### Table 2: An exotic ternary representation of the first few positive integers.

"... In PAGE 5: ... Proposition 5. Every nonnegative integer N has precisely one representation of the form N = X i 0 dipi; 0 di 2; di+1 = 2 =) di = 0 (i 2 Z0): The representation of the rst few positive integers in this numeration system is depicted in Table2 . Is there any connection with Table 1? Well, note that the pair... ..."

### Table 2: An exotic ternary representation of the first few positive integers.

"... In PAGE 6: ...The representation of the rst few positive integers in this numeration system is depicted in Table2 . Is there any connection with Table 1? Well, note that the pair (1; 3) has representation (1; 10) where the rst component ends in an even number (zero) of 0s, and the second component is the \left shift quot; of 1: The left shift of N = Pi 0 dipi is L(N) = Pi 0 dipi+1.... ..."

### Table 2: An exotic ternary representation of the first few positive integers.

"... In PAGE 6: ...The representation of the rst few positive integers in this numeration system is depicted in Table2 . Is there any connection with Table 1? Well, note that the pair (1; 3) has representation (1; 10) where the rst component ends in an even number (zero) of 0s, and the second component is the \left shift quot; of 1: The left shift of N = Pi 0 dipi is L(N) = Pi 0 dipi+1.... ..."

### Table 2.1. BER compression for 32 bit positive integers.

### Table 1. Examples of ( ; )-dominating sets, N is the set of positive integers, N0 is the set of nonnegative integers.

"... In PAGE 51: ...A.Telle (see [2, 3]) as generalization of some known notions (see Table1 for examples).... ..."

### Table 1. Fredholm determinants (27) for the quadratic map transfer operators L.k/, for k a positive integer.

### Table 1. Fredholm determinants (27) for the quadratic map transfer operators L(k), for k a positive integer.

### Table 2. Self-dual CS solitons for the sign of and various values of e (n means a positive integer and means an arbitrary real number).

### TABLE I DEFINITION OF THE MOST IMPORTANT SPL CONSTRUCTS IN BACKUS-NAUR FORM; n;k ARE POSITIVE INTEGERS, ;ai REAL NUMBERS.

### Table 1. The results of grouping the motion categories and varying the dimension of the projected space. In the second column, the number of unique integers indicates the number of motion categories, and the position of the integer indicates which motions belong to that category.

2005

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