567 lines
17 KiB
Lua
567 lines
17 KiB
Lua
#!/usr/bin/env lua
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-- If this variable is true, then strict type checking is performed for all
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-- operations. This may result in slower code, but it will allow you to catch
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-- errors and bugs earlier.
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local strict = true
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--------------------------------------------------------------------------------
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local bigint = {}
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setmetatable(bigint, {__call = function(_, arg) return bigint.new(arg) end})
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local mt = {
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__add = function(lhs, rhs)
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return bigint.add(lhs, rhs)
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end,
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__unm = function(arg)
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return bigint.negate(arg)
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end,
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__sub = function(lhs, rhs)
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return bigint.subtract(lhs, rhs)
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end,
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__mul = function(lhs, rhs)
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return bigint.multiply(lhs, rhs)
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end,
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__div = function(lhs, rhs)
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return bigint.divide(lhs, rhs)
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end,
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__mod = function(lhs, rhs)
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return bigint.modulus(lhs, rhs)
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end,
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__pow = function(lhs, rhs)
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return bigint.exponentiate(lhs, rhs)
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end,
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__tostring = function(arg)
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return bigint.unserialize(arg, "s")
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end,
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__eq = function(lhs, rhs)
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return bigint.compare(lhs, rhs, "==")
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end,
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__lt = function(lhs, rhs)
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return bigint.compare(lhs, rhs, "<")
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end,
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__le = function(lhs, rhs)
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return bigint.compare(lhs, rhs, "<=")
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end
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}
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local named_powers = require("libs.bigint.named-powers-of-ten")
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-- Create a new bigint or convert a number or string into a big
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-- Returns an empty, positive bigint if no number or string is given
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function bigint.new(num)
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local self = {
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sign = "+",
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digits = {}
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}
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-- Return a new bigint with the same sign and digits
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function self:clone()
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local newint = bigint.new()
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newint.sign = self.sign
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for _, digit in pairs(self.digits) do
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newint.digits[#newint.digits + 1] = digit
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end
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return newint
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end
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setmetatable(self, mt)
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if (num) then
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local num_string = tostring(num)
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for digit in string.gmatch(num_string, "[0-9]") do
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table.insert(self.digits, tonumber(digit))
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end
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if string.sub(num_string, 1, 1) == "-" then
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self.sign = "-"
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end
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end
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return bigint.strip(self)
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end
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-- Check the type of a big
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-- Normally only runs when global variable "strict" == true, but checking can be
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-- forced by supplying "true" as the second argument.
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function bigint.check(big, force)
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if (strict or force) then
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assert(getmetatable(big) == mt, "at least one arg is not a bigint")
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assert(#big.digits > 0, "bigint is empty")
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assert(big.sign == "+" or big.sign == "-", "bigint is unsigned")
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for _, digit in pairs(big.digits) do
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assert(type(digit) == "number", "at least one digit is invalid")
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assert(digit <= 9 and digit >= 0, digit .. " is not between 0 and 9")
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assert(math.floor(digit) == digit, digit .. " is not an integer")
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end
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end
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return true
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end
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-- Strip leading zeroes from a big, but don't remove the last zero
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function bigint.strip(big)
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while (#big.digits > 1) and (big.digits[1] == 0) do
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table.remove(big.digits, 1)
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end
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return big
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end
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-- Return a new big with the same digits but with a positive sign (absolute
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-- value)
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function bigint.abs(big)
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bigint.check(big)
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local result = big:clone()
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result.sign = "+"
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return result
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end
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-- Return a new big with the same digits but the opposite sign (negation)
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function bigint.negate(big)
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bigint.check(big)
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local result = big:clone()
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if (result.sign == "+") then
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result.sign = "-"
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else
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result.sign = "+"
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end
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return result
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end
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-- Return the number of digits in the big
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function bigint.digits(big)
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bigint.check(big)
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return #big.digits
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end
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-- Convert a big to a number or string
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function bigint.unserialize(big, output_type, precision)
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bigint.check(big)
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local num = ""
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if big.sign == "-" then
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num = "-"
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end
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if ((output_type == nil)
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or (output_type == "number")
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or (output_type == "n")
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or (output_type == "string")
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or (output_type == "s")) then
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-- Unserialization to a string or number requires reconstructing the
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-- entire number
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for _, digit in pairs(big.digits) do
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num = num .. math.floor(digit) -- lazy way of getting rid of .0$
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end
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if ((output_type == nil)
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or (output_type == "number")
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or (output_type == "n")) then
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return tonumber(num)
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else
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return num
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end
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else
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-- Unserialization to human-readable form or scientific notation only
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-- requires reading the first few digits
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if (precision == nil) then
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precision = math.min(#big.digits, 3)
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else
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assert(precision > 0, "Precision cannot be less than 1")
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assert(math.floor(precision) == precision,
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"Precision must be a positive integer")
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end
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-- num is the first (precision + 1) digits, the first being separated by
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-- a decimal point from the others
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num = num .. math.floor(big.digits[1])
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if (precision > 1) then
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num = num .. "."
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for i = 1, (precision - 1) do
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num = num .. math.floor(big.digits[i + 1])
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end
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end
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if ((output_type == "human-readable")
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or (output_type == "human")
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or (output_type == "h"))
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and (#big.digits >= 3 and #big.digits <= 10002) then
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-- Human-readable output contributed by 123eee555
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local name
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local walkback = 0 -- Used to enumerate "ten", "hundred", etc
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-- Walk backwards in the index of named_powers starting at the
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-- number of digits of the input until the first value is found
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for i = (#big.digits - 1), (#big.digits - 4), -1 do
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name = named_powers[i]
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if (name) then
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if (walkback == 1) then
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name = "ten " .. name
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elseif (walkback == 2) then
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name = "hundred " .. name
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end
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break
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else
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walkback = walkback + 1
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end
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end
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return num .. " " .. name
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else
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return num .. "*10^" .. (#big.digits - 1)
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end
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end
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end
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-- Basic comparisons
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-- Accepts symbols (<, >=, ~=) and Unix shell-like options (lt, ge, ne)
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function bigint.compare(big1, big2, comparison)
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bigint.check(big1)
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bigint.check(big2)
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local greater = false -- If big1.digits > big2.digits
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local equal = false
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if (big1.sign == "-") and (big2.sign == "+") then
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greater = false
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elseif (#big1.digits > #big2.digits)
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or ((big1.sign == "+") and (big2.sign == "-")) then
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greater = true
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elseif (#big1.digits == #big2.digits) then
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-- Walk left to right, comparing digits
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for digit = 1, #big1.digits do
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if (big1.digits[digit] > big2.digits[digit]) then
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greater = true
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break
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elseif (big2.digits[digit] > big1.digits[digit]) then
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break
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elseif (digit == #big1.digits)
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and (big1.digits[digit] == big2.digits[digit]) then
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equal = true
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end
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end
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end
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-- If both numbers are negative, then the requirements for greater are
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-- reversed
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if (not equal) and (big1.sign == "-") and (big2.sign == "-") then
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greater = not greater
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end
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return (((comparison == "<") or (comparison == "lt"))
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and ((not greater) and (not equal)) and true)
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or (((comparison == ">") or (comparison == "gt"))
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and ((greater) and (not equal)) and true)
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or (((comparison == "==") or (comparison == "eq"))
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and (equal) and true)
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or (((comparison == ">=") or (comparison == "ge"))
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and (equal or greater) and true)
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or (((comparison == "<=") or (comparison == "le"))
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and (equal or not greater) and true)
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or (((comparison == "~=") or (comparison == "!=") or (comparison == "ne"))
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and (not equal) and true)
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or false
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end
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-- BACKEND: Add big1 and big2, ignoring signs
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function bigint.add_raw(big1, big2)
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bigint.check(big1)
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bigint.check(big2)
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local result = bigint.new()
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local max_digits = 0
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local carry = 0
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if (#big1.digits >= #big2.digits) then
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max_digits = #big1.digits
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else
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max_digits = #big2.digits
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end
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-- Walk backwards right to left, like in long addition
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for digit = 0, max_digits - 1 do
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local sum = (big1.digits[#big1.digits - digit] or 0)
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+ (big2.digits[#big2.digits - digit] or 0)
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+ carry
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if (sum >= 10) then
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carry = 1
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sum = sum - 10
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else
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carry = 0
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end
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result.digits[max_digits - digit] = sum
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end
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-- Leftover carry in cases when #big1.digits == #big2.digits and sum > 10, ex. 7 + 9
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if (carry == 1) then
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table.insert(result.digits, 1, 1)
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end
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return result
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end
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-- BACKEND: Subtract big2 from big1, ignoring signs
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function bigint.subtract_raw(big1, big2)
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-- Type checking is done by bigint.compare
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assert(bigint.compare(bigint.abs(big1), bigint.abs(big2), ">="),
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"Size of " .. bigint.unserialize(big1, "string") .. " is less than "
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.. bigint.unserialize(big2, "string"))
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local result = big1:clone()
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local max_digits = #big1.digits
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local borrow = 0
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-- Logic mostly copied from bigint.add_raw ---------------------------------
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-- Walk backwards right to left, like in long subtraction
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for digit = 0, max_digits - 1 do
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local diff = (big1.digits[#big1.digits - digit] or 0)
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- (big2.digits[#big2.digits - digit] or 0)
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- borrow
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if (diff < 0) then
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borrow = 1
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diff = diff + 10
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else
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borrow = 0
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end
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result.digits[max_digits - digit] = diff
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end
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----------------------------------------------------------------------------
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return bigint.strip(result)
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end
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-- FRONTEND: Addition and subtraction operations, accounting for signs
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function bigint.add(big1, big2)
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-- Type checking is done by bigint.compare
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local result
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-- If adding numbers of different sign, subtract the smaller sized one from
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-- the bigger sized one and take the sign of the bigger sized one
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if (big1.sign ~= big2.sign) then
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if (bigint.compare(bigint.abs(big1), bigint.abs(big2), ">")) then
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result = bigint.subtract_raw(big1, big2)
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result.sign = big1.sign
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else
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result = bigint.subtract_raw(big2, big1)
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result.sign = big2.sign
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end
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elseif (big1.sign == "+") and (big2.sign == "+") then
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result = bigint.add_raw(big1, big2)
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elseif (big1.sign == "-") and (big2.sign == "-") then
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result = bigint.add_raw(big1, big2)
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result.sign = "-"
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end
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return result
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end
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function bigint.subtract(big1, big2)
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-- Type checking is done by bigint.compare in bigint.add
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-- Subtracting is like adding a negative
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local big2_local = big2:clone()
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if (big2.sign == "+") then
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big2_local.sign = "-"
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else
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big2_local.sign = "+"
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end
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return bigint.add(big1, big2_local)
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end
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-- BACKEND: Multiply a big by a single digit big, ignoring signs
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function bigint.multiply_single(big1, big2)
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bigint.check(big1)
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bigint.check(big2)
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assert(#big2.digits == 1, bigint.unserialize(big2, "string")
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.. " has more than one digit")
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local result = bigint.new()
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local carry = 0
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-- Logic mostly copied from bigint.add_raw ---------------------------------
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-- Walk backwards right to left, like in long multiplication
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for digit = 0, #big1.digits - 1 do
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local this_digit = big1.digits[#big1.digits - digit]
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* big2.digits[1]
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+ carry
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if (this_digit >= 10) then
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carry = math.floor(this_digit / 10)
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this_digit = this_digit - (carry * 10)
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else
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carry = 0
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end
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result.digits[#big1.digits - digit] = this_digit
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end
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-- Leftover carry in cases when big1.digits[1] * big2.digits[1] > 0
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if (carry > 0) then
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table.insert(result.digits, 1, carry)
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end
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----------------------------------------------------------------------------
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return result
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end
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-- FRONTEND: Multiply two bigs, accounting for signs
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function bigint.multiply(big1, big2)
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-- Type checking done by bigint.multiply_single
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local result = bigint.new(0)
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local larger, smaller -- Larger and smaller in terms of digits, not size
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if (bigint.unserialize(big1) == 0) or (bigint.unserialize(big2) == 0) then
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return result
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end
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if (#big1.digits >= #big2.digits) then
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larger = big1
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smaller = big2
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else
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larger = big2
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smaller = big1
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end
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-- Walk backwards right to left, like in long multiplication
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for digit = 0, #smaller.digits - 1 do
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-- Sorry for going over column 80! There's lots of big names here
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local this_digit_product = bigint.multiply_single(larger,
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bigint.new(smaller.digits[#smaller.digits - digit]))
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-- "Placeholding zeroes"
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if (digit > 0) then
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for placeholder = 1, digit do
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table.insert(this_digit_product.digits, 0)
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end
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end
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result = bigint.add(result, this_digit_product)
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end
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if (larger.sign == smaller.sign) then
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result.sign = "+"
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else
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result.sign = "-"
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end
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return result
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end
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-- Raise a big to a positive integer or big power (TODO: negative integer power)
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function bigint.exponentiate(big, power)
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-- Type checking for big done by bigint.multiply
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assert(bigint.compare(power, bigint.new(0), ">="),
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"negative powers are not supported")
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local exp = power:clone()
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if (bigint.compare(exp, bigint.new(0), "==")) then
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return bigint.new(1)
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elseif (bigint.compare(exp, bigint.new(1), "==")) then
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return big:clone()
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else
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local result = bigint.new(1)
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local base = big:clone()
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while (true) do
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if (bigint.compare(
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bigint.modulus(exp, bigint.new(2)), bigint.new(1), "=="
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)) then
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result = bigint.multiply(result, base)
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end
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if (bigint.compare(exp, bigint.new(1), "==")) then
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break
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else
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exp = bigint.divide(exp, bigint.new(2))
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base = bigint.multiply(base, base)
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end
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end
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return result
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end
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end
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-- BACKEND: Divide two bigs (decimals not supported), returning big result and
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-- big remainder
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-- WARNING: Only supports positive integers
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function bigint.divide_raw(big1, big2)
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-- Type checking done by bigint.compare
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if (bigint.compare(big1, big2, "==")) then
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return bigint.new(1), bigint.new(0)
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elseif (bigint.compare(big1, big2, "<")) then
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return bigint.new(0), big1:clone()
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else
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assert(bigint.compare(big2, bigint.new(0), "!="), "error: divide by zero")
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assert(big1.sign == "+", "error: big1 is not positive")
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assert(big2.sign == "+", "error: big2 is not positive")
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local result = bigint.new()
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local dividend = bigint.new() -- Dividend of a single operation
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local neg_zero = bigint.new(0)
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neg_zero.sign = "-"
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for i = 1, #big1.digits do
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-- Fixes a negative zero bug
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if (#dividend.digits ~= 0) and (bigint.compare(dividend, neg_zero, "==")) then
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dividend = bigint.new()
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end
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table.insert(dividend.digits, big1.digits[i])
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local factor = bigint.new(0)
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while bigint.compare(dividend, big2, ">=") do
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dividend = bigint.subtract(dividend, big2)
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factor = bigint.add(factor, bigint.new(1))
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end
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for i = 0, #factor.digits - 1 do
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result.digits[#result.digits + 1 - i] = factor.digits[i + 1]
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end
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end
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|
|
return bigint.strip(result), dividend
|
|
end
|
|
end
|
|
|
|
-- FRONTEND: Divide two bigs (decimals not supported), returning big result and
|
|
-- big remainder, accounting for signs
|
|
function bigint.divide(big1, big2)
|
|
local result, remainder = bigint.divide_raw(bigint.abs(big1),
|
|
bigint.abs(big2))
|
|
if (big1.sign == big2.sign) then
|
|
result.sign = "+"
|
|
else
|
|
result.sign = "-"
|
|
end
|
|
|
|
return result, remainder
|
|
end
|
|
|
|
-- FRONTEND: Return only the remainder from bigint.divide
|
|
function bigint.modulus(big1, big2)
|
|
local result, remainder = bigint.divide(big1, big2)
|
|
|
|
-- Remainder will always have the same sign as the dividend per C standard
|
|
-- https://en.wikipedia.org/wiki/Modulo_operation#Remainder_calculation_for_the_modulo_operation
|
|
remainder.sign = big1.sign
|
|
return remainder
|
|
end
|
|
|
|
return bigint
|