A bounded consistency theorem for strong summabilities

Strong convergence theorem for a class of multiple-sets split variational inequality problems in Hilbert spaces

In this paper, we introduce a new iterative algorithm for approximating a common solution of certain class of multiple-sets split variational inequality problems. The sequence of the proposed iterative algorithm is proved to converge strongly in Hilbert spaces. As application, we obtain some strong convergence results for some classes of multiple-sets split convex minimization problems.

A strong convergence theorem for solutions of zero point problems and fixed point problems

Zero point problems of the sum of two monotone mappings and fixed point problems of a strictly pseudocontractive mapping are investigated‎. ‎A strong convergence theorem for the common solutions of the problems is established in the framework of Hilbert spaces‎.

A Strong Nonimmersion Theorem For

This result was announced in [4] but difficulties [2] were found in the argument sketched there. It was conjectured in [4] that if n = 7(8), then RP ci R 2 " 0 ( W ) + 1 . Using techniques of [1] we have proved these immersions when <x(ri) = 5, 6, 8, or 9 (unpublished), thus establishing the precise immersion dimension in these cases. It is well known that the theorem is equivalent to showing t...

A Consistency Theorem

A Strong Local Consistency for Constraint Satisfaction

Filtering techniques are essential to efficiently look for a solution in a constraint network (CN). However, for a long time it has been considered that to efficiently reduce the search space, the best choice is the limited local consistency achieved by forward checking [15, 17]. However, more recent works [18, 4, 16] show that maintaining arc consistency (which is a more pruningful local consi...