On the Convergence of a Numerical Scheme for Solving Some Locational Equilibrium Problems
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Publication:5578714
DOI10.1137/0117113zbMath0187.18001OpenAlexW2018870832MaRDI QIDQ5578714
Publication date: 1969
Published in: SIAM Journal on Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/0117113
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Location problems with costs being sums of powers of Euclidean distances ⋮ Accelerating convergence in minisum location problem with \(\ell p\) norms ⋮ On the efficient solution of nonlinear finite element equations. I ⋮ On the global convergence of a generalized iterative procedure for the minisum location problem with \(\ell _{p }\) distances for \(p > 2\) ⋮ Optimal location on a sphere ⋮ Facility location in the presence of forbidden regions. I: Formulation and the case of Euclidean distance with one forbidden circle ⋮ Local convergence in Fermat's problem ⋮ Revisiting several problems and algorithms in continuous location with \(\ell _\tau \) norms ⋮ Locational analysis ⋮ A note on the Weber location problem ⋮ On solving unreliable planar location problems ⋮ A Weiszfeld algorithm for the solution of an asymmetric extension of the generalized Fermat location problem ⋮ On the Fermat—Weber problem with convex cost functions ⋮ Normative location theory: Placement in continuous space ⋮ Solution of location problems with radial cost functions ⋮ Local convexity results in a generalized Fermat-Weber problem ⋮ The Weiszfeld Algorithm: Proof, Amendments, and Extensions
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