# Reconstruction of a homogeneous polynomial from its additive   decompositions when identifiability fails

**Authors:** Edoardo Ballico

arXiv: 1903.10188 · 2019-03-26

## TL;DR

This paper investigates the problem of reconstructing homogeneous polynomials from their additive decompositions, especially in cases where the decomposition is not unique, focusing on curves and Veronese embeddings.

## Contribution

It introduces the concept of the non-uniqueness set for points with multiple decompositions and analyzes its properties for curves and Veronese varieties.

## Key findings

- Characterizes the non-uniqueness set for non-identifiable points.
- Provides results specific to curves and Veronese embeddings.
- Enhances understanding of polynomial reconstruction when identifiability fails.

## Abstract

Let $X\subset \mathbb {P}^r$ be an integral and non-degenerate variety. For any $q\in \mathbb {P}^r$ let $r_X(q)$ be its $X$-rank and $\mathcal {S} (X,q)$ the set of all finite subsets of $X$ such that $|S|=r_X(q)$ and $q\in \langle S\rangle$, where $\langle \ \ \rangle$ denotes the linear span. We consider the case $|\mathcal {S} (X,q)|>1$ (i.e. when $q$ is not $X$-identifiable) and study the set $W(X)_q:= \cap _{S\in\mathcal {S}}\langle S\rangle$, which we call the non-uniqueness set of $q$. We study the case $\dim X=1$ and the case $X$ a Veronese embedding of $\mathbb {P}^n$.

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1903.10188/full.md

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Source: https://tomesphere.com/paper/1903.10188