Abstract
ABSTRACTIn this article, we prove several new ergodic, weak, and strong convergence theorems for solutions to the following general second-order difference equationwhere A is a maximal monotone operator in a real Hilbert space H and {cn} and {θn} are positive real sequences. We do not assume A−1(0) ≠ ∅, and we prove among other things that the existence of solutions is in fact equivalent to the zero set of A being nonempty. These theorems provide new approximation results for zeroes of monotone operators, as well as significantly unify and extend previously known results by assuming much weaker conditions on the coefficients {cn} and {θn}.
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