/* A class for building vector constant patterns. Copyright (C) 2017-2019 Free Software Foundation, Inc. This file is part of GCC. GCC is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 3, or (at your option) any later version. GCC is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. You should have received a copy of the GNU General Public License along with GCC; see the file COPYING3. If not see . */ #ifndef GCC_VECTOR_BUILDER_H #define GCC_VECTOR_BUILDER_H /* This class is a wrapper around auto_vec for building vectors of T. It aims to encode each vector as npatterns interleaved patterns, where each pattern represents a sequence: { BASE0, BASE1, BASE1 + STEP, BASE1 + STEP*2, BASE1 + STEP*3, ... } The first three elements in each pattern provide enough information to derive the other elements. If all patterns have a STEP of zero, we only need to encode the first two elements in each pattern. If BASE1 is also equal to BASE0 for all patterns, we only need to encode the first element in each pattern. The number of encoded elements per pattern is given by nelts_per_pattern. The class can be used in two ways: 1. It can be used to build a full image of the vector, which is then canonicalized by finalize (). In this case npatterns is initially the number of elements in the vector and nelts_per_pattern is initially 1. 2. It can be used to build a vector that already has a known encoding. This is preferred since it is more efficient and copes with variable-length vectors. finalize () then canonicalizes the encoding to a simpler form if possible. The derived class Derived provides this functionality for specific Ts. Derived needs to provide the following interface: bool equal_p (T elt1, T elt2) const; Return true if elements ELT1 and ELT2 are equal. bool allow_steps_p () const; Return true if a stepped representation is OK. We don't allow linear series for anything other than integers, to avoid problems with rounding. bool integral_p (T elt) const; Return true if element ELT can be interpreted as an integer. StepType step (T elt1, T elt2) const; Return the value of element ELT2 minus the value of element ELT1, given integral_p (ELT1) && integral_p (ELT2). There is no fixed choice of StepType. T apply_step (T base, unsigned int factor, StepType step) const; Return a vector element with the value BASE + FACTOR * STEP. bool can_elide_p (T elt) const; Return true if we can drop element ELT, even if the retained elements are different. This is provided for TREE_OVERFLOW handling. void note_representative (T *elt1_ptr, T elt2); Record that ELT2 is being elided, given that ELT1_PTR points to the last encoded element for the containing pattern. This is again provided for TREE_OVERFLOW handling. */ template class vector_builder : public auto_vec { public: vector_builder (); poly_uint64 full_nelts () const { return m_full_nelts; } unsigned int npatterns () const { return m_npatterns; } unsigned int nelts_per_pattern () const { return m_nelts_per_pattern; } unsigned int encoded_nelts () const; bool encoded_full_vector_p () const; T elt (unsigned int) const; unsigned int count_dups (int, int, int) const; bool operator == (const Derived &) const; bool operator != (const Derived &x) const { return !operator == (x); } void finalize (); protected: void new_vector (poly_uint64, unsigned int, unsigned int); void reshape (unsigned int, unsigned int); bool repeating_sequence_p (unsigned int, unsigned int, unsigned int); bool stepped_sequence_p (unsigned int, unsigned int, unsigned int); bool try_npatterns (unsigned int); private: vector_builder (const vector_builder &); vector_builder &operator= (const vector_builder &); Derived *derived () { return static_cast (this); } const Derived *derived () const; poly_uint64 m_full_nelts; unsigned int m_npatterns; unsigned int m_nelts_per_pattern; }; template inline const Derived * vector_builder::derived () const { return static_cast (this); } template inline vector_builder::vector_builder () : m_full_nelts (0), m_npatterns (0), m_nelts_per_pattern (0) {} /* Return the number of elements that are explicitly encoded. The vec starts with these explicitly-encoded elements and may contain additional elided elements. */ template inline unsigned int vector_builder::encoded_nelts () const { return m_npatterns * m_nelts_per_pattern; } /* Return true if every element of the vector is explicitly encoded. */ template inline bool vector_builder::encoded_full_vector_p () const { return known_eq (m_npatterns * m_nelts_per_pattern, m_full_nelts); } /* Start building a vector that has FULL_NELTS elements. Initially encode it using NPATTERNS patterns with NELTS_PER_PATTERN each. */ template void vector_builder::new_vector (poly_uint64 full_nelts, unsigned int npatterns, unsigned int nelts_per_pattern) { m_full_nelts = full_nelts; m_npatterns = npatterns; m_nelts_per_pattern = nelts_per_pattern; this->reserve (encoded_nelts ()); this->truncate (0); } /* Return true if this vector and OTHER have the same elements and are encoded in the same way. */ template bool vector_builder::operator == (const Derived &other) const { if (maybe_ne (m_full_nelts, other.m_full_nelts) || m_npatterns != other.m_npatterns || m_nelts_per_pattern != other.m_nelts_per_pattern) return false; unsigned int nelts = encoded_nelts (); for (unsigned int i = 0; i < nelts; ++i) if (!derived ()->equal_p ((*this)[i], other[i])) return false; return true; } /* Return the value of vector element I, which might or might not be encoded explicitly. */ template T vector_builder::elt (unsigned int i) const { /* This only makes sense if the encoding has been fully populated. */ gcc_checking_assert (encoded_nelts () <= this->length ()); /* First handle elements that are already present in the underlying vector, regardless of whether they're part of the encoding or not. */ if (i < this->length ()) return (*this)[i]; /* Identify the pattern that contains element I and work out the index of the last encoded element for that pattern. */ unsigned int pattern = i % m_npatterns; unsigned int count = i / m_npatterns; unsigned int final_i = encoded_nelts () - m_npatterns + pattern; T final = (*this)[final_i]; /* If there are no steps, the final encoded value is the right one. */ if (m_nelts_per_pattern <= 2) return final; /* Otherwise work out the value from the last two encoded elements. */ T prev = (*this)[final_i - m_npatterns]; return derived ()->apply_step (final, count - 2, derived ()->step (prev, final)); } /* Return the number of leading duplicate elements in the range [START:END:STEP]. The value is always at least 1. */ template unsigned int vector_builder::count_dups (int start, int end, int step) const { gcc_assert ((end - start) % step == 0); unsigned int ndups = 1; for (int i = start + step; i != end && derived ()->equal_p (elt (i), elt (start)); i += step) ndups++; return ndups; } /* Change the encoding to NPATTERNS patterns of NELTS_PER_PATTERN each, but without changing the underlying vector. */ template void vector_builder::reshape (unsigned int npatterns, unsigned int nelts_per_pattern) { unsigned int old_encoded_nelts = encoded_nelts (); unsigned int new_encoded_nelts = npatterns * nelts_per_pattern; gcc_checking_assert (new_encoded_nelts <= old_encoded_nelts); unsigned int next = new_encoded_nelts - npatterns; for (unsigned int i = new_encoded_nelts; i < old_encoded_nelts; ++i) { derived ()->note_representative (&(*this)[next], (*this)[i]); next += 1; if (next == new_encoded_nelts) next -= npatterns; } m_npatterns = npatterns; m_nelts_per_pattern = nelts_per_pattern; } /* Return true if elements [START, END) contain a repeating sequence of STEP elements. */ template bool vector_builder::repeating_sequence_p (unsigned int start, unsigned int end, unsigned int step) { for (unsigned int i = start; i < end - step; ++i) if (!derived ()->equal_p ((*this)[i], (*this)[i + step])) return false; return true; } /* Return true if elements [START, END) contain STEP interleaved linear series. */ template bool vector_builder::stepped_sequence_p (unsigned int start, unsigned int end, unsigned int step) { if (!derived ()->allow_steps_p ()) return false; for (unsigned int i = start + step * 2; i < end; ++i) { T elt1 = (*this)[i - step * 2]; T elt2 = (*this)[i - step]; T elt3 = (*this)[i]; if (!derived ()->integral_p (elt1) || !derived ()->integral_p (elt2) || !derived ()->integral_p (elt3)) return false; if (maybe_ne (derived ()->step (elt1, elt2), derived ()->step (elt2, elt3))) return false; if (!derived ()->can_elide_p (elt3)) return false; } return true; } /* Try to change the number of encoded patterns to NPATTERNS, returning true on success. */ template bool vector_builder::try_npatterns (unsigned int npatterns) { if (m_nelts_per_pattern == 1) { /* See whether NPATTERNS is valid with the current 1-element-per-pattern encoding. */ if (repeating_sequence_p (0, encoded_nelts (), npatterns)) { reshape (npatterns, 1); return true; } /* We can only increase the number of elements per pattern if all elements are still encoded explicitly. */ if (!encoded_full_vector_p ()) return false; } if (m_nelts_per_pattern <= 2) { /* See whether NPATTERNS is valid with a 2-element-per-pattern encoding. */ if (repeating_sequence_p (npatterns, encoded_nelts (), npatterns)) { reshape (npatterns, 2); return true; } /* We can only increase the number of elements per pattern if all elements are still encoded explicitly. */ if (!encoded_full_vector_p ()) return false; } if (m_nelts_per_pattern <= 3) { /* See whether we have NPATTERNS interleaved linear series, giving a 3-element-per-pattern encoding. */ if (stepped_sequence_p (npatterns, encoded_nelts (), npatterns)) { reshape (npatterns, 3); return true; } return false; } gcc_unreachable (); } /* Replace the current encoding with the canonical form. */ template void vector_builder::finalize () { /* The encoding requires the same number of elements to come from each pattern. */ gcc_assert (multiple_p (m_full_nelts, m_npatterns)); /* Allow the caller to build more elements than necessary. For example, it's often convenient to build a stepped vector from the natural encoding of three elements even if the vector itself only has two. */ unsigned HOST_WIDE_INT const_full_nelts; if (m_full_nelts.is_constant (&const_full_nelts) && const_full_nelts <= encoded_nelts ()) { m_npatterns = const_full_nelts; m_nelts_per_pattern = 1; } /* Try to whittle down the number of elements per pattern. That is: 1. If we have stepped patterns whose steps are all 0, reduce the number of elements per pattern from 3 to 2. 2. If we have background fill values that are the same as the foreground values, reduce the number of elements per pattern from 2 to 1. */ while (m_nelts_per_pattern > 1 && repeating_sequence_p (encoded_nelts () - m_npatterns * 2, encoded_nelts (), m_npatterns)) /* The last two sequences of M_NPATTERNS elements are equal, so remove the last one. */ reshape (m_npatterns, m_nelts_per_pattern - 1); if (pow2p_hwi (m_npatterns)) { /* Try to halve the number of patterns while doing so gives a valid pattern. This approach is linear in the number of elements, whereas searcing from 1 up would be O(n*log(n)). Each halving step tries to keep the number of elements per pattern the same. If that isn't possible, and if all elements are still explicitly encoded, the halving step can instead increase the number of elements per pattern. E.g. for: { 0, 2, 3, 4, 5, 6, 7, 8 } npatterns == 8 full_nelts == 8 we first realize that the second half of the sequence is not equal to the first, so we cannot maintain 1 element per pattern for npatterns == 4. Instead we halve the number of patterns and double the number of elements per pattern, treating this as a "foreground" { 0, 2, 3, 4 } against a "background" of { 5, 6, 7, 8 | 5, 6, 7, 8 ... }: { 0, 2, 3, 4 | 5, 6, 7, 8 } npatterns == 4 Next we realize that this is *not* a foreround of { 0, 2 } against a background of { 3, 4 | 3, 4 ... }, so the only remaining option for reducing the number of patterns is to use a foreground of { 0, 2 } against a stepped background of { 1, 2 | 3, 4 | 5, 6 ... }. This is valid because we still haven't elided any elements: { 0, 2 | 3, 4 | 5, 6 } npatterns == 2 This in turn can be reduced to a foreground of { 0 } against a stepped background of { 1 | 2 | 3 ... }: { 0 | 2 | 3 } npatterns == 1 This last step would not have been possible for: { 0, 0 | 3, 4 | 5, 6 } npatterns == 2. */ while ((m_npatterns & 1) == 0 && try_npatterns (m_npatterns / 2)) continue; /* Builders of arbitrary fixed-length vectors can use: new_vector (x, x, 1) so that every element is specified explicitly. Handle cases that are actually wrapping series, like { 0, 1, 2, 3, 0, 1, 2, 3 } would be for 2-bit elements. We'll have treated them as duplicates in the loop above. */ if (m_nelts_per_pattern == 1 && m_full_nelts.is_constant (&const_full_nelts) && this->length () >= const_full_nelts && (m_npatterns & 3) == 0 && stepped_sequence_p (m_npatterns / 4, const_full_nelts, m_npatterns / 4)) { reshape (m_npatterns / 4, 3); while ((m_npatterns & 1) == 0 && try_npatterns (m_npatterns / 2)) continue; } } else /* For the non-power-of-2 case, do a simple search up from 1. */ for (unsigned int i = 1; i <= m_npatterns / 2; ++i) if (m_npatterns % i == 0 && try_npatterns (i)) break; } #endif