On the geometry of zero sets of central quaternionic polynomials

Gil Alon; Elad Paran

doi:10.1016/j.jalgebra.2024.07.019

On the geometry of zero sets of central quaternionic polynomials

מתמטיקה

نتاج البحث: نشر في مجلة › مقالة › مراجعة النظراء

ملخص

Let R be the ring H[x₁,…,x_n] of polynomials in n central variables over the real quaternion algebra H, and let I be a left ideal in R. We prove that if p∈R vanishes at all the common zeros of I in Hⁿ with commuting coordinates, then as a slice regular quaternionic function, p vanishes at all common zeros of I in Hⁿ. This confirms a conjecture of Gori, Sarfatti and Vlacci, who settled the two dimensional case.

اللغة الأصلية	الإنجليزيّة
الصفحات (من إلى)	780-788
عدد الصفحات	9
دورية	Journal of Algebra
مستوى الصوت	659
المعرِّفات الرقمية للأشياء	https://doi.org/10.1016/j.jalgebra.2024.07.019
حالة النشر	تمّ التقديم - 2 فبراير 2024

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© 2024 Elsevier Inc.

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10.1016/j.jalgebra.2024.07.019

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Link to publication in Scopus

قم بذكر هذا

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title = "On the geometry of zero sets of central quaternionic polynomials",

abstract = "Let R be the ring H[x1,…,xn] of polynomials in n central variables over the real quaternion algebra H, and let I be a left ideal in R. We prove that if p∈R vanishes at all the common zeros of I in Hn with commuting coordinates, then as a slice regular quaternionic function, p vanishes at all common zeros of I in Hn. This confirms a conjecture of Gori, Sarfatti and Vlacci, who settled the two dimensional case.",

keywords = "Central polynomials, Nullstellensatz, Quaternionic, Slice regular functions",

author = "Gil Alon and Elad Paran",

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year = "2024",

month = feb,

day = "2",

doi = "10.1016/j.jalgebra.2024.07.019",

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T1 - On the geometry of zero sets of central quaternionic polynomials

AU - Alon, Gil

AU - Paran, Elad

PY - 2024/2/2

Y1 - 2024/2/2

N2 - Let R be the ring H[x1,…,xn] of polynomials in n central variables over the real quaternion algebra H, and let I be a left ideal in R. We prove that if p∈R vanishes at all the common zeros of I in Hn with commuting coordinates, then as a slice regular quaternionic function, p vanishes at all common zeros of I in Hn. This confirms a conjecture of Gori, Sarfatti and Vlacci, who settled the two dimensional case.

AB - Let R be the ring H[x1,…,xn] of polynomials in n central variables over the real quaternion algebra H, and let I be a left ideal in R. We prove that if p∈R vanishes at all the common zeros of I in Hn with commuting coordinates, then as a slice regular quaternionic function, p vanishes at all common zeros of I in Hn. This confirms a conjecture of Gori, Sarfatti and Vlacci, who settled the two dimensional case.

KW - Central polynomials

KW - Nullstellensatz

KW - Quaternionic

KW - Slice regular functions

UR - https://www.scopus.com/pages/publications/85199807878

U2 - 10.1016/j.jalgebra.2024.07.019

DO - 10.1016/j.jalgebra.2024.07.019

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AN - SCOPUS:85199807878

SN - 0021-8693

VL - 659

SP - 780

EP - 788

JO - Journal of Algebra

JF - Journal of Algebra

ER -

On the geometry of zero sets of central quaternionic polynomials

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