A saddle-point theorem for a class of infinite games

A characterization of weighted L 2 I spaces in terms of their images under various integral transformations is derived, where I is an interval (finite or infinite). This characterization is then used to derive Paley-Wiener-type theorems for these spaces. Unlike the classical Paley-Wiener theorem, ou

## Abstract We consider the following generalization of the notion of a structure recursive relative to a set __X.__ A relational structure __A__ is said to be a Γ(__X__)‐structure if for each relation symbol __R__, the interpretation of __R__ in __A__ is ∑ relative to __X__, where β = Γ(__R__). We

using the restricted Hartree᎐Fock RHF method and the STO-3G basis set. Forty-nine minima and saddle points of different indices were found. At least seven stationary points representing bonded structures were detected in addition to those located using another search algorithm on the same level of t

Three domain decomposition methods for saddle point problems are introduced and compared. The first two are blockdiagonal and block-triangular preconditioners with diagonal blocks approximated by an overlapping Schwarz technique with positive definite local and coarse problems. The third is an overl