Introduces a splitting iterative algorithm for common solutions of equilibrium and inclusion problems on Hadamard manifolds, with convergence proof and applications to minimization and minimax problems.
Newton’s m ethod on Riemannian manifolds and a geometric model for the human spine
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Splitting Algorithms of Common Solutions Between Equilibrium and Inclusion Problems on Hadamard Manifolds
Introduces a splitting iterative algorithm for common solutions of equilibrium and inclusion problems on Hadamard manifolds, with convergence proof and applications to minimization and minimax problems.
- A Riemannian gradient descent method for optimization on the indefinite Stiefel manifold