Skip to search form
Skip to main content
Skip to account menu
Semantic Scholar
Semantic Scholar's Logo
Search 218,237,874 papers from all fields of science
Search
Sign In
Create Free Account
Wilkinson's polynomial
Known as:
Wilkinson
, Wilkinson polynomial
In numerical analysis, Wilkinson's polynomial is a specific polynomial which was used by James H. Wilkinson in 1963 to illustrate a difficulty when…
Expand
Wikipedia
(opens in a new tab)
Create Alert
Alert
Related topics
Related topics
12 relations
Characteristic polynomial
Condition number
Eigenvalue algorithm
Lagrange polynomial
Expand
Papers overview
Semantic Scholar uses AI to extract papers important to this topic.
Highly Cited
2011
Highly Cited
2011
Novel Design of Wilkinson Power Dividers With Arbitrary Power Division Ratios
Jia‐lin Li
,
Bingzhong Wang
IEEE transactions on industrial electronics…
2011
Corpus ID: 28695480
In this paper, a stub-loaded transmission line that is used to design Wilkinson power dividers with arbitrary power division…
Expand
Highly Cited
2009
Highly Cited
2009
Analysis and design of compact two-way Wilkinson power dividers using coupled lines
Xinyi Tang
,
K. Mouthaan
Asia-Pacific Microwave Conference
2009
Corpus ID: 22693501
This paper analyzes the two-way Wilkinson power dividers using coupled lines as λ/4 impedance transformer to have more compact…
Expand
Highly Cited
2009
Highly Cited
2009
A Dual Band Unequal Wilkinson Power Divider Without Reactive Components
Yongle Wu
,
Yuan’an Liu
,
Yaxing Zhang
,
Jinchun Gao
,
Hui Zhou
IEEE transactions on microwave theory and…
2009
Corpus ID: 18413890
This paper presents an unequal Wilkinson power divider operating at arbitrary dual band without reactive components (such as…
Expand
Highly Cited
2007
Highly Cited
2007
Wilkinson Power Divider Using Microstrip EBG Cells for the Suppression of Harmonics
Chih-Ming Lin
,
H. Su
,
Jui‐Chieh Chiu
,
Yeong-Her Wang
IEEE Microwave and Wireless Components Letters
2007
Corpus ID: 41301758
This letter presents a planar power divider with an effective technique for nth harmonics suppression. The proposed technique…
Expand
Highly Cited
2006
Highly Cited
2006
A dual-frequency wilkinson power divider
Lei Wu
,
Zengguang Sun
,
H. Yilmaz
,
Manfred Berroth
IEEE transactions on microwave theory and…
2006
Corpus ID: 8973530
In this paper, a Wilkinson power divider operating at two arbitrary different frequencies is presented. The structure of this…
Expand
2006
2006
A 1: 6 Unequal Wilkinson Power Divider
Jongsik Lim
,
Gil-Young Lee
,
Y. Jeong
,
D. Ahn
,
KwanSun Choi
European Microwave Conference
2006
Corpus ID: 39954943
A 1:6 unequal Wilkinson power divider is proposed. The proposed 1:6 divider has the microstrip line with 207Omega characteristic…
Expand
2001
2001
Polynomial root finding using iterated Eigenvalue computation
S. Fortune
International Symposium on Symbolic and Algebraic…
2001
Corpus ID: 18722807
We analyze an iterative algorithm that approximates all roots of a univariate polynomial. The algorithm is based on (hardware…
Expand
Highly Cited
1996
Highly Cited
1996
The interactive effect of influence tactic, applicant gender, and type of job on hiring recommendations
E. Holly Buttner
,
M. McEnally
1996
Corpus ID: 42460108
The effects of influence tactic, applicant gender, and job type were examined in the selection context. A male or female…
Expand
1994
1994
Guaranteed Error Bounds for Ordinary Differential Equations
G. Corliss
1994
Corpus ID: 116182995
Hamming once said, \The purpose of computing is insight, not numbers." If that is so, then the speed of our computers should be…
Expand
Highly Cited
1981
Highly Cited
1981
A Simultaneous Iteration Algorithm for Real Matrices
W. Stewart
,
A. Jennings
TOMS
1981
Corpus ID: 15786813
Simultaneous iteration methods are extensions of the power method whereby iteration is carried out with a number of trial vectors…
Expand
By clicking accept or continuing to use the site, you agree to the terms outlined in our
Privacy Policy
(opens in a new tab)
,
Terms of Service
(opens in a new tab)
, and
Dataset License
(opens in a new tab)
ACCEPT & CONTINUE