- Page 1 and 2: Hyperelliptic Curves, Continued Fra
- Page 3 and 4: A pseudo-elliptic integral Z x 6t p
- Page 5 and 6: A pseudo-elliptic integral Z x 6t p
- Page 7 and 8: A pseudo-elliptic integral Z x 6t p
- Page 9 and 10: Michael Somos’s Sequences The sto
- Page 11 and 12: Michael Somos’s Sequences The sto
- Page 13 and 14: Michael Somos’s Sequences The sto
- Page 15 and 16: Michael Somos’s Sequences The sto
- Page 17 and 18: Concerning (Bh) — thus 5-Somos
- Page 19 and 20: Concerning (Bh) — thus 5-Somos
- Page 21 and 22: Concerning (Bh) — thus 5-Somos
- Page 23 and 24: Concerning (Bh) — thus 5-Somos
- Page 25 and 26: The surprising integral Z X 6t dt p
- Page 27 and 28: The surprising integral Z X 6t dt p
- Page 29 and 30: The surprising integral Z X 6t dt p
- Page 31 and 32: Plainly, the equations detailing ps
- Page 33: Plainly, the equations detailing ps
- Page 37 and 38: Plainly, the equations detailing ps
- Page 39 and 40: Plainly, the equations detailing ps
- Page 41 and 42: Plainly, the equations detailing ps
- Page 43 and 44: Moreover, u ′ = a ′ + b ′√
- Page 45 and 46: Moreover, u ′ = a ′ + b ′√
- Page 47 and 48: Moreover, u ′ = a ′ + b ′√
- Page 49 and 50: Moreover, u ′ = a ′ + b ′√
- Page 51 and 52: Moreover, u ′ = a ′ + b ′√
- Page 53 and 54: Units and Torsion The notion unit e
- Page 55 and 56: Units and Torsion The notion unit e
- Page 57 and 58: Units and Torsion The notion unit e
- Page 59 and 60: Units and Torsion The notion unit e
- Page 61 and 62: Units in Quadratic Fields and Conti
- Page 63 and 64: Units in Quadratic Fields and Conti
- Page 65 and 66: Units in Quadratic Fields and Conti
- Page 67 and 68: Units in Quadratic Fields and Conti
- Page 69 and 70: Units in Quadratic Fields and Conti
- Page 71 and 72: Continued Fraction of the Square Ro
- Page 73 and 74: Continued Fraction of the Square Ro
- Page 75 and 76: Continued Fraction of the Square Ro
- Page 77 and 78: Continued Fraction of the Square Ro
- Page 79 and 80: To detail the continued fraction ex
- Page 81 and 82: To detail the continued fraction ex
- Page 83 and 84: To detail the continued fraction ex
- Page 85 and 86:
To detail the continued fraction ex
- Page 87 and 88:
There is a minor miracle. Because t
- Page 89 and 90:
There is a minor miracle. Because t
- Page 91 and 92:
There is a minor miracle. Because t
- Page 93 and 94:
There is a minor miracle. Because t
- Page 95 and 96:
There is a minor miracle. Because t
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I should point out that any actual
- Page 99 and 100:
I should point out that any actual
- Page 101 and 102:
I should point out that any actual
- Page 103 and 104:
Second, if we replace D by D + 1 th
- Page 105 and 106:
Second, if we replace D by D + 1 th
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In the course of studying continued
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In the course of studying continued
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What the Continued Fraction Does No
- Page 113 and 114:
What the Continued Fraction Does No
- Page 115 and 116:
What the Continued Fraction Does No
- Page 117 and 118:
What the Continued Fraction Does No
- Page 119 and 120:
The elliptic case When g = 1 we hav
- Page 121 and 122:
The elliptic case When g = 1 we hav
- Page 123 and 124:
The elliptic case When g = 1 we hav
- Page 125 and 126:
The elliptic case When g = 1 we hav
- Page 127 and 128:
The elliptic case When g = 1 we hav
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The −dh are in fact the abscissæ
- Page 131 and 132:
The −dh are in fact the abscissæ
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The −dh are in fact the abscissæ
- Page 135 and 136:
The −dh are in fact the abscissæ
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As it happens, a combinatorial/alge
- Page 139 and 140:
As it happens, a combinatorial/alge
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As it happens, a combinatorial/alge
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As it happens, a combinatorial/alge
- Page 145 and 146:
As it happens, a combinatorial/alge
- Page 147 and 148:
Elliptic Divisibility Sequences Now
- Page 149 and 150:
Elliptic Divisibility Sequences Now
- Page 151 and 152:
Elliptic Divisibility Sequences Now
- Page 153 and 154:
Elliptic Divisibility Sequences Now
- Page 155 and 156:
Elliptic Divisibility Sequences Now
- Page 157 and 158:
Elliptic Divisibility Sequences Now
- Page 159 and 160:
Elliptic Divisibility Sequences Now
- Page 161 and 162:
Elliptic Divisibility Sequences Now
- Page 163 and 164:
Remarkably, Ward introduces his seq
- Page 165 and 166:
Remarkably, Ward introduces his seq
- Page 167 and 168:
Remarkably, Ward introduces his seq
- Page 169 and 170:
Elliptic Division Polynomials I ins
- Page 171 and 172:
Elliptic Division Polynomials I ins
- Page 173 and 174:
Elliptic Division Polynomials I ins
- Page 175 and 176:
Elliptic Division Polynomials I ins
- Page 177 and 178:
4-Somos Suppose (Ch) = (. . . , 2,
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4-Somos Suppose (Ch) = (. . . , 2,
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4-Somos Suppose (Ch) = (. . . , 2,
- Page 183 and 184:
4-Somos Suppose (Ch) = (. . . , 2,
- Page 185 and 186:
4-Somos Suppose (Ch) = (. . . , 2,
- Page 187 and 188:
4-Somos Suppose (Ch) = (. . . , 2,
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Higher Genus There surely are analo
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Higher Genus There surely are analo
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Higher Genus There surely are analo
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Others can do worse, and better. If
- Page 197 and 198:
Others can do worse, and better. If
- Page 199 and 200:
A cute example à la Somos Whatever
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A cute example à la Somos Whatever
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References Rather than attempt a li