Free resolutions and marked families

Abstract

Let K be a field and A a Noetherian K-algebra. In a paper of 2020, M. Albert, C. Bertone, M. Roggero and W. M. Seiler proved that, given a quasi-stable module U ⊂ Rm with R=K[x0,…,xn], any submodule M⊂eq (R A)m generated by a marked basis over U admits a special free resolution described in terms of marked bases as well, called the U-resolution of M. In this paper, we first investigate the minimality of the U-resolution and its structure. When M is an ideal and A=K, we show that M is componentwise linear if and only if its U-resolution is minimal, up to a linear change of variables. Then, adopting a functorial approach to the construction of the U-resolution, we prove that certain functors naturally associated with the resolution are isomorphic. These isomorphisms arise from the fact that the marked basis of the i-th syzygy module in the U-resolution can be expressed in terms of the coefficients of the marked basis of M. Moreover, when M is an ideal of depth at least 2, this correspondence can be reversed: in this case, the marked basis of M itself can be written in terms of the coefficients of the marked basis of its first syzygy module.

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