Limitations to Fréchet’s metric embedding method

We introduce a new two-step method to approximate a solution of a nonlinear operator equation in a Banach space. An existence-uniqueness theorem and error estimates are provided for this iteration using Newton-Kantorovich-type assumptions and a technique based on a new system of recurrence relations

There are many methods in the literature for calculating conformations of a molecule subject to geometric constraints, such as those derived from two-dimensional NMR experiments. One of the most general ones is the EMBED algorithm, based on distance geometry, where all constraints except chirality a

The authors would like to draw your attention to the fact that the second author's name was stated incorrectly in the published version of their paper, and should be Chang Shui Zhang, as stated above. In addition the Abstract should read "This paper presents an algorithm which learns a distance met

The invariant embedding principle was applied to obtain closed analytical expressions of several magnitudes of interest in electron probe microanalysis [ ionization distribution function, /(qz) backscattering probability, etc. ] . This approach permits one easily to obtain solutions for a model whic

vation of the high accuracy feature, which is not addressed in [8,9], is generally not trivial, because embedding meth-In order to solve partial differential equations in complex geometries with a spectral type method, one describes an embedding ods usually produce solutions in Ͷ that are poorly reg