Spherical Essentially Non-Oscillatory (SENO) Interpolation (2212.01963v1)

Abstract: We develop two new ideas for interpolation on $\mathbb{S}^2$. In this first part, we will introduce a simple interpolation method named \textit{Spherical Interpolation of orDER} $n$ (SIDER-$n$) that gives a $C^{n}$ interpolant given $n \geq 2$. The idea generalizes the construction of the B\'{e}zier curves developed for $\mathbb{R}$. The second part incorporates the ENO philosophy and develops a new \textit{Spherical Essentially Non-Oscillatory} (SENO) interpolation method. When the underlying curve on $\mathbb{S}^2$ has kinks or sharp discontinuity in the higher derivatives, our proposed approach can reduce spurious oscillations in the high-order reconstruction. We will give multiple examples to demonstrate the accuracy and effectiveness of the proposed approaches.