论文信息 - Stability, consistency and convergence of variable K-step methods for numerical integration of large systems of ordinary differential equations

Stability, consistency and convergence of variable K-step methods for numerical integration of large systems of ordinary differential equations

This paper describes a generalization of the Adams method for systems of ordinary differential equations from constant to variable step sizes. This entailed deriving integration formulae and proving the stability, consistency, and convergence of their solutions.

Peter Piotrowski

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