Lagrange polynomial

Known as: Lagrangian Interpolation, Lagrange interpolant, Barycentric Interpolation 
In numerical analysis, Lagrange polynomials are used for polynomial interpolation. For a given set of distinct points and numbers , the Lagrange… (More)
Wikipedia

Topic mentions per year

Topic mentions per year

1961-2018
02040608019612018

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2015
2015
In these times, affective virtual characters are often being involved as a major component in creative industries such as… (More)
  • figure 2
  • figure 3
  • figure 4
  • figure 7
  • figure 8
Is this relevant?
2014
2014
Long Term Evolution (LTE) uses different techniques to achieve high throughput required, such as the HARQ techniques, Multiple… (More)
  • figure 3
  • figure 1
  • figure 2
  • figure 4
  • figure 5
Is this relevant?
2011
2011
In this paper, the timing mismatch compensation problem in the implementation of a time-interleaved analog-to-digital converter… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
  • figure 5
Is this relevant?
2011
2011
Based on the Lagrange interpolation polynomial algorithm, the error analysis is discussed in this paper. Firstly, we derive the… (More)
  • figure 2
  • figure 3
  • figure 4
  • figure 5
  • figure 6
Is this relevant?
2007
2007
  • P. Lancastera
  • 2007
This paper concerns regular matrix polynomials P (λ) when represented in various polynomial bases (other than the monomials 1… (More)
  • table 1
Is this relevant?
Highly Cited
2004
Highly Cited
2004
Barycentric interpolation is a variant of Lagrange polynomial interpolation that is fast and stable. It deserves to be known as… (More)
  • figure 5.1
  • figure 6.1
Is this relevant?
2004
2004
This paper presents a technique for estimating HMM model parameters for noisy speech from given clean speech HMM and noise HMM… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
  • figure 5
Is this relevant?
Highly Cited
2003
Highly Cited
2003
The Lagrange representation of the interpolating polynomial can be rewritten in two more computationally attractive forms: a… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
Is this relevant?
1997
1997
Bounds are proved for the Stieltjes polynomial En+1, and lower bounds are proved for the distances of consecutive zeros of the… (More)
Is this relevant?
Highly Cited
1994
Highly Cited
1994
Lagrange interpolation by polynomials in several variables is studied through a finite difference approach. We establish an… (More)
  • figure 2
Is this relevant?