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MigMigg

Cart #49975 | 2018-03-05 | Code ▽ | Embed ▽ | License: CC4-BY-NC-SA
2

'x' to simulate. 'c' to reset.

A 1D heat diffusion demo where you can draw your own initial conditions.
The solve is via convolution with the heat kernel.

P#49976 2018-03-05 14:23 ( Edited 2018-03-06 03:21)


Diego
Diego

Neato. Simulations are always interesting.

I thought about making an Ising monte carlo simulation. It's simple and you get to see a phase transition by sliding a temperature slider.

P#49980 2018-03-05 16:05 ( Edited 2018-03-05 21:05)

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