Melvin.py
A user-friendly framework for building GPU-accelerated spectral simulations of 2-dimensional computational fluid dynamics problems. (by JamieJQuinn)
Melvin.py | BohemianEigenvaluesPython | |
---|---|---|
1 | 1 | |
5 | 1 | |
- | - | |
4.8 | 0.0 | |
over 2 years ago | almost 3 years ago | |
Python | Python | |
MIT License | MIT License |
The number of mentions indicates the total number of mentions that we've tracked plus the number of user suggested alternatives.
Stars - the number of stars that a project has on GitHub. Growth - month over month growth in stars.
Activity is a relative number indicating how actively a project is being developed. Recent commits have higher weight than older ones.
For example, an activity of 9.0 indicates that a project is amongst the top 10% of the most actively developed projects that we are tracking.
Stars - the number of stars that a project has on GitHub. Growth - month over month growth in stars.
Activity is a relative number indicating how actively a project is being developed. Recent commits have higher weight than older ones.
For example, an activity of 9.0 indicates that a project is amongst the top 10% of the most actively developed projects that we are tracking.
Melvin.py
Posts with mentions or reviews of Melvin.py.
We have used some of these posts to build our list of alternatives
and similar projects. The last one was on 2021-05-27.
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Trigger of a solar flare
It's actually Python running on a GPU with CuPy! If you're interested in playing about with it, you can find the code on github (it's the resistive tearing instability example).
BohemianEigenvaluesPython
Posts with mentions or reviews of BohemianEigenvaluesPython.
We have used some of these posts to build our list of alternatives
and similar projects. The last one was on 2021-05-27.
What are some alternatives?
When comparing Melvin.py and BohemianEigenvaluesPython you can also consider the following projects:
rootsMapPython - Fractals made from complex roots of all possible polynomials of certain degree (12 - 24) and small set of complex coefficients (2 or 3), littlewood polynomials included