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Page 1: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least

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Page 2: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 3: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 4: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 5: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 6: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 7: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 8: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 9: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 10: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 11: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 12: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 13: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 14: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 15: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 16: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 17: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least
Page 18: 17 Combinatorica - uni-bonn.de · COMBINATORICA 17 (3) (1997) 345-362 n) and As an example, if a — —(1,0, , 0), then f has at least n zeros (at 1, 2, . thus has dcgrcc at least

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