Generalized Global Symmetries https://t.co/WiyywgExKH
Generalized Global Symmetries
RT @nblqbl: What is the symmetry principle enforcing the conservation of higher dimensional objects? Nowadays we call these "higher form sy…
Şu iki dönemin sonunda bu makaleyi okuyabilirsem çok iyi olacak. https://t.co/VhfxxiuZrx
@Shinossaura @bibibailas A invenção da matemática jamais alcança a realidade física somente a tangencia! Generalized Global Symmetries - Davide Gaiotto, Anton Kapustin, Nathan Seiberg, Brian Willett https://t.co/s3dZFljYYF https://t.co/wVDS9Z74f8
@takasan_san_san 2番目はMaxwell方程式のうち左側に電荷や電流があるもののみがくりこみを受けるという当たり前の話の言い換えです。3番目はそれらがある意味でのカレントであると思うとphotonがちょうどNG粒子に当たると解釈できるという話です。: https://t.co/wcRGvyCYsj
From 1969 axial vector vertex in spinor electrodynamics https://t.co/mQukD3iTAr and the PCAC puzzle https://t.co/ULocAAVN0b to 2015 generalized global symmetries https://t.co/6sgcQJAqoR to 2022 https://t.co/czFu0k7nBZ noninvertible global symmetries in
@AlexJayBrady @chrisalbon Check out the abstract! https://t.co/Mozwo41EVI
@chrisalbon reminds me this a bit https://t.co/yFC1c5Q3ia
@kai_c_ @ThomasVanRiet2 The modern understanding of symmetries is that symmetries are the same thing as topological operators. What you're describing is likely a 1-form electric symmetry, whose associated topological operator of codimension 2 measures the
Dec 29 - Generalized Global Symmetries (‘14) https://t.co/UBxMTalt1F The idea of charges and symmetries has a higher form generalization, where the excitations are extended objects (strings, membranes). This is useful for understanding real world theori
요즘 이론물리 트렌드 중 하나가 얘 같은데 언제 공부하냐 https://t.co/bTou81m1RZ
@kai_c_ The standard reference is https://t.co/hIPs57cyMk
@kyow_QQ なんでループ群で中心を議論出来るのかというのは不思議ですよね.そういえば,ゲージ群の中心を議論するのに色んなループ演算子を使うという話は昔からあって,高次対称性というのを見てみるとループ演算子に伴う 1 形式対称性として中心が見えたりするという話があります:https://t.co/voP0xThOwu
@nu_phases @ThomasVanRiet2 @Quasilocal @SubhroneelC thanks for the paper (and the discussion!). i agree about large diffs in general, but i feel there's often a nicer way to think about the physics. (e.g. for QED I believe the 1-form symmetry is a useful
[1412.5148] Generalized Global Symmetries Davide Gaiotto, Anton Kapustin, Nathan Seiberg, Brian Willett https://t.co/5oM8o519e2
What is the symmetry principle enforcing the conservation of higher dimensional objects? Nowadays we call these "higher form symmetries", and they were explained in a beautiful paper from 2014 that influenced my own research greatly: 5/n https://t.co/f8t
RT @TomiyaAkio: E. H. Fradkin and S. H. Shenker, Phys. Rev. D 19 (1979) 3682. から続きの話。 https://t.co/0oBWSmG1zr の32ページとかに書いてあるやつ。
E. H. Fradkin and S. H. Shenker, Phys. Rev. D 19 (1979) 3682. から続きの話。 https://t.co/0oBWSmG1zr の32ページとかに書いてあるやつ。
@Naka_m 論文: https://t.co/qgjy3fcdMD subsec. 7.4 には正確にはSETと呼ぶべき、と書いてあった。ともかく、仕組みを解析した論文を出すよとかいてあるがたぶんまだ出てない。、
投稿日にアクセプトされちょる. I'm reading Generalized global symmetries http://t.co/0e7DqumUVO #springerlink
Generalized Global Symmetries http://t.co/wr3AC7DBuR
[1412.5148] Davide Gaiotto, Anton Kapustin, Nathan Seiberg, Brian Willett : Generalized Global Symmetries http://t.co/gyMIo4YVrK
Generalized Global Symmetries. http://t.co/wUwW54pRbe
[1412.5148] Davide Gaiotto, Anton Kapustin, Nathan Seiberg, Brian Willett : Generalized Global Symmetries http://t.co/gyMIo4YVrK