%PDF-1.4 % 1 0 obj << /S /GoTo /D (09section.1) >> endobj 4 0 obj (1. Introduction) endobj 5 0 obj << /S /GoTo /D (09section.18) >> endobj 8 0 obj (2. The special McKay correspondence) endobj 9 0 obj << /S /GoTo /D (09section.30) >> endobj 12 0 obj (3. Zero locus of the ``multiplication by z'' map) endobj 13 0 obj << /S /GoTo /D (09section.32) >> endobj 16 0 obj (4. Specials and continued fractions) endobj 17 0 obj << /S /GoTo /D (09section.43) >> endobj 20 0 obj (5. Dimer models and quivers) endobj 21 0 obj << /S /GoTo /D (09subsection.44) >> endobj 24 0 obj (5.1. Dimer models) endobj 25 0 obj << /S /GoTo /D (09subsection.45) >> endobj 28 0 obj (5.2. Perfect matchings and characteristic polygons) endobj 29 0 obj << /S /GoTo /D (09subsection.46) >> endobj 32 0 obj (5.3. Zigzag paths and their slopes) endobj 33 0 obj << /S /GoTo /D (09subsection.49) >> endobj 36 0 obj (5.4. Quivers) endobj 37 0 obj << /S /GoTo /D (09subsection.50) >> endobj 40 0 obj (5.5. A quiver with relations associated with a dimer model) endobj 41 0 obj << /S /GoTo /D (09subsection.52) >> endobj 44 0 obj (5.6. Small cycles, minimal paths and weak equivalence) endobj 45 0 obj << /S /GoTo /D (09subsection.53) >> endobj 48 0 obj (5.7. Moduli space of quiver representations) endobj 49 0 obj << /S /GoTo /D (09subsection.54) >> endobj 52 0 obj (5.8. Perfect matchings and moduli spaces) endobj 53 0 obj << /S /GoTo /D (09subsection.56) >> endobj 56 0 obj (5.9. Quivers as categories) endobj 57 0 obj << /S /GoTo /D (09subsection.57) >> endobj 60 0 obj (5.10. McKay quiver and hexagonal dimer models) endobj 61 0 obj << /S /GoTo /D (09section.58) >> endobj 64 0 obj (6. Consistency conditions on dimer models) endobj 65 0 obj << /S /GoTo /D (09subsection.59) >> endobj 68 0 obj (6.1. Divalent node) endobj 69 0 obj << /S /GoTo /D (09subsection.61) >> endobj 72 0 obj (6.2. Consistent dimer models) endobj 73 0 obj << /S /GoTo /D (09subsection.63) >> endobj 76 0 obj (6.3. Related notions) endobj 77 0 obj << /S /GoTo /D (09section.67) >> endobj 80 0 obj (7. Adjacent zigzag paths and large hexagons) endobj 81 0 obj << /S /GoTo /D (09subsection.68) >> endobj 84 0 obj (7.1. Adjacent zigzag paths) endobj 85 0 obj << /S /GoTo /D (09subsection.73) >> endobj 88 0 obj (7.2. Large hexagons) endobj 89 0 obj << /S /GoTo /D (09subsection.78) >> endobj 92 0 obj (7.3. Large hexagons and the McKay quiver) endobj 93 0 obj << /S /GoTo /D (09section.79) >> endobj 96 0 obj (8. Consistent dimer models are non-degenerate) endobj 97 0 obj << /S /GoTo /D (09section.85) >> endobj 100 0 obj (9. Corner perfect matchings) endobj 101 0 obj << /S /GoTo /D (09section.100) >> endobj 104 0 obj (10. Description of the algorithm) endobj 105 0 obj << /S /GoTo /D (09subsection.101) >> endobj 108 0 obj (10.1. Removal of edges) endobj 109 0 obj << /S /GoTo /D (09subsection.107) >> endobj 112 0 obj (10.2. Inversion of arrows) endobj 113 0 obj << /S /GoTo /D (09subsection.111) >> endobj 116 0 obj (10.3. Examples) endobj 117 0 obj << /S /GoTo /D (09section.127) >> endobj 120 0 obj (11. Preservation of the consistency) endobj 121 0 obj << /S /GoTo /D (09section.133) >> endobj 124 0 obj (12. Zigzag paths and characteristic polygons) endobj 125 0 obj << /S /GoTo /D (09section.138) >> endobj 128 0 obj (13. Effect of Algorithm 10.1 on the moduli space) endobj 129 0 obj << /S /GoTo /D (09section.141) >> endobj 132 0 obj (14. Injectivity of the universal morphism) endobj 133 0 obj << /S /GoTo /D (09section.143) >> endobj 136 0 obj (15. Preservation of the tilting condition: A-Hilb\(C3\) versus A-Hilb\(C3\) minus A-Hilb\(C2\)) endobj 137 0 obj << /S /GoTo /D (09section.149) >> endobj 140 0 obj (16. Preservation of surjectivity: A-Hilb\(C3\) versus A-Hilb\(C3\) minus A-Hilb\(C2\)) endobj 141 0 obj << /S /GoTo /D (09section.184) >> endobj 144 0 obj (17. Some technical lemmas) endobj 145 0 obj << /S /GoTo /D (09section.194) >> endobj 148 0 obj (18. Preservation of the tilting condition: The general case) endobj 149 0 obj << /S /GoTo /D (09section.199) >> endobj 152 0 obj (19. Preservation of surjectivity: The general case) endobj 153 0 obj << /S /GoTo /D (09section.201) >> endobj 156 0 obj (20. Proof of Theorem 1.4) endobj 157 0 obj << /S /GoTo /D (09section*.202) >> endobj 160 0 obj (References) endobj 161 0 obj << /S /GoTo /D [162 0 R /FitBH] >> endobj 176 0 obj << /Length 2851 /Filter /FlateDecode >> stream xڥY[۶~Su){ii