A NULLSTELLENSATZ FOR AMOEBAS

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442 KEVIN PURBHOO (1) c 1 n D 1 ((1 + γ n ) c 0n D 0 − 1) < 1/2; (2) (1 + γ n ) c 0n D 0 < 3/2. Proof We have Also, ( (8 ) n log γ −1 ≥ D 0 + D 1 log n + log 0 c 1 3)c ⇔ γ −n ≥ ( 8 3) c 0 n D 0 c 1 n D 1 ⇔ c 0 n D 0 γ n 3 ≤ . (A.1) 8c 1 n D 1 3 ( 1 ) ≤ − 1 ( 1 ) 2 8c 1 n D 1 2c 1 n D 1 2 2c 1 n D 1 ( < log 1 + 1 ) 2c 1 n D 1 (A.2) ( 3 < log . 2) (A.3) Using (A.1), (A.2), and the fact that log(1 + γ n )
A NULLSTELLENSATZ FOR AMOEBAS 443 CALCULATION A.2 Assume that c ≥ 1, 0
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Page 41 and 42: 448 DAVID GINZBURG The method we us
Page 43 and 44: 450 DAVID GINZBURG Let ν denote a
Page 45 and 46: 452 DAVID GINZBURG Proof The proof
Page 47 and 48: 454 DAVID GINZBURG correspond to th
Page 49 and 50: 456 DAVID GINZBURG Next, consider t
Page 51 and 52: 458 DAVID GINZBURG To state the fol
Page 53 and 54: 460 DAVID GINZBURG check that up to
Page 55 and 56: 462 DAVID GINZBURG where L τ (¯s)
Page 57 and 58: 464 DAVID GINZBURG To define the li
Page 59 and 60: 466 DAVID GINZBURG cuspidality of t
Page 61 and 62: 468 DAVID GINZBURG immediately foll
Page 63 and 64: 470 DAVID GINZBURG expansion. Here
Page 65 and 66: 472 DAVID GINZBURG Notice that S l
Page 67 and 68: 474 DAVID GINZBURG values of m ′
Page 69 and 70: 476 DAVID GINZBURG For 1 ≤ i ≤
Page 71 and 72: 478 DAVID GINZBURG 2m rows, we have
Page 73 and 74: 480 DAVID GINZBURG left to right. C
Page 75 and 76: 482 DAVID GINZBURG unipotent orbit
Page 77 and 78: 484 DAVID GINZBURG for every choice
Page 79 and 80: 486 DAVID GINZBURG is equal to L(σ
Page 81 and 82: 488 DAVID GINZBURG Here f π (h) is
Page 83 and 84: 490 DAVID GINZBURG character ψ Um
Page 85 and 86: 492 DAVID GINZBURG Proof The proof
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494 DAVID GINZBURG in the above ref
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496 DAVID GINZBURG THEOREM 7 The ir
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498 DAVID GINZBURG In the above, th
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500 DAVID GINZBURG is GL 2m+1 × SO
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502 DAVID GINZBURG [GP] S. GELBART
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A CHARACTERIZATION OF SUBSPACES AND
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DEGREE GROWTH OF MEROMORPHIC SURFAC
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DISTORTION OF HAUSDORFF MEASURES AN
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574 MARCHÉ and NARIMANNEJAD them w
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576 MARCHÉ and NARIMANNEJAD 1.1. P
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578 MARCHÉ and NARIMANNEJAD 2.1. T
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580 MARCHÉ and NARIMANNEJAD Figure
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582 MARCHÉ and NARIMANNEJAD Figure
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584 MARCHÉ and NARIMANNEJAD Defini
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586 MARCHÉ and NARIMANNEJAD [A2] [
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A NULLSTELLENSATZ FOR AMOEBAS

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