### Table 1: Numbers of fullerenes and IPR-fullerenes with corresponding num- bers of fullerenes and IPR-fullerenes in one row. A stands for the number of vertices, B for the number of fullerenes and C for the number of IPR- fullerenes.

"... In PAGE 8: ... This speculation was supported by the fact that no such spherical cage structure with isolated pentagons exists with less than 60 or with between 61 or 69 atomic positions, while fullerene-type cages with any even number of positions from 70 positions on do exist (cf. Table1 ) { well in accordance with the observation that no signals indicating the existence of molecules consisting of n Carbon atoms were discernible for any n between 61 and 69 while C70 clusters did show up, though considerably less pronounced than the C60 ones. These observations mark a turning point in Carbon chemistry.... In PAGE 13: ... Constructing all relevant patch structures in this way and taking lots of care regarding the use of memory and the implementation of the gluing procedure (using in particular a sophisticated lexicographic coding method to also make sure that the resulting list of fullerene structures never contains two structurally isomorphic copies, thereby taking orientation either into account or neglecting it), we have computed all fullerene structures for up to n = 170 atoms, as well as for up to n = 214 atoms those special structures which obey the isolated pentagon rule (IPR) { that is, structures where every pentagon is surrounded by hexagons, only. Table1 records the number of structures we have found. It seems remark- able that for n 38 the number F (n) of all fullerene isomers with n atoms roughly coincides with the number FIPR(n + 48) of all IPR-fullerene isomers with n + 48 atoms, and that for n divisible by 4 the di erence between F (n) and F (n ? 2) roughly coincides with the di erence between F (n + 2) and... ..."

### Table 4: IQ results for IP Fullerenes up to 80 atoms

"... In PAGE 8: ... Extreme cases are shown in Figures 6 and 7. The Table4 shows the results for all isolated pentagon (IP) Fullerenes with up to 80 vertices. The identi cation of IP fullerenes follows the one of Table A.... In PAGE 8: ... In addition to the NiceGraph and Standard Laplace we also include their coordinates obtained by Molecular Mechanics MM3 method from 27. It is clear that all fullerenes in Table4 have high IQ and small . They are spherical and all faces almost planar.... ..."

### Table 4: Measurement invariance results

2006

"... In PAGE 28: ... Finally, measurement invariance is assessed between male and female respondents based on the P2P non-users measurement model (model 3) with ease-of-use, perceived usefulness and perceived risk and its two subconstructs, and the construct of collection-from-near-others. Table4 presents the outcome for measurement invariance. Insert Table 4 Configural invariance is met since confirmatory analyses show that the pattern of how items load on constructs is invariant across groups (users, non-users, male/female).... ..."

### Table 1. Factor structure among 18 journals citing Fullerene, Science and Technology in 1996

2007

"... In PAGE 11: ...Table 1. Factor structure among 18 journals citing Fullerene, Science and Technology in 1996 Table1 shows the organization of the 18 journals which cite Fullerene, Science and Technology in 1996, in four dimensions explaining 49.2% of the variance.... ..."

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### Table 1. The embedded graph invariant

"... In PAGE 2: ... In the process, simple formulae, such as the de nition (1), become apparent, and the properties and examples can be developed rapidly. Table1 gives some examples of the evaluation of the invariant for 4-valent graphs and links.... ..."

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### TABLE I RELEVANT GRAPH INVARIANTS OF THE GRAPHS USED.

### Table 2. Factor structure among 14 journals citing Fullerene, Nanotubes and Carbon Nanostructures in 2004.

2007

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### Table 1: A rewriting of a part of Table 2 of [10], giving the canonical codes of all fullerenes on 30 vertices.

2000

"... In PAGE 7: ... Note that the sequence 43323p; : : : is not realizable for any position p. Some codes for small fullerenes are listed in Table1 , rewritten from [10] in our shorthand notation. The C380 fullerene without a spiral can be described as follows: C380 = 536133(5268)252675266536653612 The Tutte graph [1] is:... ..."

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### Table 1: Numbers of fullerenes and IPR-fullerenes

"... In PAGE 18: ...Part 5: Results Table1 gives the numbers of all fullerenes generated so far. IPR-fullerenes are fullerenes where no two pentagons share an edge (Isolated Pentagon Rule).... ..."

### Table 1: Event probabilities for causal structures Event Graph 0 Graph 1 Graph 2

2004

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