English

Extending Generalized Splines Over The Integers

Combinatorics 2025-05-08 v1

Abstract

Let RR be a commutative ring with identity and GG a graph. \emph{An extending generalized spline} on GG is a vertex labeling fvMvf \in \prod_{v} M_v such that at each edge e=uve=uv there is an RR-module MuvM_{uv} together with homomorphisms φu:MuMuv \varphi_u : M_u \to M_{uv} and φv:MvMuv \varphi_v : M_v \to M_{uv} for each vertex u,vu, v incident to the edge ee so that φu(fu)=φv(fv).\varphi_u(f_u)=\varphi_v(f_v). Extending generalized splines are further generalizations for generalized splines. They can also be considered as generalized splines over modules. The main goal of this paper is to study the RR-module structure of extending generalized splines. We concentrate on two following questions: which of the results for general splines extend to generalized splines over modules and if there is an algorithm or an explicit formula for special basis classes, called a flow up basis, for generalized splines over modules. We show that certain results concerning generalized splines can be extended to a setting where each vertex vv is assigned a module Mv=mvZM_v=m_v\mathbb Z. We provide an algorithm to construct a special basis for generalized splines over these modules on paths. Additionally, we introduce a new technique to construct a flow-up basis on arbitrary graphs using the idea of an algorithm on paths.

Keywords

Cite

@article{arxiv.2505.04342,
  title  = {Extending Generalized Splines Over The Integers},
  author = {Gökçen Dilaver and Selma Altınok},
  journal= {arXiv preprint arXiv:2505.04342},
  year   = {2025}
}
R2 v1 2026-06-28T23:24:22.514Z