mirror of https://github.com/davisking/dlib.git
338 lines
10 KiB
C++
338 lines
10 KiB
C++
// The contents of this file are in the public domain. See LICENSE_FOR_EXAMPLE_PROGRAMS.txt
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/*
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This is an example illustrating the use of the quantum computing
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simulation classes from the dlib C++ Library.
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This example assumes you are familiar with quantum computing and
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Grover's search algorithm and Shor's 9 bit error correcting code
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in particular. The example shows how to simulate both of these
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algorithms.
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The code to simulate Grover's algorithm is primarily here to show
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you how to make custom quantum gate objects. The Shor ECC example
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is simpler and uses just the default gates that come with the
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library.
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*/
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#include <iostream>
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#include <complex>
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#include <ctime>
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#include "dlib/quantum_computing.h"
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#include "dlib/string.h"
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using namespace std;
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using namespace dlib;
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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// This declares a random number generator that we will be using below
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dlib::rand rnd;
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// ----------------------------------------------------------------------------------------
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void shor_encode (
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quantum_register& reg
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)
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/*!
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requires
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- reg.num_bits() == 1
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ensures
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- #reg.num_bits() == 9
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- #reg == the Shor error coding of the input register
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!*/
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{
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DLIB_CASSERT(reg.num_bits() == 1,"");
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quantum_register zeros;
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zeros.set_num_bits(8);
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reg.append(zeros);
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using namespace dlib::quantum_gates;
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const gate<1> h = hadamard();
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const gate<1> i = noop();
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// Note that the expression (h,i) represents the tensor product of the 1 qubit
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// h gate with the 1 qubit i gate and larger versions of this expression
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// represent even bigger tensor products. So as you see below, we make gates
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// big enough to apply to our quantum register by listing out all the gates we
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// want to go into the tensor product and then we just apply the resulting gate
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// to the quantum register.
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// Now apply the gates that constitute Shor's encoding to the input register.
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(cnot<3,0>(),i,i,i,i,i).apply_gate_to(reg);
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(cnot<6,0>(),i,i).apply_gate_to(reg);
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(h,i,i,h,i,i,h,i,i).apply_gate_to(reg);
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(cnot<1,0>(),i,cnot<1,0>(),i,cnot<1,0>(),i).apply_gate_to(reg);
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(cnot<2,0>(),cnot<2,0>(),cnot<2,0>()).apply_gate_to(reg);
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}
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// ----------------------------------------------------------------------------------------
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void shor_decode (
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quantum_register& reg
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)
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/*!
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requires
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- reg.num_bits() == 9
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ensures
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- #reg.num_bits() == 1
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- #reg == the decoded qubit that was in the given input register
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!*/
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{
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DLIB_CASSERT(reg.num_bits() == 9,"");
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using namespace dlib::quantum_gates;
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const gate<1> h = hadamard();
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const gate<1> i = noop();
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// Now apply the gates that constitute Shor's decoding to the input register
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(cnot<2,0>(),cnot<2,0>(),cnot<2,0>()).apply_gate_to(reg);
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(cnot<1,0>(),i,cnot<1,0>(),i,cnot<1,0>(),i).apply_gate_to(reg);
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(toffoli<0,1,2>(),toffoli<0,1,2>(),toffoli<0,1,2>()).apply_gate_to(reg);
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(h,i,i,h,i,i,h,i,i).apply_gate_to(reg);
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(cnot<6,0>(),i,i).apply_gate_to(reg);
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(cnot<3,0>(),i,i,i,i,i).apply_gate_to(reg);
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(toffoli<0,3,6>(),i,i).apply_gate_to(reg);
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// Now that we have decoded the value we don't need the extra 8 bits any more so
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// remove them from the register.
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for (int i = 0; i < 8; ++i)
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reg.measure_and_remove_bit(0,rnd);
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}
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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// This is the function we will use in Grover's search algorithm. In this
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// case the value we are searching for is 257.
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bool is_key (unsigned long n)
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{
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return n == 257;
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}
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// ----------------------------------------------------------------------------------------
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template <int bits>
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class uf_gate;
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namespace dlib {
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template <int bits>
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struct gate_traits<uf_gate<bits> >
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{
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static const long num_bits = bits;
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static const long dims = dlib::qc_helpers::exp_2_n<num_bits>::value;
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};}
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template <int bits>
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class uf_gate : public gate_exp<uf_gate<bits> >
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{
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/*!
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This gate represents the black box function in Grover's search algorithm.
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That is, it is the gate defined as follows:
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Uf|x>|y> = |x>|y XOR is_key(x)>
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See the documentation for the gate_exp object for the details regarding
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the compute_state_element() and operator() functions defined below.
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!*/
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public:
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uf_gate() : gate_exp<uf_gate>(*this) {}
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static const long num_bits = gate_traits<uf_gate>::num_bits;
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static const long dims = gate_traits<uf_gate>::dims;
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const qc_scalar_type operator() (long r, long c) const
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{
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unsigned long output = c;
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// if the input control bit is set
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if (is_key(output>>1))
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{
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output = output^0x1;
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}
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if ((unsigned long)r == output)
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return 1;
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else
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return 0;
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}
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template <typename exp>
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qc_scalar_type compute_state_element (
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const matrix_exp<exp>& reg,
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long row_idx
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) const
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{
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unsigned long output = row_idx;
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// if the input control bit is set
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if (is_key(output>>1))
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{
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output = output^0x1;
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}
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return reg(output);
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}
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};
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// ----------------------------------------------------------------------------------------
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template <int bits>
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class w_gate;
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namespace dlib {
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template <int bits>
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struct gate_traits<w_gate<bits> >
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{
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static const long num_bits = bits;
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static const long dims = dlib::qc_helpers::exp_2_n<num_bits>::value;
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}; }
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template <int bits>
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class w_gate : public gate_exp<w_gate<bits> >
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{
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/*!
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This is the W gate from the Grover algorithm
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!*/
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public:
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w_gate() : gate_exp<w_gate>(*this) {}
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static const long num_bits = gate_traits<w_gate>::num_bits;
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static const long dims = gate_traits<w_gate>::dims;
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const qc_scalar_type operator() (long r, long c) const
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{
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qc_scalar_type res = 2.0/dims;
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if (r != c)
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return res;
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else
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return res - 1.0;
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}
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template <typename exp>
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qc_scalar_type compute_state_element (
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const matrix_exp<exp>& reg,
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long row_idx
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) const
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{
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qc_scalar_type temp = sum(reg)*2.0/dims;
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// compute this value: temp = temp - reg(row_idx)*2.0/dims + reg(row_idx)*(2.0/dims - 1.0)
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temp = temp - reg(row_idx);
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return temp;
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}
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};
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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// ----------------------------------------------------------------------------------------
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int main()
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{
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// seed the random number generator
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rnd.set_seed(cast_to_string(time(0)));
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// Pick out some of the gates we will be using below
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using namespace dlib::quantum_gates;
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const gate<1> h = quantum_gates::hadamard();
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const gate<1> z = quantum_gates::z();
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const gate<1> x = quantum_gates::x();
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const gate<1> i = quantum_gates::noop();
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quantum_register reg;
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// We will be doing the 12 qubit version of Grover's search algorithm.
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const int bits=12;
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reg.set_num_bits(bits);
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// set the quantum register to its initial state
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(i,i, i,i,i,i,i, i,i,i,i,x).apply_gate_to(reg);
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// Print out the starting bits
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cout << "starting bits: ";
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for (int i = reg.num_bits()-1; i >= 0; --i)
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cout << reg.probability_of_bit(i);
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cout << endl;
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// Now apply the Hadamard gate to all the input bits
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(h,h, h,h,h,h,h, h,h,h,h,h).apply_gate_to(reg);
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// Here we do the grover iteration
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for (int j = 0; j < 35; ++j)
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{
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(uf_gate<bits>()).apply_gate_to(reg);
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(w_gate<bits-1>(),i).apply_gate_to(reg);
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cout << j << " probability: bit 1 = " << reg.probability_of_bit(1) << ", bit 9 = " << reg.probability_of_bit(9) << endl;
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}
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cout << endl;
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// Print out the final probability of measuring a 1 for each of the bits
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for (int i = reg.num_bits()-1; i >= 1; --i)
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cout << "probability for bit " << i << " = " << reg.probability_of_bit(i) << endl;
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cout << endl;
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cout << "The value we want grover's search to find is 257 which means we should measure a bit pattern of 00100000001" << endl;
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cout << "Measured bits: ";
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// finally, measure all the bits and print out what they are.
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for (int i = reg.num_bits()-1; i >= 1; --i)
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cout << reg.measure_bit(i,rnd);
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cout << endl;
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// Now lets test out the Shor 9 bit encoding
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cout << "\n\n\n\nNow lets try playing around with Shor's 9bit error correcting code" << endl;
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// Reset the quantum register to contain a single bit
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reg.set_num_bits(1);
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// Set the state of this single qubit to some random mixture of the two computational bases
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reg.state_vector()(0) = qc_scalar_type(rnd.get_random_double(),rnd.get_random_double());
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reg.state_vector()(1) = qc_scalar_type(rnd.get_random_double(),rnd.get_random_double());
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// Make sure the state of the quantum register is a unit vector
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reg.state_vector() /= sqrt(sum(norm(reg.state_vector())));
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cout << "state: " << trans(reg.state_vector());
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shor_encode(reg);
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cout << "x bit corruption on bit 8" << endl;
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(x,i,i,i,i,i,i,i,i).apply_gate_to(reg); // mess up the high order bit
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shor_decode(reg); // try to decode the register
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cout << "state: " << trans(reg.state_vector());
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shor_encode(reg);
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cout << "x bit corruption on bit 1" << endl;
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(i,i,i,i,i,i,i,x,i).apply_gate_to(reg);
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shor_decode(reg);
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cout << "state: " << trans(reg.state_vector());
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shor_encode(reg);
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cout << "z bit corruption on bit 8" << endl;
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(z,i,i,i,i,i,i,i,i).apply_gate_to(reg);
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shor_decode(reg);
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cout << "state: " << trans(reg.state_vector());
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cout << "\nThe state of the input qubit survived all the corruptions in tact so the code works." << endl;
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}
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