Qi Ye, Ph.D.
Affiliations: | 2012 | Illinois Institute of Technology, Chicago, IL, United States |
Area:
Applied MechanicsGoogle:
"Qi Ye"Parents
Sign in to add mentorGregory Fasshauer | grad student | 2012 | Illinois Institute of Technology | |
(Analyzing reproducing kernel approximation methods via a Green function approach.) |
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Publications
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Huang L, Liu C, Tan L, et al. (2019) Generalized representer theorems in Banach spaces Analysis and Applications. 1-22 |
Ye Q. (2019) Kernel-based probability measures for generalized interpolations: A deterministic or stochastic problem? Journal of Mathematical Analysis and Applications. 477: 420-436 |
Ye Q. (2019) Kernel-based probability measures for interpolations Applied and Computational Harmonic Analysis. 47: 226-234 |
Ling L, Ye Q. (2018) On meshfree numerical differentiation Analysis and Applications. 16: 717-739 |
Ye Q. (2016) Optimal designs of positive definite kernels for scattered data approximation Applied and Computational Harmonic Analysis. 41: 214-236 |
Fasshauer GE, Hickernell FJ, Ye Q. (2014) Solving support vector machines in reproducing kernel Banach spaces with positive definite functions Applied and Computational Harmonic Analysis. 38: 115-139 |
Ye Q. (2014) Support vector machines in reproducing kernel Hilbert spaces versus Banach spaces Springer Proceedings in Mathematics and Statistics. 83: 377-395 |
Fasshauer GE, Ye Q. (2013) Reproducing kernels of Sobolev spaces via a green kernel approach with differential operators and boundary operators Advances in Computational Mathematics. 38: 891-921 |
Cialenco I, Fasshauer GE, Ye Q. (2012) Approximation of stochastic partial differential equations by a kernel-based collocation method International Journal of Computer Mathematics. 89: 2543-2561 |
Fasshauer GE, Ye Q. (2011) Reproducing kernels of generalized Sobolev spaces via a Green function approach with distributional operators Numerische Mathematik. 119: 585-611 |