Glycogenic Journey of the Britains
A successor to Flenary of Ukrainian Town.
Current members: 122
1. La admisible = 13,824 (Spanish for "The Admissible")
2. Profundidad del mundo = 7^11^13 = 7^34,522,712,143,931 ~ 2.954*10^29,175,076,368,812 (Spanish for "Depth of the World")
3. Нигде = 1/10^10^100,000,000,000 (Russian for "Nowhere")
4. Бромид натрия = 10^^50 (Russian for "Sodium Bromide")
5. Зажги его миллионом звезд = 1,000,000{1,000,000}1,000,000 in hyperoperator notation (Russian for "Light it up with one million stars")
6. Amore nella sua distruzione = 502,592,611,936,843 = 43^9 (Italian for "Love in his destruction")
7. Nessun diamante in esplorazione = 230^230 ~ 1.5754415*10^543 (Italian for "No diamonds in exploration")
8. Complimentary = 271
9. Zilupe = 4^^768 & 192 in BEAF tetrational arrays
10. Bring em' up, just no damage = 52,521,875 = 35^5
11. More than just one child will evolve = 222,111 = 333*667 = 666th triangular number
12. Allies of the Falklands = 98,765
13. Sorry for my home collapse! = 1/E100##100#100 = 1/graatagold
14. Chemical bomb = 10^(3*10^10^1,000+3)
15. Tuk Tuk = 10^10^10,000
16. Pacific Swarms = 34,359,738,368 = 2^35
17. Outlaw = 1,152
18. You're poisoned with carbon monoxide and you died!!! = e^(1/384) ~ 1.002607560454 (*formerly You're poisoned with cyanide and you died!!!)
19. Bring it! = 399
20. Buts of carnage = Circle(69) in Steinhaus-Moser notation
21. Tapa de la muerte = Hexagon(1,200) in Steinhaus-Moser notation (Spanish for "Death cap")
22. Bugonarew = 1,000,555,666,555,444,001
23. African Panda = 979,979
24. Yhaaaaaaaaaaaaaaaaqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqqq = 99[9,9,0,0,0,99,142857,1337,1,1,1,1,1,1,1,1,1,10^^yultillion,69!420] using Extensible Illion System, where yultillion = 10^(3*10^(3*10^(2.4*10^43))+3) (8*10^42-th Tier 3 -illion), and ! indicates the Hyperfactorial array notation.
25. Sultan Nirvana = 420£ using BOX_M~'s £ function
26. Blizzard = 135¥ using BOX_M~'s ¥ function
27. Lightning Fumes = 135¥~ using BOX_M~'s ¥~ function
28. Greenlandillion = 1/3^^^3 = 1/3^^7,625,597,484,987 = 1/tritri
29. Fart = 55,555
30. Inari Suomi = 2,304
31. The Message = 2^^2,048
32. Belarusian Border = Booga(Inari Suomi) = 2,304{2,302}2,304 = 2,304^^^^^...^^^^^2,304 w/ 2,302 arrows
33. Crying Child of Macedonians = 52,947
34. Anamona Rabier = A(17,11) using Ackermann function
35. Mika-Polska = E(672) using Exploding Tree Function
36. Bratislava = A(5,5) using Ackermann function
37. Lake Lubans = 10↓↓↓↓↓↓↓↓↓↓10 (10 down arrows) using down-arrow notation
38. Super Anamona Rabier = A(Anamona Rabier, Anamona Rabier) using Ackermann function
39. Super Mario Sisters = 10^10^12,431 = 10^Marioplex
40. Minecraftduplex = 10^10^10^215 = 10^Minecraftplex
41. Porcelain = 91,125
42. Miku Miku the Hard Rave = cg(2,147,483,647) = cg(TNT)
43. Hungarian Bezers = 7^^^^^^^7
44. Darknessful = 65^3 = 274,625
45. Toxic Lake = 1/Bratislava
46. Little Duchy = s(99)(99) using Fish's s(n) map
47. Grand Duchy = m(9)m(8)m(7)m(6)m(5)m(4)m(3)m(2)m(1)(99) using Fish's m(n) map
48. Great Grand Duchy = m(1,4)m(1,3)m(1,2)m(1,1)(99) using Fish's m(m,n) map
49. Solar Sandworm = Worm(768)
50. Irish Hydra = Hydra(420) (Kirby-Paris hydra function)
51. Maltese British Catholic Church = N_{ω^ω^ω^ω^ω^ω}(100) using N-growing hierarchy
52. Dark Jugoslavia = 432,157,848
53. Ethereal Lumoform = 2^^1,048,576
54. Asteroix = 999,888,777,666,555,444,333,222,111,000
55. Entry of the Death = 123,456,789,987,654,321
56. Mario World Gods Super Duper Eternal = 10^10^10^12,431 = 10^10^Marioplex = 10^Super Mario Systers
57. Minecrafttriplex / Minecraftgargantulene = 10^10^10^10^215 = 10^10^Minecraftplex = 10^Minecraftduplex
58. Yerevan = 10^^^1,000,000
59. Rainery = 99{99}99 in Bowers' hyperoperator notation = 99^^^^^...^^^^^99 with 99 arrows
60. Nether Update = f_{ω^ω}(576) using the fast-growing hierarchy
61. Caves and Cliffs = f_ε0(576) using the fast-growing hierarchy
62. The Wild Update = f_ζ0(576) using the fast-growing hierarchy
63. Mariupol = f_Γ0(576) using the fast-growing hierarchy
64. Białystok = f_{ψ0(Ω^Ω^Ω)}(576) using the fast-growing hierarchy (extended Buchholz's function, ψ0(Ω^Ω^Ω) denotes the large Veblen ordinal)
65. Belgorod = f_{ψ0(Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^5(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
66. Sevastopol = f_{ψ0(Ω^Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^6(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
67. Osmium tetroxide = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^7(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
68. Urushiol = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^8(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
69. Ice Cream Monolith = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^9(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
70. The Icy Wall = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω)}(576) = f_{ψ0(ψ1^10(0))}(576) using the fast-growing hierarchy (extended Buchholz's function)
71. Wallis and Futunaillion = Rayo(314π) ~ Rayo(986.46009322719507687727002234976) where π is the "Pi" constant, and Rayo denotes the Rayo function
72. Osuna = f_{ε_ω}(420) using the fast-growing hierarchy
73. Humonurgium = f_{φ(ω,0)}(420) using the fast-growing hierarchy
74. Võro = f_{ψ0(Ω^Ω^ω)}(420) using the fast-growing hierarchy (extended Buchholz's function, ψ0(Ω^Ω^ω) denotes the small Veblen ordinal)
75. Zitrite = f_{ψ0(Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^3(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
76. Nightmare Fuel = f_{ψ0(Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^4(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
77. Delightful Dreams = f_{ψ0(Ω^Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^5(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
78. Zakopane = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^6(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
79. Midland Ponds = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^7(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
80. Haunted Rift = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^8(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
81. World Thread = f_{ψ0(Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω^Ω^ω)}(420) = f_{ψ0(ψ1^9(ψ0(0)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
82. The U.L.T.I.M.A.T.E Pocket = f_{ψ0(Ω_2)}(420) using the fast-growing hierarchy (extended Buchholz's function, ψ0(Ω_2) denotes the Bachmann-Howard ordinal)
83. The H.Y.P.E.R Pocket = f_{ψ0(Ω_3)}(420) using the fast-growing hierarchy (extended Buchholz's function)
84. The M.E.T.A Pocket = f_{ψ0(Ω_4)}(420) using the fast-growing hierarchy (extended Buchholz's function)
85. E.V.E.R.Y.T.H.I.N.G Pocket = f_{ψ0(Ω_ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
86. S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket = f_{ψ0(Ω_{ω+1})}(420) using the fast-growing hierarchy (extended Buchholz's function, ψ0(Ω_{ω+1}) = ψ0(ε(Ω_ω+1)) = Takeuti-Feferman-Buchholz ordinal)
87. M.E.G.A S.U.P.E.R. E.V.E.R.Y.T.H.I.N.G Pocket = f_{ψ0(Ω_{ω+2})}(420) using the fast-growing hierarchy (extended Buchholz's function)
88. G.I.G.A. M.E.G.A S.U.P.E.R E.V.E.R.Y.T.H.I.N.G Pocket / G..M..S..E Pocket = f_{ψ0(Ω_{ω2})}(420) using the fast-growing hierarchy (extended Buchholz's function)
89. T.E.R.A G.I.G.A M.E.G.A S.U.P.E.R. E.V.E.R.Y.T.H.I.N.G Pocket / T..G..M..S..E Pocket = f_{ψ0(Ω_{ω3})}(420) using the fast-growing hierarchy (extended Buchholz's function)
90. D..T..G..M..S..E Pocket = f_{ψ0(Ω_{ω^2})}(420) using the fast-growing hierarchy (extended Buchholz's function)
91. T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{ω^3})}(420) using the fast-growing hierarchy (extended Buchholz's function)
92. E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{ω^ω})}(420) using the fast-growing hierarchy (extended Buchholz's function)
93. A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{ω^ω^ω})}(420) using the fast-growing hierarchy (extended Buchholz's function)
94. C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω))}(420) using the fast-growing hierarchy (extended Buchholz's function)
95. O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω^2))}(420) using the fast-growing hierarchy (extended Buchholz's function)
96. O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω^Ω))}(420) using the fast-growing hierarchy (extended Buchholz's function)
97. U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω^Ω^Ω))}(420) using the fast-growing hierarchy (extended Buchholz's function)
98. M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_2))}(420) using the fast-growing hierarchy (extended Buchholz's function)
99. S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_3))}(420) using the fast-growing hierarchy (extended Buchholz's function)
100. S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_ω))}(420) using the fast-growing hierarchy (extended Buchholz's function)
101. M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_{ω+1}))}(420) using the fast-growing hierarchy (extended Buchholz's function)
102. M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_ψ0(Ω)))}(420) using the fast-growing hierarchy (extended Buchholz's function)
103. E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_ψ0(Ω_ψ0(Ω_ψ0(Ω))))}(420) using the fast-growing hierarchy (extended Buchholz's function)
104. S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
105. M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{Ω+1})}(420) using the fast-growing hierarchy (extended Buchholz's function)
106. G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{Ω2})}(420) using the fast-growing hierarchy (extended Buchholz's function)
107. T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{Ωω})}(420) using the fast-growing hierarchy (extended Buchholz's function)
108. D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{Ω^2})}(420) using the fast-growing hierarchy (extended Buchholz's function)
109. T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{Ω^Ω})}(420) using the fast-growing hierarchy (extended Buchholz's function)
110. E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_{ψ1(Ω_2)})}(420) using the fast-growing hierarchy (extended Buchholz's function)
111. A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_2)}(420) using the fast-growing hierarchy (extended Buchholz's function)
112. C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_3)}(420) using the fast-growing hierarchy (extended Buchholz's function)
113. O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
114. O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_ψ0(Ω_Ω))}(420) using the fast-growing hierarchy (extended Buchholz's function)
115. U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
116. M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
117. S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
118. S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
119. M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
120. M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω_Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
121. E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Ω_Ω_Ω_Ω_Ω_Ω_Ω_Ω_Ω)}(420) using the fast-growing hierarchy (extended Buchholz's function)
122. M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E..M..M..S..S..M..U..O..O..C..A..E..T..D..T..G..M..S..E Pocket = f_{ψ0(Λ)}(420) = f_{ψ0(Ω_Ω_Ω_..._Ω_Ω_Ω)}(420) (419 Ω's) using the fast-growing hierarchy (extended Buchholz's function, where ψ0(Λ) denotes the countable limit of extended Buchholz's function, and Λ denotes the least omega fixed point)
*also shortened to M..M..S..S....T..G..M..S..E Pocket