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2010 – 2019
- 2019
[j24]Shan Jiang
, Shu-Cherng Fang, Qi An, John E. Lavery:
A sub-one quasi-norm-based similarity measure for collaborative filtering in recommender systems. Inf. Sci. 487: 142-155 (2019)- 2016
- [j23]Tiantian Nie, Shu-Cherng Fang, Zhibin Deng, John E. Lavery:
On linear conic relaxation of discrete quadratic programs. Optim. Methods Softw. 31(4): 737-754 (2016) - 2015
- [j22]Ziteng Wang, Shu-Cherng Fang, John E. Lavery:
On shape-preserving capability of cubic L1 spline fits. Comput. Aided Geom. Des. 40: 59-75 (2015) - 2014
- [j21]Zhibin Deng, John E. Lavery, Shu-Cherng Fang, Jian Luo:
ℓ1 Major Component Detection and Analysis (ℓ1 MCDA) in Three and Higher Dimensional Spaces. Algorithms 7(3): 429-443 (2014) - 2013
- [j20]Ye Tian, Qingwei Jin, John E. Lavery, Shu-Cherng Fang:
ℓ1 Major Component Detection and Analysis (ℓ1 MCDA): Foundations in Two Dimensions. Algorithms 6(1): 12-28 (2013) - 2012
- [j19]John E. Lavery:
Univariate Lp and lp Averaging, 0<p<1, in Polynomial Time by Utilization of Statistical Structure. Algorithms 5(4): 421-432 (2012) - [j18]Qingwei Jin, Lu Yu, John E. Lavery, Shu-Cherng Fang:
Univariate cubic L1 interpolating splines based on the first derivative and on 5-point windows: analysis, algorithm and shape-preserving properties. Comput. Optim. Appl. 51(2): 575-600 (2012) - 2010
- [j17]Qingwei Jin, John E. Lavery, Shu-Cherng Fang:
Univariate Cubic L1 Interpolating Splines: Analytical Results for Linearity, Convexity and Oscillation on 5-PointWindows. Algorithms 3(3): 276-293 (2010) - [j16]Lu Yu, Qingwei Jin, John E. Lavery, Shu-Cherng Fang:
Univariate Cubic L1 Interpolating Splines: Spline Functional, Window Size and Analysis-based Algorithm. Algorithms 3(3): 311-328 (2010) - [c2]Dimitri Bulatov, John E. Lavery:
Comparison in the Hausdorff Metric of Reconstruction of 3D Urban Terrain by Four Procedures. GRAPP 2010: 125-129
2000 – 2009
- 2009
- [j15]John E. Lavery:
Shape-preserving univariate cubic and higher-degree L1 splines with function-value-based and multistep minimization principles. Comput. Aided Geom. Des. 26(1): 1-16 (2009) - [c1]Dimitri Bulatov, John E. Lavery:
Comparison of Reconstruction and Texturing of 3D Urban Terrain by L1 Splines, Conventional Splines and Alpha Shapes. VISAPP (2) 2009: 403-409 - 2008
- [j14]Nan-Chieh Chiu, Shu-Cherng Fang, John E. Lavery, Jen-Yen Lin, Yong Wang:
Approximating term structure of interest rates using cubic L. Eur. J. Oper. Res. 184(3): 990-1004 (2008) - [j13]Yun-Bin Zhao, Shu-Cherng Fang, John E. Lavery:
Geometric dual formulation for first-derivative-based univariate cubic L 1 splines. J. Glob. Optim. 40(4): 589-621 (2008) - 2006
- [j12]John E. Lavery:
Shape-preserving, first-derivative-based parametric and nonparametric cubic L1 spline curves. Comput. Aided Geom. Des. 23(3): 276-296 (2006) - 2005
- [j11]Hao Cheng, Shu-Cherng Fang, John E. Lavery:
A Geometric Programming Framework for Univariate Cubic L 1 Smoothing Splines. Ann. Oper. Res. 133(1-4): 229-248 (2005) - [j10]John E. Lavery:
Shape-preserving interpolation of irregular data by bivariate curvature-based cubic L1 splines in spherical coordinates. Comput. Aided Geom. Des. 22(9): 818-837 (2005) - 2004
- [j9]John E. Lavery:
Shape-preserving approximation of multiscale univariate data by cubic L1 spline fits. Comput. Aided Geom. Des. 21(1): 43-64 (2004) - [j8]Hao Cheng, Shu-Cherng Fang, John E. Lavery:
An Efficient Algorithm for Generating Univariate Cubic L1 Splines. Comput. Optim. Appl. 29(2): 219-253 (2004) - 2002
- [j7]John E. Lavery:
Shape-preserving, multiscale interpolation by univariate curvature-based cubic L1 splines in Cartesian and polar coordinates. Comput. Aided Geom. Des. 19(4): 257-273 (2002) - [j6]Hao Cheng, Shu-Cherng Fang, John E. Lavery:
Univariate cubic L1 splines - A geometric programming approach. Math. Methods Oper. Res. 56(2): 197-229 (2002) - 2001
- [j5]John E. Lavery:
Shape-preserving, multiscale interpolation by bi- and multivariate cubic L1 splines. Comput. Aided Geom. Des. 18(4): 321-343 (2001) - 2000
- [j4]John E. Lavery:
Univariate cubic Lp splines and shape-preserving, multiscale interpolation by univariate cubic L1 splines. Comput. Aided Geom. Des. 17(4): 319-336 (2000) - [j3]John E. Lavery:
Shape-preserving, multiscale fitting of univariate data by cubic L1 smoothing splines. Comput. Aided Geom. Des. 17(7): 715-727 (2000)
1980 – 1989
- 1982
- [j2]John E. Lavery:
Solution of quasilinear hyperbolic initial-boundary-value problems by the method of pseudolinear equations. Computing 28(3): 213-223 (1982) - 1980
- [j1]John E. Lavery:
Numerical solution of a class of quasilinear hyperbolic equations by reduction to the wave equation. Computing 25(1): 77-88 (1980)
Coauthor Index
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