数，等．以上结果包含了许多应用，尤其是给出了一些著名结论的新的证明．

Gr\"{o}bner-Shirshov Bases for Universal Algebras

Some results were reviewed in Gr\{o}bner-Shirshov bases method for different varieties (categories) of linear ($\Omega$-) algebras over a field $k$ or a commutative algebra $K$ over $k$: associative algebras (including group (semigroup) algebras), tensor product of free associative algebras, Lie algebras, dialgebras, pre-Lie (Vinberg right (left) symmetric) algebras, Rota-Baxter algebras, metabelian Lie algebras, $L$-algebras, semiring algebras, category algebras, etc. There are some applications particularly to new proofs of some known theorems.