# On some ideals with linear free resolutions

**Authors:** Stefan O. Tohaneanu

arXiv: 1906.02422 · 2019-06-07

## TL;DR

This paper proves a conjecture that certain ideals generated by products of linear forms have linear free resolutions in specific cases, including linear codes and line arrangements, and explores their Betti numbers.

## Contribution

It establishes the conjecture for cases involving linear codes with minimum distance and line arrangements in the projective plane, and analyzes Betti numbers in the latter case.

## Key findings

- Proved the conjecture for linear codes with minimum distance d.
- Confirmed the conjecture for line arrangements in P^2.
- Analyzed the graded Betti numbers for line arrangements.

## Abstract

Given $\Sigma\subset\mathbb K[x_1,\ldots,x_k]$, any finite collection of linear forms, some possibly proportional, and any $1\leq a\leq |\Sigma|$, it has been conjectured that $I_a(\Sigma)$, the ideal generated by all $a$-fold products of $\Sigma$, has linear graded free resolution. In this article we show the validity of this conjecture for two cases: the first one is when $a=d+1$ and $\Sigma$ is dual to the columns of a generating matrix of a linear code of minimum distance $d$; and the second one is when $k=3$ and $\Sigma$ defines a line arrangement in $\mathbb P^2$ (i.e., there are no proportional linear forms). For the second case we investigate what are the graded betti numbers of $I_a(\Sigma)$.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1906.02422/full.md

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Source: https://tomesphere.com/paper/1906.02422