CW-complex Nagata Idealizations
Abstract
We introduce a novel construction which allows us to identify the elements of the skeletons of a CW-complex $P(m)$ and the monomials in $m$ variables. From this, we infer that there is a bijection between finite CW-subcomplexes of $P(m)$, which are quotients of finite simplicial complexes, and some bigraded standard Artinian Gorenstein algebras, generalizing previous constructions in \cite{F:S}, \cite{CGIM} and \cite{G:Z}. We apply this to a generalization of Nagata idealization for level algebras. These algebras are standard graded Artinian algebras whose Macaulay dual generator is given explicitly as a bigraded polynomial of bidegree $(1,d)$. We consider the algebra associated to polynomials of the same type of bidegree $(d_1,d_2)$.
- Publication:
-
arXiv e-prints
- Pub Date:
- May 2020
- DOI:
- 10.48550/arXiv.2005.01501
- arXiv:
- arXiv:2005.01501
- Bibcode:
- 2020arXiv200501501C
- Keywords:
-
- Mathematics - Commutative Algebra;
- Mathematics - Algebraic Geometry;
- Primary 13A30;
- 05E40;
- Secondary 57Q05;
- 13D40;
- 13A02;
- 13E10
- E-Print:
- 19 pages, 2 figures, AMS-LaTeX. To be published in Advances in Applied Mathematics