The “bare” form of this specific quantity was first renormalized in a 1947 calculation that Hans Bethe purportedly did on a train ride to Schenectady (“skuh-NECK-tuh-dee”). For 10 points each:
[10h] Name this quantity whose “bare” form is a parameter in the Q·E·D Lagrangian. A process by which a photon is emitted and reabsorbed has a divergent energy, necessitating the renormalization of this quantity.
ANSWER: mass of an electron [or electron mass; accept positron mass; accept mass-energy in place of “mass”; prompt on bare mass by asking “of what particle?”]
[10e] The self-energy of an electron can be visualized as a 1-loop one of these drawings. In these drawings, photons are represented by wavy lines.
ANSWER: Feynman diagrams
[10m] Photon self-energy involves the creation of virtual electron-positron pairs, which causes the “polarization” of this quantum state. In Fock space, this state is often written simply as “ket zero.”
ANSWER: vacuum state [accept vacuum polarization]
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