@a4yster@levelsio They really want to keep you guys from the good air in Europe. Maybe its time for revolution. Here is @Canada governments recommendations
https://t.co/E2PMkSVk5E
Mindfulness is being able to separate your identity from ideology or political beliefs. Be present, your ideology and political beliefs are not in the room with us now.
An interactive 3D particle system visualizing dynamic attractors. Coded with Grok 4 from @xai using @threejs and custom GLSL shaders for particle behavior and post-processing effects like Unreal Bloom. Click morphs between generative patterns.
@heri@NVIDIAAI@nvidia@Dell@HP I understand the money incentive, but it costs nothing to release firmware so data/internet is safer. I think people with budgets would still buy more compute, everybody wants more GPU. Also our hardware is too old support modern AI tools like flash attention.
We have a bunch of @NVIDIAAI hardware, I asked @nvidia to provide latest security patches, which @dell and @hp just publish. They told me no because the hardware is EOL
https://t.co/1a1rlqN62k
Why not be resposible and just publish it publicly and let people patch their hardware
@nvidia is one of the largest tech companies in the world. Yet it does not publicly release security patches like @dell@hp
https://t.co/1a1rlqN62k
Support refuses to provide the patches need to secure , @NVIDIAAI hardware stating EOL. Even though they have them. Why?
The Thomas attractor is a mathematical concept in dynamical systems theory representing a type of chaotic space phase that exhibits cyclic symmetry. It was named after René Thomas, the mathematician who introduced it in 1979.
The system is strictly related to the Lorenz attractor another famous chaotic evolutionary space manifold. The 3D Thomas attractor is represented by the combination of three differential equations where the symmetry is invariant under rotations of 120° (or 2π/3 radians) around the x y z axis which are the space coordinates, plus μ (mu) that is a parameter controlling the behavior. The attractor is characterized by a chaotic tendency and it’s sensitive to initial conditions, meaning that as μ increases, the motion undergoes period-doubling bifurcations leading to chaos. A good visualization of this spacetime manifold is a twisted, spiral-shaped structure with 3-fold symmetry where each spiral arm is symmetric with respect to the central axis, like the one displayed below.
The chaotic evolution of this attractor demonstrates the geometric beauty and complexity of unpredictable systems.
@langchain@AnthropicAI I mean it in a good way as we only use local models anyway. I was looking for artifacts alternative yesterday and today there is an answer!