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InertialObservr's profile
〈 Berger | Dillon 〉
〈 Berger | Dillon 〉
〈 Berger | Dillon 〉
@InertialObservr

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〈 Berger | Dillon 〉

@InertialObservr

PhD student of Theoretical Particle Physics @UCIrvine l @NSF Fellow l Physics & Math Animations l Patreon: https://www.patreon.com/inertialobserver …

DC → CA
youtube.com/c/InertialObse…
Joined August 2015

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    1. Lucas Bouck‏ @LukeBouck 8 Jan 2019
      • Report Tweet
      • Report NetzDG Violation

      Lucas Bouck Retweeted Analysis Fact

      Another fun fact is if f is bounded variation, then f’ exists almost everywhere and is integrablehttps://twitter.com/AnalysisFact/status/1082675901450649602 …

      Lucas Bouck added,

      Analysis Fact @AnalysisFact
      If a function f: [a, b] -> R is absolutely continuous, f has bounded variation.
      1 reply 0 retweets 2 likes
    2. 〈 Berger | Dillon 〉‏ @InertialObservr 8 Jan 2019
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      Replying to @LukeBouck

      "All functions are integrable if you're good enough" -Gauss

      1 reply 0 retweets 1 like
    3. Lucas Bouck‏ @LukeBouck 8 Jan 2019
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      Replying to @InertialObservr

      for the lebesgue integral, fundamental theorem of calculus holds iff f is absolutely continuous so good luck

      1 reply 0 retweets 0 likes
    4. 〈 Berger | Dillon 〉‏ @InertialObservr 8 Jan 2019
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      Replying to @LukeBouck

      Look, I agree.. don't tell that to me.. tell that to Gauss

      1 reply 0 retweets 1 like
    5. Lucas Bouck‏ @LukeBouck 8 Jan 2019
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      Replying to @InertialObservr

      Me: Hey Carl. This is hard but I proved some nice related results Gauss: I discovered all that 30 years ago and just forgot to publish Me: 😥

      1 reply 0 retweets 2 likes
    6. 〈 Berger | Dillon 〉‏ @InertialObservr 8 Jan 2019
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      Replying to @LukeBouck

      It's kind of weird to think that people called him Carl

      1 reply 0 retweets 0 likes
    7. Lucas Bouck‏ @LukeBouck 8 Jan 2019
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      Replying to @InertialObservr

      Possibly but maybe he liked formality and was always Mr. Gauss

      1 reply 0 retweets 0 likes
      〈 Berger | Dillon 〉‏ @InertialObservr 8 Jan 2019
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      Replying to @LukeBouck

      Or maybe people just called him god

      9:38 AM - 8 Jan 2019 from Irvine, CA
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      • Lucas Bouck
      0 replies 0 retweets 1 like

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