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antonio vergari ⚔️
antonio vergari ⚔️ @tetraduzione ·
Less than two weeks to submit your papers on: 📈 #lowrank adapters and #factorizations 🧊 #tensor networks 🔌 probabilistic #circuits 🎓 #theory of factorizations to the first workshop on connecting them in #AI #ML at @RealAAAI please share! 🔁 👇👇👇 april-tools.github.io/colorai/
antonio vergari ⚔️ antonio vergari ⚔️ @tetraduzione ·
many of the recent successes in #AI #ML are due to #structured low-rank representations! but...What's the connection between #lowrank adapters, #tensor networks, #polynomials and #circuits? join our @RealAAAI workshop to know the answer! 👇👇april-tools.github.io/colorai/TThh
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antonio vergari ⚔️
antonio vergari ⚔️ @tetraduzione ·
Submit your papers on #lowrank #factorizations & #representations in #AI to our workshop at @RealAAAI in Philadelphia! we have an amazing line-up of speakers: 👉april-tools.github.io/colorai/👈 @nadavcohen Guillaume Rabusseau, Yannis Panagakis and @andrewgwilsxq
antonio vergari ⚔️ antonio vergari ⚔️ @tetraduzione ·
many of the recent successes in #AI #ML are due to #structured low-rank representations! but...What's the connection between #lowrank adapters, #tensor networks, #polynomials and #circuits? join our @RealAAAI workshop to know the answer! 👇👇april-tools.github.io/colorai/TThh
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Tombotic
Tombotic @Tombotic ·
I MEAN, C’MON, TELL US SOMETHING WE DON’T KNOW SCOTT… @thingdoms @skominers #MATH #IMAROBOT #FACTORIZATIONS
Scott Kominers Scott Kominers @skominers ·
2022 is the first year (A.D./C.E.) such that it (2022 = 2 × 3 × 337), the next year (2023 = 7 × 17^2), the year after that (2024 = 2^3 × 11 × 23), and the year after that (2025 = 3^4 × 5^2) have maximal exponents in their prime factorizations respectively equal to 1, 2, 3, and 4.
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