The tidal level data from 21 tidal stations in radial sand ridge sea area of Jiangsu Province are analyzed by use of G-Godin's tidal harmonic analysis and prediction programs revised by M Foreman,and the harmonic constants of 11 constituents and corresponding mean sea level are obtained.
In this paper,We discussed harmonic calculus on fractal spaces SG(N,3),and obtained the harmonic functions,the existence and uniqeness theorem of the solutions to Dirichlet and Neumann problems on SG(N,3),further more, the Gauss Green formula was also given.
In this paper,we discussed harmonic calculus on random fractal SG(N, ξ),and obtained the harmonic functions,the existence and uniqueness theorem for the solutions to Dirichlet and Neumann problems,Gauss-Green's formula,and generalized the results in .
In this survey we study some interplay between classical complex analysis (removable sets for bounded analytic functions), harmonic analysis (singular integrals), and geometric measure theory (rectifiability).
Harmonic analysis on SL(2,?) and projectively adapted pattern representation) and projectively adapted pattern representation
Then,SL(2, ?)-harmonic analysis, in the noncompact picture of induced representations, is used to decompose patterns into the components invariant under irreducible representations of the principal series ofSL(2, ?).
The projectively adapted properties of theSL(2, ?)-harmonic analysis, as applied to the problems, in image processing, are confirmed by computational tests.
The convergence inL1 of singular integrals in harmonic analysis and ergodic theory