Superincreasing sequence

In mathematics, a sequence of positive real numbers ${\mathbf {s_{1},s_{2},...}}$ is called superincreasing if every element of the sequence is greater than the sum of all previous elements in the sequence. ^[1]^[2]

Formally, written:

$s_{{n+1}}>\sum _{{j=1}}^{n}s_{j}$

Example

For example, (1,3,6,13,27,52) is a superincreasing sequence, but (1,3,4,9,15,25) is not.^[2] The following Python source code tests a sequence of numbers to determine if it is superincreasing:

sequence = [1,3,6,13,27,52]
total = 0
test = True
for n in sequence:
    print("Sum: ", total, "Element: ", n)
    if n <= total: 
        test = False
        break
    total += n

print("Superincreasing sequence? ", test)

This produces the following output:

Sum:  0 Element:  1
Sum:  1 Element:  3
Sum:  4 Element:  6
Sum:  10 Element:  13
Sum:  23 Element:  27
Sum:  50 Element:  52
Superincreasing sequence?  True

References

↑ Richard A. Mollin, An Introduction to Cryptography (Discrete Mathematical & Applications), Chapman & Hall/CRC; 1 edition (August 10, 2000), ISBN 1-58488-127-5
1 2 Bruce Schneier, Applied Cryptography: Protocols, Algorithms, and Source Code in C, pages 463-464, Wiley; 2nd edition (October 18, 1996), ISBN 0-471-11709-9

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Superincreasing sequence

Example

See also

References