vendor/dissimilar-1.0.6/src/find.rs - toolchain/rustc - Git at Google

 // The strstr implementation in this file is extracted from the Rust standard
 // library's str::find. The algorithm works for arbitrary &[T] haystack and
 // needle but is only exposed by the standard library on UTF-8 strings.
 //
 // https://github.com/rust-lang/rust/blob/1.40.0/src/libcore/str/pattern.rs
 //
 // ---
 //
 // This is the Two-Way search algorithm, which was introduced in the paper:
 // Crochemore, M., Perrin, D., 1991, Two-way string-matching, Journal of the ACM 38(3):651-675.
 //
 // Here's some background information.
 //
 // A *word* is a string of symbols. The *length* of a word should be a familiar
 // notion, and here we denote it for any word x by |x|. (We also allow for the
 // possibility of the *empty word*, a word of length zero.)
 //
 // If x is any non-empty word, then an integer p with 0 < p <= |x| is said to be
 // a *period* for x iff for all i with 0 <= i <= |x| - p - 1, we have x[i] ==
 // x[i+p]. For example, both 1 and 2 are periods for the string "aa". As another
 // example, the only period of the string "abcd" is 4.
 //
 // We denote by period(x) the *smallest* period of x (provided that x is
 // non-empty). This is always well-defined since every non-empty word x has at
 // least one period, |x|. We sometimes call this *the period* of x.
 //
 // If u, v and x are words such that x = uv, where uv is the concatenation of u
 // and v, then we say that (u, v) is a *factorization* of x.
 //
 // Let (u, v) be a factorization for a word x. Then if w is a non-empty word
 // such that both of the following hold
 //
 //   - either w is a suffix of u or u is a suffix of w
 //   - either w is a prefix of v or v is a prefix of w
 //
 // then w is said to be a *repetition* for the factorization (u, v).
 //
 // Just to unpack this, there are four possibilities here. Let w = "abc". Then
 // we might have:
 //
 //   - w is a suffix of u and w is a prefix of v. ex: ("lolabc", "abcde")
 //   - w is a suffix of u and v is a prefix of w. ex: ("lolabc", "ab")
 //   - u is a suffix of w and w is a prefix of v. ex: ("bc", "abchi")
 //   - u is a suffix of w and v is a prefix of w. ex: ("bc", "a")
 //
 // Note that the word vu is a repetition for any factorization (u,v) of x = uv,
 // so every factorization has at least one repetition.
 //
 // If x is a string and (u, v) is a factorization for x, then a *local period*
 // for (u, v) is an integer r such that there is some word w such that |w| = r
 // and w is a repetition for (u, v).
 //
 // We denote by local_period(u, v) the smallest local period of (u, v). We
 // sometimes call this *the local period* of (u, v). Provided that x = uv is
 // non-empty, this is well-defined (because each non-empty word has at least one
 // factorization, as noted above).
 //
 // It can be proven that the following is an equivalent definition of a local
 // period for a factorization (u, v): any positive integer r such that x[i] ==
 // x[i+r] for all i such that |u| - r <= i <= |u| - 1 and such that both x[i]
 // and x[i+r] are defined. (i.e., i > 0 and i + r < |x|).
 //
 // Using the above reformulation, it is easy to prove that
 //
 //     1 <= local_period(u, v) <= period(uv)
 //
 // A factorization (u, v) of x such that local_period(u,v) = period(x) is called
 // a *critical factorization*.
 //
 // The algorithm hinges on the following theorem, which is stated without proof:
 //
 // **Critical Factorization Theorem** Any word x has at least one critical
 // factorization (u, v) such that |u| < period(x).
 //
 // The purpose of maximal_suffix is to find such a critical factorization.
 //
 // If the period is short, compute another factorization x = u' v' to use for
 // reverse search, chosen instead so that |v'| < period(x).

 use std::cmp;
 use std::usize;

 pub fn find(haystack: &[char], needle: &[char]) -> Option<usize> {
     assert!(!needle.is_empty());

     // crit_pos: critical factorization index
     let (crit_pos_false, period_false) = maximal_suffix(needle, false);
     let (crit_pos_true, period_true) = maximal_suffix(needle, true);
     let (crit_pos, mut period) = if crit_pos_false > crit_pos_true {
         (crit_pos_false, period_false)
     } else {
         (crit_pos_true, period_true)
     };

     // Byteset is an extension (not part of the two way algorithm); it is a
     // 64-bit "fingerprint" where each set bit j corresponds to a (byte & 63) ==
     // j present in the needle.
     let byteset;
     // Index into needle before which we have already matched.
     let mut memory;

     // A particularly readable explanation of what's going on here can be found
     // in Crochemore and Rytter's book "Text Algorithms", ch 13. Specifically
     // see the code for "Algorithm CP" on p. 323.
     //
     // What's going on is we have some critical factorization (u, v) of the
     // needle, and we want to determine whether u is a suffix of &v[..period].
     // If it is, we use "Algorithm CP1". Otherwise we use "Algorithm CP2", which
     // is optimized for when the period of the needle is large.
     let long_period = needle[..crit_pos] != needle[period..period + crit_pos];
     if long_period {
         // Long period case -- we have an approximation to the actual period,
         // and don't use memorization.
         //
         // Approximate the period by lower bound max(|u|, |v|) + 1.
         period = cmp::max(crit_pos, needle.len() - crit_pos) + 1;
         byteset = byteset_create(needle);
         // Dummy value to signify that the period is long.
         memory = usize::MAX;
     } else {
         // Short period case -- the period is exact.
         byteset = byteset_create(&needle[..period]);
         memory = 0;
     }

     // One of the main ideas of Two-Way is that we factorize the needle into two
     // halves, (u, v), and begin trying to find v in the haystack by scanning
     // left to right. If v matches, we try to match u by scanning right to left.
     // How far we can jump when we encounter a mismatch is all based on the fact
     // that (u, v) is a critical factorization for the needle.
     let mut position = 0;
     let needle_last = needle.len() - 1;
     'search: loop {
         // Check that we have room to search in. position + needle_last cannot
         // overflow if we assume slices are bounded by isize's range.
         let tail_byte = *haystack.get(position + needle_last)?;

         // Quickly skip by large portions unrelated to our substring.
         if !byteset_contains(byteset, tail_byte) {
             position += needle.len();
             if !long_period {
                 memory = 0;
             }
             continue 'search;
         }

         // See if the right part of the needle matches.
         let start = if long_period {
             crit_pos
         } else {
             cmp::max(crit_pos, memory)
         };
         for i in start..needle.len() {
             if needle[i] != haystack[position + i] {
                 position += i - crit_pos + 1;
                 if !long_period {
                     memory = 0;
                 }
                 continue 'search;
             }
         }

         // See if the left part of the needle matches.
         let start = if long_period { 0 } else { memory };
         for i in (start..crit_pos).rev() {
             if needle[i] != haystack[position + i] {
                 position += period;
                 if !long_period {
                     memory = needle.len() - period;
                 }
                 continue 'search;
             }
         }

         // We have found a match!
         return Some(position);
     }
 }

 fn byteset_create(chars: &[char]) -> u64 {
     chars.iter().fold(0, |a, &ch| (1 << (ch as u8 & 0x3f)) | a)
 }

 fn byteset_contains(byteset: u64, ch: char) -> bool {
     (byteset >> ((ch as u8 & 0x3f) as usize)) & 1 != 0
 }

 // Compute the maximal suffix of `arr`.
 //
 // The maximal suffix is a possible critical factorization (u, v) of `arr`.
 //
 // Returns (`i`, `p`) where `i` is the starting index of v and `p` is the
 // period of v.
 //
 // `order_greater` determines if lexical order is `<` or `>`. Both
 // orders must be computed -- the ordering with the largest `i` gives
 // a critical factorization.
 //
 // For long period cases, the resulting period is not exact (it is too short).
 fn maximal_suffix(arr: &[char], order_greater: bool) -> (usize, usize) {
     let mut left = 0; // Corresponds to i in the paper
     let mut right = 1; // Corresponds to j in the paper
     let mut offset = 0; // Corresponds to k in the paper, but starting at 0
                         // to match 0-based indexing.
     let mut period = 1; // Corresponds to p in the paper

     while let Some(&a) = arr.get(right + offset) {
         // `left` will be inbounds when `right` is.
         let b = arr[left + offset];
         if (a < b && !order_greater) || (a > b && order_greater) {
             // Suffix is smaller, period is entire prefix so far.
             right += offset + 1;
             offset = 0;
             period = right - left;
         } else if a == b {
             // Advance through repetition of the current period.
             if offset + 1 == period {
                 right += offset + 1;
                 offset = 0;
             } else {
                 offset += 1;
             }
         } else {
             // Suffix is larger, start over from current location.
             left = right;
             right += 1;
             offset = 0;
             period = 1;
         }
     }
     (left, period)
 }
	// The strstr implementation in this file is extracted from the Rust standard
	// library's str::find. The algorithm works for arbitrary &[T] haystack and
	// needle but is only exposed by the standard library on UTF-8 strings.
	//
	// https://github.com/rust-lang/rust/blob/1.40.0/src/libcore/str/pattern.rs
	//
	// ---
	//
	// This is the Two-Way search algorithm, which was introduced in the paper:
	// Crochemore, M., Perrin, D., 1991, Two-way string-matching, Journal of the ACM 38(3):651-675.
	//
	// Here's some background information.
	//
	// A word is a string of symbols. The length of a word should be a familiar
	// notion, and here we denote it for any word x by \|x\|. (We also allow for the
	// possibility of the empty word, a word of length zero.)
	//
	// If x is any non-empty word, then an integer p with 0 < p <= \|x\| is said to be
	// a period for x iff for all i with 0 <= i <= \|x\| - p - 1, we have x[i] ==
	// x[i+p]. For example, both 1 and 2 are periods for the string "aa". As another
	// example, the only period of the string "abcd" is 4.
	//
	// We denote by period(x) the smallest period of x (provided that x is
	// non-empty). This is always well-defined since every non-empty word x has at
	// least one period, \|x\|. We sometimes call this the period of x.
	//
	// If u, v and x are words such that x = uv, where uv is the concatenation of u
	// and v, then we say that (u, v) is a factorization of x.
	//
	// Let (u, v) be a factorization for a word x. Then if w is a non-empty word
	// such that both of the following hold
	//
	// - either w is a suffix of u or u is a suffix of w
	// - either w is a prefix of v or v is a prefix of w
	//
	// then w is said to be a repetition for the factorization (u, v).
	//
	// Just to unpack this, there are four possibilities here. Let w = "abc". Then
	// we might have:
	//
	// - w is a suffix of u and w is a prefix of v. ex: ("lolabc", "abcde")
	// - w is a suffix of u and v is a prefix of w. ex: ("lolabc", "ab")
	// - u is a suffix of w and w is a prefix of v. ex: ("bc", "abchi")
	// - u is a suffix of w and v is a prefix of w. ex: ("bc", "a")
	//
	// Note that the word vu is a repetition for any factorization (u,v) of x = uv,
	// so every factorization has at least one repetition.
	//
	// If x is a string and (u, v) is a factorization for x, then a local period
	// for (u, v) is an integer r such that there is some word w such that \|w\| = r
	// and w is a repetition for (u, v).
	//
	// We denote by local_period(u, v) the smallest local period of (u, v). We
	// sometimes call this the local period of (u, v). Provided that x = uv is
	// non-empty, this is well-defined (because each non-empty word has at least one
	// factorization, as noted above).
	//
	// It can be proven that the following is an equivalent definition of a local
	// period for a factorization (u, v): any positive integer r such that x[i] ==
	// x[i+r] for all i such that \|u\| - r <= i <= \|u\| - 1 and such that both x[i]
	// and x[i+r] are defined. (i.e., i > 0 and i + r < \|x\|).
	//
	// Using the above reformulation, it is easy to prove that
	//
	// 1 <= local_period(u, v) <= period(uv)
	//
	// A factorization (u, v) of x such that local_period(u,v) = period(x) is called
	// a critical factorization.
	//
	// The algorithm hinges on the following theorem, which is stated without proof:
	//
	// Critical Factorization Theorem Any word x has at least one critical
	// factorization (u, v) such that \|u\| < period(x).
	//
	// The purpose of maximal_suffix is to find such a critical factorization.
	//
	// If the period is short, compute another factorization x = u' v' to use for
	// reverse search, chosen instead so that \|v'\| < period(x).

	use std::cmp;
	use std::usize;

	pub fn find(haystack: &[char], needle: &[char]) -> Option<usize> {
	assert!(!needle.is_empty());

	// crit_pos: critical factorization index
	let (crit_pos_false, period_false) = maximal_suffix(needle, false);
	let (crit_pos_true, period_true) = maximal_suffix(needle, true);
	let (crit_pos, mut period) = if crit_pos_false > crit_pos_true {
	(crit_pos_false, period_false)
	} else {
	(crit_pos_true, period_true)
	};

	// Byteset is an extension (not part of the two way algorithm); it is a
	// 64-bit "fingerprint" where each set bit j corresponds to a (byte & 63) ==
	// j present in the needle.
	let byteset;
	// Index into needle before which we have already matched.
	let mut memory;

	// A particularly readable explanation of what's going on here can be found
	// in Crochemore and Rytter's book "Text Algorithms", ch 13. Specifically
	// see the code for "Algorithm CP" on p. 323.
	//
	// What's going on is we have some critical factorization (u, v) of the
	// needle, and we want to determine whether u is a suffix of &v[..period].
	// If it is, we use "Algorithm CP1". Otherwise we use "Algorithm CP2", which
	// is optimized for when the period of the needle is large.
	let long_period = needle[..crit_pos] != needle[period..period + crit_pos];
	if long_period {
	// Long period case -- we have an approximation to the actual period,
	// and don't use memorization.
	//
	// Approximate the period by lower bound max(\|u\|, \|v\|) + 1.
	period = cmp::max(crit_pos, needle.len() - crit_pos) + 1;
	byteset = byteset_create(needle);
	// Dummy value to signify that the period is long.
	memory = usize::MAX;
	} else {
	// Short period case -- the period is exact.
	byteset = byteset_create(&needle[..period]);
	memory = 0;
	}

	// One of the main ideas of Two-Way is that we factorize the needle into two
	// halves, (u, v), and begin trying to find v in the haystack by scanning
	// left to right. If v matches, we try to match u by scanning right to left.
	// How far we can jump when we encounter a mismatch is all based on the fact
	// that (u, v) is a critical factorization for the needle.
	let mut position = 0;
	let needle_last = needle.len() - 1;
	'search: loop {
	// Check that we have room to search in. position + needle_last cannot
	// overflow if we assume slices are bounded by isize's range.
	let tail_byte = *haystack.get(position + needle_last)?;

	// Quickly skip by large portions unrelated to our substring.
	if !byteset_contains(byteset, tail_byte) {
	position += needle.len();
	if !long_period {
	memory = 0;
	}
	continue 'search;
	}

	// See if the right part of the needle matches.
	let start = if long_period {
	crit_pos
	} else {
	cmp::max(crit_pos, memory)
	};
	for i in start..needle.len() {
	if needle[i] != haystack[position + i] {
	position += i - crit_pos + 1;
	if !long_period {
	memory = 0;
	}
	continue 'search;
	}
	}

	// See if the left part of the needle matches.
	let start = if long_period { 0 } else { memory };
	for i in (start..crit_pos).rev() {
	if needle[i] != haystack[position + i] {
	position += period;
	if !long_period {
	memory = needle.len() - period;
	}
	continue 'search;
	}
	}

	// We have found a match!
	return Some(position);
	}
	}

	fn byteset_create(chars: &[char]) -> u64 {
	chars.iter().fold(0, \|a, &ch\| (1 << (ch as u8 & 0x3f)) \| a)
	}

	fn byteset_contains(byteset: u64, ch: char) -> bool {
	(byteset >> ((ch as u8 & 0x3f) as usize)) & 1 != 0
	}

	// Compute the maximal suffix of `arr`.
	//
	// The maximal suffix is a possible critical factorization (u, v) of `arr`.
	//
	// Returns (`i`, `p`) where `i` is the starting index of v and `p` is the
	// period of v.
	//
	// `order_greater` determines if lexical order is `<` or `>`. Both
	// orders must be computed -- the ordering with the largest `i` gives
	// a critical factorization.
	//
	// For long period cases, the resulting period is not exact (it is too short).
	fn maximal_suffix(arr: &[char], order_greater: bool) -> (usize, usize) {
	let mut left = 0; // Corresponds to i in the paper
	let mut right = 1; // Corresponds to j in the paper
	let mut offset = 0; // Corresponds to k in the paper, but starting at 0
	// to match 0-based indexing.
	let mut period = 1; // Corresponds to p in the paper

	while let Some(&a) = arr.get(right + offset) {
	// `left` will be inbounds when `right` is.
	let b = arr[left + offset];
	if (a < b && !order_greater) \|\| (a > b && order_greater) {
	// Suffix is smaller, period is entire prefix so far.
	right += offset + 1;
	offset = 0;
	period = right - left;
	} else if a == b {
	// Advance through repetition of the current period.
	if offset + 1 == period {
	right += offset + 1;
	offset = 0;
	} else {
	offset += 1;
	}
	} else {
	// Suffix is larger, start over from current location.
	left = right;
	right += 1;
	offset = 0;
	period = 1;
	}
	}
	(left, period)
	}