Tipping points in our climate predictions are both wildly dramatic and wildly uncertain. Can mathematicians make them useful?
Abstract: Inhomogeneous linear ordinary differential equations (ODEs) and systems of ODEs can be solved in a variety of ways. However, hardware circuits that can perform the efficient analog ...
Sparse methods are primarily valuable for systems in which the number of non-zero entries is substantially less than the overall size of the matrix. Such situations are common in physical systems, ...
In January I wrote a piece titled “ 5 Physics Equations Everyone Should Know .” Lots of you weighed in with your own ...
A scientific statement has been published by the AHA and ACC regarding using risk assessment for BP management for prevention of CVD.
Stochastic dynamical systems arise in many scientific fields, such as asset prices in financial markets, neural activity in ...
Physicist Albert Einstein famously posited that if he only had an hour to crack a daunting problem, he'd devote 55 minutes to ...
Thriving in an exponential world requires more than a better strategy. It demands quantum thinking, the shift from linear ...
Abstract: Nonlinear equations systems (NESs) are widely used in real-world problems and they are difficult to solve due to their nonlinearity and multiple roots. Evolutionary algorithms (EAs) are one ...
This repository is an implementation of the NeurIPS 2024 paper: IPM-LSTM: A Learning-Based Interior Point Method for Solving Nonlinear Programs. Constrained Nonlinear Programs (NLPs) represent a ...
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