Lucas number

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The Lucas sequence is an integer sequence named after the mathematician François Édouard Anatole Lucas (1842–1891), who studied both that sequence and the closely related Fibonacci sequence. Individual numbers in the Lucas sequence are known as Lucas numbers. Lucas numbers and Fibonacci numbers form complementary instances of Lucas sequences.

The Lucas spiral, made with quarter-arcs, is a good approximation of the golden spiral when its terms are large. However, when its terms become very small, the arc's radius decreases rapidly from 3 to 1 then increases from 1 to 2.

The Lucas sequence has the same recursive relationship as the Fibonacci sequence, where each term is the sum of the two previous terms, but with different starting values.[1] This produces a sequence where the ratios of successive terms approach the golden ratio, and in fact the terms themselves are roundings of integer powers of the golden ratio.[2] The sequence also has a variety of relationships with the Fibonacci numbers, like the fact that adding any two Fibonacci numbers two terms apart in the Fibonacci sequence results in the Lucas number in between.[3]

The first few Lucas numbers are

2, 1, 3, 4, 7, 11, 18, 29, 47, 76, 123, 199, 322, 521, 843, 1364, 2207, 3571, 5778, 9349, ... . (sequence A000032 in the OEIS)

which coincides for example with the number of independent vertex sets for cyclic graphs of length .[1]

Definition

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As with the Fibonacci numbers, each Lucas number is defined to be the sum of its two immediately previous terms, thereby forming a Fibonacci integer sequence. The first two Lucas numbers are   and  , which differs from the first two Fibonacci numbers   and  . Though closely related in definition, Lucas and Fibonacci numbers exhibit distinct properties.

The Lucas numbers may thus be defined as follows:

 

(where n belongs to the natural numbers)

All Fibonacci-like integer sequences appear in shifted form as a row of the Wythoff array; the Fibonacci sequence itself is the first row and the Lucas sequence is the second row. Also like all Fibonacci-like integer sequences, the ratio between two consecutive Lucas numbers converges to the golden ratio.

Extension to negative integers

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Using  , one can extend the Lucas numbers to negative integers to obtain a doubly infinite sequence:

..., −11, 7, −4, 3, −1, 2, 1, 3, 4, 7, 11, ... (terms   for   are shown).

The formula for terms with negative indices in this sequence is

 

Relationship to Fibonacci numbers

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The first identity expressed visually

The Lucas numbers are related to the Fibonacci numbers by many identities. Among these are the following:

  •  
  •  
  •  
  •  
  •  
  •  , so  .
  •  
  •  ; in particular,  , so  .

Their closed formula is given as:

 

where   is the golden ratio. Alternatively, as for   the magnitude of the term   is less than 1/2,   is the closest integer to   or, equivalently, the integer part of  , also written as  .

Combining the above with Binet's formula,

 

a formula for   is obtained:

 

For integers n ≥ 2, we also get:

 

with remainder R satisfying

 .

Lucas identities

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Many of the Fibonacci identities have parallels in Lucas numbers. For example, the Cassini identity becomes

 

Also

 
 
 

where  .

 

where   except for  .

For example if n is odd,   and  

Checking,  , and  

Generating function

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Let

 

be the generating function of the Lucas numbers. By a direct computation,

 

which can be rearranged as

 

  gives the generating function for the negative indexed Lucas numbers,  , and

 

  satisfies the functional equation

 

As the generating function for the Fibonacci numbers is given by

 

we have

 

which proves that

 

and

 

proves that

 

The partial fraction decomposition is given by

 

where   is the golden ratio and   is its conjugate.

This can be used to prove the generating function, as

 

Congruence relations

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If   is a Fibonacci number then no Lucas number is divisible by  .

  is congruent to 1 modulo   if   is prime, but some composite values of   also have this property. These are the Fibonacci pseudoprimes.

  is congruent to 0 modulo 5.

Lucas primes

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A Lucas prime is a Lucas number that is prime. The first few Lucas primes are

2, 3, 7, 11, 29, 47, 199, 521, 2207, 3571, 9349, 3010349, 54018521, 370248451, 6643838879, ... (sequence A005479 in the OEIS).

The indices of these primes are (for example, L4 = 7)

0, 2, 4, 5, 7, 8, 11, 13, 16, 17, 19, 31, 37, 41, 47, 53, 61, 71, 79, 113, 313, 353, 503, 613, 617, 863, 1097, 1361, 4787, 4793, 5851, 7741, 8467, ... (sequence A001606 in the OEIS).

As of September 2015, the largest confirmed Lucas prime is L148091, which has 30950 decimal digits.[4] As of August 2022, the largest known Lucas probable prime is L5466311, with 1,142,392 decimal digits.[5]

If Ln is prime then n is 0, prime, or a power of 2.[6] L2m is prime for m = 1, 2, 3, and 4 and no other known values of m.

Lucas polynomials

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In the same way as Fibonacci polynomials are derived from the Fibonacci numbers, the Lucas polynomials   are a polynomial sequence derived from the Lucas numbers.

Continued fractions for powers of the golden ratio

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Close rational approximations for powers of the golden ratio can be obtained from their continued fractions.

For positive integers n, the continued fractions are:

 
 .

For example:

 

is the limit of

 

with the error in each term being about 1% of the error in the previous term; and

 

is the limit of

 

with the error in each term being about 0.3% that of the second previous term.

Applications

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Lucas numbers are the second most common pattern in sunflowers after Fibonacci numbers, when clockwise and counter-clockwise spirals are counted, according to an analysis of 657 sunflowers in 2016.[7]

See also

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References

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  1. ^ a b Weisstein, Eric W. "Lucas Number". mathworld.wolfram.com. Retrieved 2020-08-11.
  2. ^ Parker, Matt (2014). "13". Things to Make and Do in the Fourth Dimension. Farrar, Straus and Giroux. p. 284. ISBN 978-0-374-53563-6.
  3. ^ Parker, Matt (2014). "13". Things to Make and Do in the Fourth Dimension. Farrar, Straus and Giroux. p. 282. ISBN 978-0-374-53563-6.
  4. ^ "The Top Twenty: Lucas Number". primes.utm.edu. Retrieved 6 January 2022.
  5. ^ "Henri & Renaud Lifchitz's PRP Top - Search by form". www.primenumbers.net. Retrieved 6 January 2022.
  6. ^ Chris Caldwell, "The Prime Glossary: Lucas prime" from The Prime Pages.
  7. ^ Swinton, Jonathan; Ochu, Erinma; null, null (2016). "Novel Fibonacci and non-Fibonacci structure in the sunflower: results of a citizen science experiment". Royal Society Open Science. 3 (5): 160091. Bibcode:2016RSOS....360091S. doi:10.1098/rsos.160091. PMC 4892450. PMID 27293788.
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