/* LA: linear algebra C++ interface library Copyright (C) 2021 Jiri Pittner or This program 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 of the License, or (at your option) any later version. This program 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 this program. If not, see . */ #include "permutation.h" #include #include namespace LA { template void NRPerm::identity() { T n=this->size(); #ifdef DEBUG if(n<0) laerror("invalid permutation size"); #endif if(n==0) return; this->copyonwrite(); for(T i=1; i<=n; ++i) (*this)[i]=i; } template bool NRPerm::is_identity() const { T n=this->size(); #ifdef DEBUG if(n<0) laerror("invalid permutation size"); #endif if(n==0) return 1; for(T i=1; i<=n; ++i) if((*this)[i]!=i) return 0; return 1; } template bool NRPerm::is_valid() const { T n = this->size(); if(n<0) return 0; NRVec_from1 used(n); used.clear(); for(T i=1; i<=n; ++i) { T x= (*this)[i]; if(x<1||x>n) return 0; used[x] += 1; } for(T i=1; i<=n; ++i) if(used[i]!=1) return 0; return 1; } template NRPerm NRPerm::inverse() const { #ifdef DEBUG if(!this->is_valid()) laerror("inverse of invalid permutation"); #endif NRPerm q(this->size()); for(T i=1; i<=this->size(); ++i) q[(*this)[i]]=i; return q; } template NRPerm NRPerm::operator*(const NRPerm q) const { #ifdef DEBUG if(!this->is_valid() || !q.is_valid()) laerror("multiplication of invalid permutation"); #endif T n=this->size(); if(n!=q.size()) laerror("product of incompatible permutations"); NRPerm r(n); for(T i=1; i<=n; ++i) r[i] = (*this)[q[i]]; return r; } template NRPerm NRPerm::conjugate_by(const NRPerm q) const { #ifdef DEBUG if(!this->is_valid() || !q.is_valid()) laerror("multiplication of invalid permutation"); #endif T n=this->size(); if(n!=q.size()) laerror("product of incompatible permutations"); NRPerm qi=q.inverse(); NRPerm r(n); for(T i=1; i<=n; ++i) r[i] = qi[(*this)[q[i]]]; return r; } template int NRPerm::parity() const { if(!this->is_valid()) return 0; T n=this->size(); if(n==1) return 1; T count=0; for(T i=2;i<=n;i++) for(T j=1;j(*this)[i]) count++; return (count&1)? -1:1; } template NRPerm::NRPerm(const CyclePerm &rhs, const int n) { #ifdef DEBUG if(!rhs.is_valid()) laerror("invalid cycle permutation"); #endif int m; if(n) m=n; else m=rhs.max(); this->resize(m); identity(); T ncycles=rhs.size(); for(T j=1; j<=ncycles; ++j) { T length= rhs[j].size(); for(T i=1; i<=length; ++i) (*this)[rhs[j][i]] = rhs[j][i%length+1]; } #ifdef DEBUG if(!is_valid()) laerror("internal error in NRPerm constructor from CyclePerm"); #endif } template void NRPerm::randomize(void) { int n=this->size(); if(n<=0) laerror("cannot randomize empty permutation"); this->copyonwrite(); this->identity(); for(int i=n-1; i>=1; --i) { int j= random()%(i+1); T tmp = (*this)[i+1]; (*this)[i+1]=(*this)[j+1]; (*this)[j+1]=tmp; } } //////////////////////////////////////////////////////// template CyclePerm:: CyclePerm(const NRPerm &p) { #ifdef DEBUG if(!p.is_valid()) laerror("invalid permutation"); #endif T n=p.size(); NRVec_from1 used(0,n),tmp(n); T firstunused=1; T currentcycle=0; std::list > cyclelist={}; do { //find a cycle starting with first unused element T cyclelength=0; T next = firstunused; do { ++cyclelength; used[next]=1; tmp[cyclelength] = next; next = p[next]; } while(used[next]==0); if(cyclelength>1) //nontrivial cycle { NRVec_from1 cycle(&tmp[1],cyclelength); cyclelist.push_front(cycle); ++currentcycle; } while(used[firstunused]) {++firstunused; if(firstunused>n) break;} //find next unused element } while(firstunused<=n); //convert list to NRVec this->resize(currentcycle); T i=1; for(auto l=cyclelist.begin(); l!=cyclelist.end(); ++l) (*this)[i++] = *l; } template bool CyclePerm::is_valid() const { for(T i=1; i<=this->size(); ++i) { T n=(*this)[i].size(); if(n<=0) return false; for(T j=1; j<=n; ++j) { T x=(*this)[i][j]; if(x<=0) return false; //now check for illegal duplicity of numbers withis a cycle or across cycles for(T ii=i; ii<=this->size(); ++ii) { T nn=(*this)[ii].size(); for(T jj=(ii==i?j+1:1); jj<=nn; ++jj) { T xx=(*this)[ii][jj]; if(x==xx) return false; } } } } return true; } template bool CyclePerm::is_identity() const { #ifdef DEBUG if(!this->is_valid()) laerror("operation with an invalid cycleperm"); #endif for(T i=1; i<=this->size(); ++i) if((*this)[i].size()>1) return false; //at least one nontrivial cycle return true; } template CyclePerm CyclePerm::inverse() const { #ifdef DEBUG if(!this->is_valid()) laerror("operation with an invalid cycleperm"); #endif CyclePerm r; T ncycles=this->size(); r.resize(ncycles); for(T i=1; i<=ncycles; ++i) { T length=(*this)[i].size(); r[i].resize(length); //reverse order in cycles (does not matter in cycle lengths 1 and 2 anyway) for(T j=1; j<=length; ++j) r[i][j] = (*this)[i][length-j+1]; } return r; } //multiplication via NRPerm - could there be a more efficient direct algorithm? template CyclePerm CyclePerm::operator*(const CyclePerm q) const { int m=this->max(); int mm=q.max(); if(mm>m) mm=m; NRPerm qq(q,m); NRPerm pp(*this,m); NRPerm rr=pp*qq; return CyclePerm(rr); } template int CyclePerm::parity() const { #ifdef DEBUG if(!this->is_valid()) laerror("operation with an invalid cycleperm"); #endif int n_even_cycles=0; T ncycles=this->size(); for(T i=1; i<=ncycles; ++i) { T length=(*this)[i].size(); if((length&1)==0) ++n_even_cycles; } return (n_even_cycles&1)?-1:1; } template Partition CyclePerm::cycles(const T n) const { #ifdef DEBUG if(!this->is_valid()) laerror("operation with an invalid cycleperm"); #endif Partition r(n); r.clear(); T ncycles=this->size(); for(T i=1; i<=ncycles; ++i) { T length=(*this)[i].size(); if(length<=0||length>n) laerror("unexpected cycle length in permutation"); r[length]++; } //fill in trivial cycles of length one r[1] += n - r.sum(); if(r[1]<0) laerror("inconsistent cycle lengths in CyclePerm::cycles"); return r; } //auxiliary function for input of a permutation in cycle format //returns pointer after closing bracket or NULL if no cycle found //or input error template const char *read1cycle(NRVec_from1 &c, const char *p) { if(*p==0) return NULL; const char *openbracket = strchr(p,'('); if(!openbracket) return NULL; const char *closebracket = strchr(openbracket+1,')'); if(!closebracket) return NULL; const char *s = openbracket+1; int r; int length=0; std::list cycle; do { long int tmp; int nchar; if(*s==',') ++s; r = sscanf(s,"%ld%n",&tmp,&nchar); if(r==1) { ++length; s += nchar; cycle.push_back((T)tmp); } } while(r==1 && s void CyclePerm::readfrom(const std::string &line) { const char *p=line.c_str(); std::list > cyclelist={}; int ncycles=0; int count=0; NRVec_from1 c; while(p=read1cycle(c,p)) { //printf("cycle %d of length %d read\n",count,c.size()); if(c.size()!=0) //store a nonempty cycle { ++count; cyclelist.push_back(c); } } //convert list to vector this->resize(count); T i=0; for(auto l=cyclelist.begin(); l!=cyclelist.end(); ++l) (*this)[++i] = *l; #ifdef DEBUG if(!this->is_valid()) laerror("readfrom received input of invalid CyclePerm"); #endif } template std::istream & operator>>(std::istream &s, CyclePerm &x) { std::string l; getline(s,l); x.readfrom(l); return s; } template std::ostream & operator<<(std::ostream &s, const CyclePerm &x) { for(int i=1; i<=x.size(); ++i) { s<<"("; for(int j=1; j<=x[i].size(); ++j) { s<; template class CyclePerm; template class Partition; #define INSTANTIZE(T) \ template std::istream & operator>>(std::istream &s, CyclePerm &x); \ template std::ostream & operator<<(std::ostream &s, const CyclePerm &x); \ INSTANTIZE(int) }//namespace