Bridging Computational Notions of Depth: Working Towards the Proof of Lemma 3 Post date January 18, 2025 Post author By Computational Technology for All Post categories In computation, computational-notions, depth-notions, lemma-3, notions-of-depth, random-sequences, randomness, strong-depth
Bridging Computational Notions of Depth: Variants of Strong Depth Post date January 17, 2025 Post author By Computational Technology for All Post categories In computation, computational-notions, continuous-semimeasures, depth-notions, discrete-semimeasures, notions-of-depth, semimeasures, strong-depth
Bridging Computational Notions of Depth: Here’s Why Strong Depth is Negligible Post date January 17, 2025 Post author By Computational Technology for All Post categories In computation, computational-notions, deep-sequences, depth-notions, martin-lof-random-sequences, notions-of-depth, randomness, strong-depth
Bridging Computational Notions of Depth: Members of Deep Classes Post date January 16, 2025 Post author By Computational Technology for All Post categories In bennet's-notion, computation, computational-notions, depth-notions, martin-lof-random-sequences, notions-of-depth, randomness, turing
Here’s Proof of the Slow Growth Law and Some Unobserved Consequences Post date January 16, 2025 Post author By Computational Technology for All Post categories In computable-semimeasures, computation, computational-notions, depth-notions, kolmogorov-complexity, notions-of-depth, slow-growth-law, what-is-slow-growth-law