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8,9,10 and 11.
8,9,10 are related with Bergman space.

8. If G zEC: 0<I2<13 show that every f in L2(G) has a removable singularity 9. Which functions are in L2(C)? 10. Let G be an



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Camlin Page fin ala) has a emalable Siogulasity at 2. 2. c in Punctured dliss ch that 2. on . f has removable- gingularity at) 1. (e)こ all constant function 2 arin La 101 Let G be an open uhset of and claimR iccLosed ina ) fn is analytic and baunded2 but fn Cal =0 çhỉ is sec, u en ce in a Hilbert Space such that en that er-hn converges-in- cauchclaim gesinA e Ghan that Snisa cauchy sequen inh nzm cansidey G m by tiangle ineali Sn -5m seauencein outye is Hilhert sfaceaa s Co s cuchy Sequence. Hence is converacntin ye.

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