Automated fourier series expansions for elliptic functions

Series expansions for meromorphic functions obtained in the author's earlier paper (Compiex Variables Theory Appl. 25 (1994), 159-171) are derived in a different way-namely, from Cauchy's theorem on partial fraction expansionsin the present paper. In addition to that, a certain result of Cauchy's th

The Christoffel functions \(A_{n}(d \mu)\) associated with a general nonnegative measure \(\mu\) on \(\mathbb{R}^{d}\) are studied. The asymptotics of \(A_{n}(d \mu)\) are derived for \(\mu\) supported on \([-1,1]^{d}\). The estimates of \(A_{n}(d \mu)\) are used to study the summability of the mult

Figure 4 Relative power distribution for the TE ᎐TE waveguide 02 01 Ž . mode converter with the improved radius form 7 and the spurious input mode mixture mode TE are s 0.05305, s 0.00338, ␦ s 0.13081, and 02 1 2 the total length is 0.6677 m. The conversion efficiency for TE is s 99.32%. Suppose th

First we show that any hyperbolically harmonic (hyperharmonic) function in the unit ball B in n has a series expansion in hyperharmonic functions, and then we construct the kernel that reproduces hyperharmonic functions in some L 1 B space. We show that the same kernel also reproduces harmonic funct