418 lines
17 KiB
Zig
418 lines
17 KiB
Zig
//! The engines provided here should be initialized from an external source.
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//! For a thread-local cryptographically secure pseudo random number generator,
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//! use `std.crypto.random`.
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//! Be sure to use a CSPRNG when required, otherwise using a normal PRNG will
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//! be faster and use substantially less stack space.
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//!
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//! TODO(tiehuis): Benchmark these against other reference implementations.
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const std = @import("std.zig");
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const builtin = @import("builtin");
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const assert = std.debug.assert;
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const mem = std.mem;
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const math = std.math;
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const ziggurat = @import("rand/ziggurat.zig");
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const maxInt = std.math.maxInt;
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/// Fast unbiased random numbers.
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pub const DefaultPrng = Xoshiro256;
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/// Cryptographically secure random numbers.
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pub const DefaultCsprng = Xoodoo;
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pub const Isaac64 = @import("rand/Isaac64.zig");
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pub const Xoodoo = @import("rand/Xoodoo.zig");
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pub const Pcg = @import("rand/Pcg.zig");
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pub const Xoroshiro128 = @import("rand/Xoroshiro128.zig");
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pub const Xoshiro256 = @import("rand/Xoshiro256.zig");
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pub const Sfc64 = @import("rand/Sfc64.zig");
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pub const RomuTrio = @import("rand/RomuTrio.zig");
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pub const Random = struct {
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ptr: *anyopaque,
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fillFn: if (builtin.zig_backend == .stage1)
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fn (ptr: *anyopaque, buf: []u8) void
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else
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*const fn (ptr: *anyopaque, buf: []u8) void,
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pub fn init(pointer: anytype, comptime fillFn: fn (ptr: @TypeOf(pointer), buf: []u8) void) Random {
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const Ptr = @TypeOf(pointer);
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assert(@typeInfo(Ptr) == .Pointer); // Must be a pointer
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assert(@typeInfo(Ptr).Pointer.size == .One); // Must be a single-item pointer
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assert(@typeInfo(@typeInfo(Ptr).Pointer.child) == .Struct); // Must point to a struct
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const gen = struct {
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fn fill(ptr: *anyopaque, buf: []u8) void {
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const alignment = @typeInfo(Ptr).Pointer.alignment;
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const self = @ptrCast(Ptr, @alignCast(alignment, ptr));
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fillFn(self, buf);
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}
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};
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return .{
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.ptr = pointer,
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.fillFn = gen.fill,
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};
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}
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/// Read random bytes into the specified buffer until full.
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pub fn bytes(r: Random, buf: []u8) void {
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r.fillFn(r.ptr, buf);
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}
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pub fn boolean(r: Random) bool {
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return r.int(u1) != 0;
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}
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/// Returns a random value from an enum, evenly distributed.
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pub fn enumValue(r: Random, comptime EnumType: type) EnumType {
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comptime assert(@typeInfo(EnumType) == .Enum);
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// We won't use int -> enum casting because enum elements can have
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// arbitrary values. Instead we'll randomly pick one of the type's values.
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const values = std.enums.values(EnumType);
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const index = r.uintLessThan(usize, values.len);
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return values[index];
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}
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/// Returns a random int `i` such that `minInt(T) <= i <= maxInt(T)`.
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/// `i` is evenly distributed.
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pub fn int(r: Random, comptime T: type) T {
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const bits = @typeInfo(T).Int.bits;
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const UnsignedT = std.meta.Int(.unsigned, bits);
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const ByteAlignedT = std.meta.Int(.unsigned, @divTrunc(bits + 7, 8) * 8);
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var rand_bytes: [@sizeOf(ByteAlignedT)]u8 = undefined;
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r.bytes(rand_bytes[0..]);
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// use LE instead of native endian for better portability maybe?
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// TODO: endian portability is pointless if the underlying prng isn't endian portable.
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// TODO: document the endian portability of this library.
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const byte_aligned_result = mem.readIntSliceLittle(ByteAlignedT, &rand_bytes);
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const unsigned_result = @truncate(UnsignedT, byte_aligned_result);
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return @bitCast(T, unsigned_result);
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}
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/// Constant-time implementation off `uintLessThan`.
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/// The results of this function may be biased.
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pub fn uintLessThanBiased(r: Random, comptime T: type, less_than: T) T {
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comptime assert(@typeInfo(T).Int.signedness == .unsigned);
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const bits = @typeInfo(T).Int.bits;
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comptime assert(bits <= 64); // TODO: workaround: LLVM ERROR: Unsupported library call operation!
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assert(0 < less_than);
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if (bits <= 32) {
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return @intCast(T, limitRangeBiased(u32, r.int(u32), less_than));
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} else {
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return @intCast(T, limitRangeBiased(u64, r.int(u64), less_than));
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}
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}
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/// Returns an evenly distributed random unsigned integer `0 <= i < less_than`.
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/// This function assumes that the underlying `fillFn` produces evenly distributed values.
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/// Within this assumption, the runtime of this function is exponentially distributed.
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/// If `fillFn` were backed by a true random generator,
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/// the runtime of this function would technically be unbounded.
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/// However, if `fillFn` is backed by any evenly distributed pseudo random number generator,
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/// this function is guaranteed to return.
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/// If you need deterministic runtime bounds, use `uintLessThanBiased`.
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pub fn uintLessThan(r: Random, comptime T: type, less_than: T) T {
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comptime assert(@typeInfo(T).Int.signedness == .unsigned);
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const bits = @typeInfo(T).Int.bits;
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comptime assert(bits <= 64); // TODO: workaround: LLVM ERROR: Unsupported library call operation!
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assert(0 < less_than);
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// Small is typically u32
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const small_bits = @divTrunc(bits + 31, 32) * 32;
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const Small = std.meta.Int(.unsigned, small_bits);
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// Large is typically u64
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const Large = std.meta.Int(.unsigned, small_bits * 2);
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// adapted from:
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// http://www.pcg-random.org/posts/bounded-rands.html
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// "Lemire's (with an extra tweak from me)"
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var x: Small = r.int(Small);
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var m: Large = @as(Large, x) * @as(Large, less_than);
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var l: Small = @truncate(Small, m);
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if (l < less_than) {
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var t: Small = -%less_than;
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if (t >= less_than) {
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t -= less_than;
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if (t >= less_than) {
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t %= less_than;
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}
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}
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while (l < t) {
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x = r.int(Small);
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m = @as(Large, x) * @as(Large, less_than);
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l = @truncate(Small, m);
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}
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}
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return @intCast(T, m >> small_bits);
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}
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/// Constant-time implementation off `uintAtMost`.
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/// The results of this function may be biased.
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pub fn uintAtMostBiased(r: Random, comptime T: type, at_most: T) T {
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assert(@typeInfo(T).Int.signedness == .unsigned);
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if (at_most == maxInt(T)) {
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// have the full range
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return r.int(T);
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}
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return r.uintLessThanBiased(T, at_most + 1);
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}
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/// Returns an evenly distributed random unsigned integer `0 <= i <= at_most`.
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/// See `uintLessThan`, which this function uses in most cases,
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/// for commentary on the runtime of this function.
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pub fn uintAtMost(r: Random, comptime T: type, at_most: T) T {
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assert(@typeInfo(T).Int.signedness == .unsigned);
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if (at_most == maxInt(T)) {
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// have the full range
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return r.int(T);
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}
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return r.uintLessThan(T, at_most + 1);
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}
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/// Constant-time implementation off `intRangeLessThan`.
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/// The results of this function may be biased.
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pub fn intRangeLessThanBiased(r: Random, comptime T: type, at_least: T, less_than: T) T {
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assert(at_least < less_than);
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const info = @typeInfo(T).Int;
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if (info.signedness == .signed) {
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// Two's complement makes this math pretty easy.
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const UnsignedT = std.meta.Int(.unsigned, info.bits);
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const lo = @bitCast(UnsignedT, at_least);
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const hi = @bitCast(UnsignedT, less_than);
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const result = lo +% r.uintLessThanBiased(UnsignedT, hi -% lo);
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return @bitCast(T, result);
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} else {
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// The signed implementation would work fine, but we can use stricter arithmetic operators here.
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return at_least + r.uintLessThanBiased(T, less_than - at_least);
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}
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}
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/// Returns an evenly distributed random integer `at_least <= i < less_than`.
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/// See `uintLessThan`, which this function uses in most cases,
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/// for commentary on the runtime of this function.
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pub fn intRangeLessThan(r: Random, comptime T: type, at_least: T, less_than: T) T {
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assert(at_least < less_than);
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const info = @typeInfo(T).Int;
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if (info.signedness == .signed) {
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// Two's complement makes this math pretty easy.
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const UnsignedT = std.meta.Int(.unsigned, info.bits);
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const lo = @bitCast(UnsignedT, at_least);
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const hi = @bitCast(UnsignedT, less_than);
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const result = lo +% r.uintLessThan(UnsignedT, hi -% lo);
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return @bitCast(T, result);
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} else {
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// The signed implementation would work fine, but we can use stricter arithmetic operators here.
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return at_least + r.uintLessThan(T, less_than - at_least);
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}
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}
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/// Constant-time implementation off `intRangeAtMostBiased`.
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/// The results of this function may be biased.
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pub fn intRangeAtMostBiased(r: Random, comptime T: type, at_least: T, at_most: T) T {
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assert(at_least <= at_most);
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const info = @typeInfo(T).Int;
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if (info.signedness == .signed) {
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// Two's complement makes this math pretty easy.
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const UnsignedT = std.meta.Int(.unsigned, info.bits);
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const lo = @bitCast(UnsignedT, at_least);
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const hi = @bitCast(UnsignedT, at_most);
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const result = lo +% r.uintAtMostBiased(UnsignedT, hi -% lo);
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return @bitCast(T, result);
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} else {
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// The signed implementation would work fine, but we can use stricter arithmetic operators here.
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return at_least + r.uintAtMostBiased(T, at_most - at_least);
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}
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}
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/// Returns an evenly distributed random integer `at_least <= i <= at_most`.
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/// See `uintLessThan`, which this function uses in most cases,
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/// for commentary on the runtime of this function.
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pub fn intRangeAtMost(r: Random, comptime T: type, at_least: T, at_most: T) T {
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assert(at_least <= at_most);
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const info = @typeInfo(T).Int;
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if (info.signedness == .signed) {
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// Two's complement makes this math pretty easy.
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const UnsignedT = std.meta.Int(.unsigned, info.bits);
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const lo = @bitCast(UnsignedT, at_least);
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const hi = @bitCast(UnsignedT, at_most);
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const result = lo +% r.uintAtMost(UnsignedT, hi -% lo);
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return @bitCast(T, result);
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} else {
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// The signed implementation would work fine, but we can use stricter arithmetic operators here.
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return at_least + r.uintAtMost(T, at_most - at_least);
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}
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}
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/// Return a floating point value evenly distributed in the range [0, 1).
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pub fn float(r: Random, comptime T: type) T {
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// Generate a uniformly random value for the mantissa.
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// Then generate an exponentially biased random value for the exponent.
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// This covers every possible value in the range.
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switch (T) {
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f32 => {
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// Use 23 random bits for the mantissa, and the rest for the exponent.
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// If all 41 bits are zero, generate additional random bits, until a
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// set bit is found, or 126 bits have been generated.
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const rand = r.int(u64);
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var rand_lz = @clz(rand);
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if (rand_lz >= 41) {
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// TODO: when #5177 or #489 is implemented,
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// tell the compiler it is unlikely (1/2^41) to reach this point.
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// (Same for the if branch and the f64 calculations below.)
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rand_lz = 41 + @clz(r.int(u64));
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if (rand_lz == 41 + 64) {
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// It is astronomically unlikely to reach this point.
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rand_lz += @clz(r.int(u32) | 0x7FF);
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}
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}
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const mantissa = @truncate(u23, rand);
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const exponent = @as(u32, 126 - rand_lz) << 23;
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return @bitCast(f32, exponent | mantissa);
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},
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f64 => {
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// Use 52 random bits for the mantissa, and the rest for the exponent.
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// If all 12 bits are zero, generate additional random bits, until a
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// set bit is found, or 1022 bits have been generated.
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const rand = r.int(u64);
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var rand_lz: u64 = @clz(rand);
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if (rand_lz >= 12) {
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rand_lz = 12;
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while (true) {
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// It is astronomically unlikely for this loop to execute more than once.
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const addl_rand_lz = @clz(r.int(u64));
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rand_lz += addl_rand_lz;
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if (addl_rand_lz != 64) {
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break;
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}
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if (rand_lz >= 1022) {
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rand_lz = 1022;
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break;
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}
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}
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}
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const mantissa = rand & 0xFFFFFFFFFFFFF;
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const exponent = (1022 - rand_lz) << 52;
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return @bitCast(f64, exponent | mantissa);
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},
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else => @compileError("unknown floating point type"),
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}
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}
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/// Return a floating point value normally distributed with mean = 0, stddev = 1.
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///
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/// To use different parameters, use: floatNorm(...) * desiredStddev + desiredMean.
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pub fn floatNorm(r: Random, comptime T: type) T {
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const value = ziggurat.next_f64(r, ziggurat.NormDist);
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switch (T) {
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f32 => return @floatCast(f32, value),
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f64 => return value,
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else => @compileError("unknown floating point type"),
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}
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}
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/// Return an exponentially distributed float with a rate parameter of 1.
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///
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/// To use a different rate parameter, use: floatExp(...) / desiredRate.
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pub fn floatExp(r: Random, comptime T: type) T {
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const value = ziggurat.next_f64(r, ziggurat.ExpDist);
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switch (T) {
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f32 => return @floatCast(f32, value),
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f64 => return value,
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else => @compileError("unknown floating point type"),
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}
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}
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/// Shuffle a slice into a random order.
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pub fn shuffle(r: Random, comptime T: type, buf: []T) void {
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if (buf.len < 2) {
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return;
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}
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var i: usize = 0;
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while (i < buf.len - 1) : (i += 1) {
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const j = r.intRangeLessThan(usize, i, buf.len);
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mem.swap(T, &buf[i], &buf[j]);
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}
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}
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/// Randomly selects an index into `proportions`, where the likelihood of each
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/// index is weighted by that proportion.
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///
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/// This is useful for selecting an item from a slice where weights are not equal.
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/// `T` must be a numeric type capable of holding the sum of `proportions`.
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pub fn weightedIndex(r: std.rand.Random, comptime T: type, proportions: []const T) usize {
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// This implementation works by summing the proportions and picking a random
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// point in [0, sum). We then loop over the proportions, accumulating
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// until our accumulator is greater than the random point.
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var sum: T = 0;
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for (proportions) |v| {
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sum += v;
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}
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const point = if (comptime std.meta.trait.isSignedInt(T))
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r.intRangeLessThan(T, 0, sum)
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else if (comptime std.meta.trait.isUnsignedInt(T))
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r.uintLessThan(T, sum)
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else if (comptime std.meta.trait.isFloat(T))
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// take care that imprecision doesn't lead to a value slightly greater than sum
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std.math.min(r.float(T) * sum, sum - std.math.epsilon(T))
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else
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@compileError("weightedIndex does not support proportions of type " ++ @typeName(T));
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std.debug.assert(point < sum);
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var accumulator: T = 0;
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for (proportions) |p, index| {
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accumulator += p;
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if (point < accumulator) return index;
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}
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unreachable;
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}
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};
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/// Convert a random integer 0 <= random_int <= maxValue(T),
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/// into an integer 0 <= result < less_than.
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/// This function introduces a minor bias.
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pub fn limitRangeBiased(comptime T: type, random_int: T, less_than: T) T {
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comptime assert(@typeInfo(T).Int.signedness == .unsigned);
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const bits = @typeInfo(T).Int.bits;
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const T2 = std.meta.Int(.unsigned, bits * 2);
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// adapted from:
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// http://www.pcg-random.org/posts/bounded-rands.html
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// "Integer Multiplication (Biased)"
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var m: T2 = @as(T2, random_int) * @as(T2, less_than);
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return @intCast(T, m >> bits);
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}
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// Generator to extend 64-bit seed values into longer sequences.
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//
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// The number of cycles is thus limited to 64-bits regardless of the engine, but this
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// is still plenty for practical purposes.
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pub const SplitMix64 = struct {
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s: u64,
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pub fn init(seed: u64) SplitMix64 {
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return SplitMix64{ .s = seed };
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}
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pub fn next(self: *SplitMix64) u64 {
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self.s +%= 0x9e3779b97f4a7c15;
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var z = self.s;
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z = (z ^ (z >> 30)) *% 0xbf58476d1ce4e5b9;
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z = (z ^ (z >> 27)) *% 0x94d049bb133111eb;
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return z ^ (z >> 31);
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}
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};
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test {
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std.testing.refAllDecls(@This());
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_ = @import("rand/test.zig");
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}
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