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103b5063f2
This change removes TrialDivision#cache, TrialDivision#primes, and TrialDivision#primes_so_far. TrialDivision class is undocumented officially, so this class is used only internally. Yugui san moved prime library from mathn to prime in 2008, and then she might forget to delete these methods. A patch from @shio-phys. https://github.com/ruby/prime/pull/4 git-svn-id: svn+ssh://ci.ruby-lang.org/ruby/trunk@63737 b2dd03c8-39d4-4d8f-98ff-823fe69b080e
463 lines
12 KiB
Ruby
463 lines
12 KiB
Ruby
# frozen_string_literal: false
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#
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# = prime.rb
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#
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# Prime numbers and factorization library.
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#
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# Copyright::
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# Copyright (c) 1998-2008 Keiju ISHITSUKA(SHL Japan Inc.)
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# Copyright (c) 2008 Yuki Sonoda (Yugui) <yugui@yugui.jp>
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#
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# Documentation::
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# Yuki Sonoda
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#
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require "singleton"
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require "forwardable"
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class Integer
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# Re-composes a prime factorization and returns the product.
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#
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# See Prime#int_from_prime_division for more details.
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def Integer.from_prime_division(pd)
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Prime.int_from_prime_division(pd)
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end
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# Returns the factorization of +self+.
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#
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# See Prime#prime_division for more details.
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def prime_division(generator = Prime::Generator23.new)
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Prime.prime_division(self, generator)
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end
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# Returns true if +self+ is a prime number, else returns false.
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def prime?
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return self >= 2 if self <= 3
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return true if self == 5
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return false unless 30.gcd(self) == 1
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(7..Integer.sqrt(self)).step(30) do |p|
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return false if
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self%(p) == 0 || self%(p+4) == 0 || self%(p+6) == 0 || self%(p+10) == 0 ||
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self%(p+12) == 0 || self%(p+16) == 0 || self%(p+22) == 0 || self%(p+24) == 0
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end
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true
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end
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# Iterates the given block over all prime numbers.
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#
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# See +Prime+#each for more details.
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def Integer.each_prime(ubound, &block) # :yields: prime
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Prime.each(ubound, &block)
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end
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end
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#
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# The set of all prime numbers.
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#
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# == Example
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#
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# Prime.each(100) do |prime|
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# p prime #=> 2, 3, 5, 7, 11, ...., 97
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# end
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#
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# Prime is Enumerable:
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#
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# Prime.first 5 # => [2, 3, 5, 7, 11]
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#
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# == Retrieving the instance
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#
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# For convenience, each instance method of +Prime+.instance can be accessed
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# as a class method of +Prime+.
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#
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# e.g.
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# Prime.instance.prime?(2) #=> true
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# Prime.prime?(2) #=> true
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#
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# == Generators
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#
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# A "generator" provides an implementation of enumerating pseudo-prime
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# numbers and it remembers the position of enumeration and upper bound.
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# Furthermore, it is an external iterator of prime enumeration which is
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# compatible with an Enumerator.
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#
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# +Prime+::+PseudoPrimeGenerator+ is the base class for generators.
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# There are few implementations of generator.
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#
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# [+Prime+::+EratosthenesGenerator+]
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# Uses eratosthenes' sieve.
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# [+Prime+::+TrialDivisionGenerator+]
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# Uses the trial division method.
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# [+Prime+::+Generator23+]
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# Generates all positive integers which are not divisible by either 2 or 3.
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# This sequence is very bad as a pseudo-prime sequence. But this
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# is faster and uses much less memory than the other generators. So,
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# it is suitable for factorizing an integer which is not large but
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# has many prime factors. e.g. for Prime#prime? .
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class Prime
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VERSION = "0.1.0"
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include Enumerable
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include Singleton
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class << self
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extend Forwardable
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include Enumerable
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def method_added(method) # :nodoc:
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(class<< self;self;end).def_delegator :instance, method
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end
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end
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# Iterates the given block over all prime numbers.
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#
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# == Parameters
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#
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# +ubound+::
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# Optional. An arbitrary positive number.
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# The upper bound of enumeration. The method enumerates
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# prime numbers infinitely if +ubound+ is nil.
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# +generator+::
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# Optional. An implementation of pseudo-prime generator.
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#
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# == Return value
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#
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# An evaluated value of the given block at the last time.
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# Or an enumerator which is compatible to an +Enumerator+
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# if no block given.
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#
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# == Description
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#
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# Calls +block+ once for each prime number, passing the prime as
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# a parameter.
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#
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# +ubound+::
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# Upper bound of prime numbers. The iterator stops after it
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# yields all prime numbers p <= +ubound+.
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#
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def each(ubound = nil, generator = EratosthenesGenerator.new, &block)
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generator.upper_bound = ubound
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generator.each(&block)
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end
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# Returns true if +value+ is a prime number, else returns false.
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#
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# == Parameters
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#
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# +value+:: an arbitrary integer to be checked.
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# +generator+:: optional. A pseudo-prime generator.
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def prime?(value, generator = Prime::Generator23.new)
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raise ArgumentError, "Expected a prime generator, got #{generator}" unless generator.respond_to? :each
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raise ArgumentError, "Expected an integer, got #{value}" unless value.respond_to?(:integer?) && value.integer?
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return false if value < 2
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generator.each do |num|
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q,r = value.divmod num
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return true if q < num
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return false if r == 0
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end
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end
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# Re-composes a prime factorization and returns the product.
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#
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# == Parameters
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# +pd+:: Array of pairs of integers. The each internal
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# pair consists of a prime number -- a prime factor --
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# and a natural number -- an exponent.
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#
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# == Example
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# For <tt>[[p_1, e_1], [p_2, e_2], ...., [p_n, e_n]]</tt>, it returns:
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#
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# p_1**e_1 * p_2**e_2 * .... * p_n**e_n.
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#
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# Prime.int_from_prime_division([[2,2], [3,1]]) #=> 12
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def int_from_prime_division(pd)
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pd.inject(1){|value, (prime, index)|
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value * prime**index
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}
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end
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# Returns the factorization of +value+.
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#
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# == Parameters
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# +value+:: An arbitrary integer.
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# +generator+:: Optional. A pseudo-prime generator.
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# +generator+.succ must return the next
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# pseudo-prime number in the ascending
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# order. It must generate all prime numbers,
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# but may also generate non prime numbers too.
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#
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# === Exceptions
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# +ZeroDivisionError+:: when +value+ is zero.
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#
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# == Example
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# For an arbitrary integer:
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#
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# n = p_1**e_1 * p_2**e_2 * .... * p_n**e_n,
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#
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# prime_division(n) returns:
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#
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# [[p_1, e_1], [p_2, e_2], ...., [p_n, e_n]].
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#
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# Prime.prime_division(12) #=> [[2,2], [3,1]]
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#
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def prime_division(value, generator = Prime::Generator23.new)
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raise ZeroDivisionError if value == 0
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if value < 0
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value = -value
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pv = [[-1, 1]]
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else
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pv = []
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end
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generator.each do |prime|
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count = 0
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while (value1, mod = value.divmod(prime)
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mod) == 0
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value = value1
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count += 1
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end
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if count != 0
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pv.push [prime, count]
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end
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break if value1 <= prime
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end
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if value > 1
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pv.push [value, 1]
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end
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pv
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end
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# An abstract class for enumerating pseudo-prime numbers.
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#
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# Concrete subclasses should override succ, next, rewind.
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class PseudoPrimeGenerator
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include Enumerable
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def initialize(ubound = nil)
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@ubound = ubound
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end
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def upper_bound=(ubound)
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@ubound = ubound
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end
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def upper_bound
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@ubound
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end
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# returns the next pseudo-prime number, and move the internal
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# position forward.
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#
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# +PseudoPrimeGenerator+#succ raises +NotImplementedError+.
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def succ
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raise NotImplementedError, "need to define `succ'"
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end
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# alias of +succ+.
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def next
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raise NotImplementedError, "need to define `next'"
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end
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# Rewinds the internal position for enumeration.
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#
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# See +Enumerator+#rewind.
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def rewind
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raise NotImplementedError, "need to define `rewind'"
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end
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# Iterates the given block for each prime number.
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def each
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return self.dup unless block_given?
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if @ubound
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last_value = nil
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loop do
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prime = succ
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break last_value if prime > @ubound
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last_value = yield prime
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end
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else
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loop do
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yield succ
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end
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end
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end
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# see +Enumerator+#with_index.
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def with_index(offset = 0)
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return enum_for(:with_index, offset) { Float::INFINITY } unless block_given?
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return each_with_index(&proc) if offset == 0
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each do |prime|
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yield prime, offset
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offset += 1
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end
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end
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# see +Enumerator+#with_object.
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def with_object(obj)
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return enum_for(:with_object, obj) { Float::INFINITY } unless block_given?
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each do |prime|
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yield prime, obj
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end
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end
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def size
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Float::INFINITY
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end
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end
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# An implementation of +PseudoPrimeGenerator+.
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#
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# Uses +EratosthenesSieve+.
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class EratosthenesGenerator < PseudoPrimeGenerator
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def initialize
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@last_prime_index = -1
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super
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end
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def succ
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@last_prime_index += 1
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EratosthenesSieve.instance.get_nth_prime(@last_prime_index)
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end
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def rewind
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initialize
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end
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alias next succ
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end
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# An implementation of +PseudoPrimeGenerator+ which uses
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# a prime table generated by trial division.
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class TrialDivisionGenerator < PseudoPrimeGenerator
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def initialize
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@index = -1
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super
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end
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def succ
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TrialDivision.instance[@index += 1]
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end
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def rewind
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initialize
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end
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alias next succ
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end
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# Generates all integers which are greater than 2 and
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# are not divisible by either 2 or 3.
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#
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# This is a pseudo-prime generator, suitable on
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# checking primality of an integer by brute force
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# method.
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class Generator23 < PseudoPrimeGenerator
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def initialize
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@prime = 1
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@step = nil
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super
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end
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def succ
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if (@step)
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@prime += @step
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@step = 6 - @step
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else
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case @prime
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when 1; @prime = 2
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when 2; @prime = 3
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when 3; @prime = 5; @step = 2
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end
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end
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@prime
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end
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alias next succ
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def rewind
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initialize
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end
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end
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# Internal use. An implementation of prime table by trial division method.
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class TrialDivision
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include Singleton
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def initialize # :nodoc:
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# These are included as class variables to cache them for later uses. If memory
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# usage is a problem, they can be put in Prime#initialize as instance variables.
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# There must be no primes between @primes[-1] and @next_to_check.
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@primes = [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101]
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# @next_to_check % 6 must be 1.
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@next_to_check = 103 # @primes[-1] - @primes[-1] % 6 + 7
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@ulticheck_index = 3 # @primes.index(@primes.reverse.find {|n|
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# n < Math.sqrt(@@next_to_check) })
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@ulticheck_next_squared = 121 # @primes[@ulticheck_index + 1] ** 2
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end
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# Returns the +index+th prime number.
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#
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# +index+ is a 0-based index.
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def [](index)
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while index >= @primes.length
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# Only check for prime factors up to the square root of the potential primes,
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# but without the performance hit of an actual square root calculation.
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if @next_to_check + 4 > @ulticheck_next_squared
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@ulticheck_index += 1
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@ulticheck_next_squared = @primes.at(@ulticheck_index + 1) ** 2
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end
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# Only check numbers congruent to one and five, modulo six. All others
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# are divisible by two or three. This also allows us to skip checking against
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# two and three.
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@primes.push @next_to_check if @primes[2..@ulticheck_index].find {|prime| @next_to_check % prime == 0 }.nil?
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@next_to_check += 4
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@primes.push @next_to_check if @primes[2..@ulticheck_index].find {|prime| @next_to_check % prime == 0 }.nil?
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@next_to_check += 2
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end
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@primes[index]
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end
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end
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# Internal use. An implementation of Eratosthenes' sieve
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class EratosthenesSieve
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include Singleton
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def initialize
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@primes = [2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101]
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# @max_checked must be an even number
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@max_checked = @primes.last + 1
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end
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def get_nth_prime(n)
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compute_primes while @primes.size <= n
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@primes[n]
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end
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private
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def compute_primes
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# max_segment_size must be an even number
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max_segment_size = 1e6.to_i
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max_cached_prime = @primes.last
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# do not double count primes if #compute_primes is interrupted
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# by Timeout.timeout
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@max_checked = max_cached_prime + 1 if max_cached_prime > @max_checked
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segment_min = @max_checked
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segment_max = [segment_min + max_segment_size, max_cached_prime * 2].min
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root = Integer.sqrt(segment_max)
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segment = ((segment_min + 1) .. segment_max).step(2).to_a
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(1..Float::INFINITY).each do |sieving|
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prime = @primes[sieving]
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break if prime > root
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composite_index = (-(segment_min + 1 + prime) / 2) % prime
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while composite_index < segment.size do
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segment[composite_index] = nil
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composite_index += prime
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end
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end
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@primes.concat(segment.compact!)
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@max_checked = segment_max
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end
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end
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end
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