magnify
发表于 2025-3-21 18:40:04
书目名称Geometry of the Unit Sphere in Polynomial Spaces影响因子(影响力)<br> http://figure.impactfactor.cn/if/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces影响因子(影响力)学科排名<br> http://figure.impactfactor.cn/ifr/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces网络公开度<br> http://figure.impactfactor.cn/at/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces网络公开度学科排名<br> http://figure.impactfactor.cn/atr/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces被引频次<br> http://figure.impactfactor.cn/tc/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces被引频次学科排名<br> http://figure.impactfactor.cn/tcr/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces年度引用<br> http://figure.impactfactor.cn/ii/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces年度引用学科排名<br> http://figure.impactfactor.cn/iir/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces读者反馈<br> http://figure.impactfactor.cn/5y/?ISSN=BK0383839<br><br> <br><br>书目名称Geometry of the Unit Sphere in Polynomial Spaces读者反馈学科排名<br> http://figure.impactfactor.cn/5yr/?ISSN=BK0383839<br><br> <br><br>
Antigen
发表于 2025-3-22 00:17:25
2191-8198 tive by including in it over 50 original figures in order to help in the understanding of allthe results and techniques included in the book..978-3-031-23675-4978-3-031-23676-1Series ISSN 2191-8198 Series E-ISSN 2191-8201
Pessary
发表于 2025-3-22 03:04:03
Polynomials of Degree ,premum norm defined on the interval [−1, 1] (when the polynomial is defined over .) or on the unit disk (when the polynomial is defined over .). More precisely, we are interested on the parametrization of the unit ball as well as the extreme points when we are dealing with the space of polynomials o
红肿
发表于 2025-3-22 05:53:00
Spaces of Trinomials,nt scenarios. To be more precise, we will study the geometry of the space of real trinomials in one variable with the supremum norm and the . norm, the space of real trinomials in two variables with the supremum norm and finally the space of complex trinomials with the supremum norm.
figure
发表于 2025-3-22 10:07:51
Applications,orms whose unit balls can be described in ., but mainly we have tried to obtain the extreme polynomials of the unit balls. We have also studied some of the extreme polynomials in arbitrary dimensions and we have even described some of the extreme polynomials of arbitrary degree. The reason behind th
Friction
发表于 2025-3-22 16:08:05
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Friction
发表于 2025-3-22 18:15:32
Polynomials of Degree ,precisely, we are interested on the parametrization of the unit ball as well as the extreme points when we are dealing with the space of polynomials of degree at most 2. For the space of polynomials of arbitrary degree with the supremum norm defined on [−1, 1], we are only interested on the extreme polynomials of the unit ball.
榨取
发表于 2025-3-22 23:29:19
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FAWN
发表于 2025-3-23 01:28:44
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Tdd526
发表于 2025-3-23 09:29:54
https://doi.org/10.1007/978-3-030-32918-1precisely, we are interested on the parametrization of the unit ball as well as the extreme points when we are dealing with the space of polynomials of degree at most 2. For the space of polynomials of arbitrary degree with the supremum norm defined on [−1, 1], we are only interested on the extreme polynomials of the unit ball.