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author | fgodi <fgodi@636b058d-ea47-450e-bf9e-a15bfbe3eedb> | 2016-06-02 17:09:48 +0000 |
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committer | fgodi <fgodi@636b058d-ea47-450e-bf9e-a15bfbe3eedb> | 2016-06-02 17:09:48 +0000 |
commit | 3b5b94c90c81ae4938a89b2b4df8b1173f100ee3 (patch) | |
tree | cc8b30bdfc815ed239fffd5d902220789179d73d /src/Bottleneck_distance/test/bottleneck_unit_test.cpp | |
parent | 8f455abec0d349949960eaefdd0aedd8dff8e7ca (diff) |
renaming
git-svn-id: svn+ssh://scm.gforge.inria.fr/svnroot/gudhi/branches/bottleneckDistance@1240 636b058d-ea47-450e-bf9e-a15bfbe3eedb
Former-commit-id: 53bcbf20e176a21dc41ef3c4d4295b1e9aa959b0
Diffstat (limited to 'src/Bottleneck_distance/test/bottleneck_unit_test.cpp')
-rw-r--r-- | src/Bottleneck_distance/test/bottleneck_unit_test.cpp | 188 |
1 files changed, 188 insertions, 0 deletions
diff --git a/src/Bottleneck_distance/test/bottleneck_unit_test.cpp b/src/Bottleneck_distance/test/bottleneck_unit_test.cpp new file mode 100644 index 00000000..33ac3f1b --- /dev/null +++ b/src/Bottleneck_distance/test/bottleneck_unit_test.cpp @@ -0,0 +1,188 @@ +/* This file is part of the Gudhi Library. The Gudhi library + * (Geometric Understanding in Higher Dimensions) is a generic C++ + * library for computational topology. + * + * Author(s): Francois Godi + * + * Copyright (C) 2015 INRIA Sophia-Antipolis (France) + * + * 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 <http://www.gnu.org/licenses/>. + */ + + +#define BOOST_TEST_MODULE bottleneck test + +#include <boost/test/included/unit_test.hpp> +#include <random> +#include <gudhi/Graph_matching.h> + +using namespace Gudhi::Bottleneck_distance; + +int n1 = 81; // a natural number >0 +int n2 = 180; // a natural number >0 +double upper_bound = 406.43; // any real >0 + +BOOST_AUTO_TEST_CASE(persistence_diagrams_graph){ + // Random construction + std::uniform_real_distribution<double> unif(0.,upper_bound); + std::default_random_engine re; + std::vector< std::pair<double, double> > v1, v2; + for (int i = 0; i < n1; i++) { + double a = unif(re); + double b = unif(re); + v1.emplace_back(std::min(a,b), std::max(a,b)); + } + for (int i = 0; i < n2; i++) { + double a = unif(re); + double b = unif(re); + v2.emplace_back(std::min(a,b), std::max(a,b)); + } + G::initialize(v1, v2, 0.); + std::shared_ptr< std::vector<double> > d(G::sorted_distances()); + // + BOOST_CHECK(!G::on_the_u_diagonal(n1-1)); + BOOST_CHECK(!G::on_the_u_diagonal(n1)); + BOOST_CHECK(!G::on_the_u_diagonal(n2-1)); + BOOST_CHECK(G::on_the_u_diagonal(n2)); + BOOST_CHECK(!G::on_the_v_diagonal(n1-1)); + BOOST_CHECK(G::on_the_v_diagonal(n1)); + BOOST_CHECK(G::on_the_v_diagonal(n2-1)); + BOOST_CHECK(G::on_the_v_diagonal(n2)); + // + BOOST_CHECK(G::corresponding_point_in_u(0)==n2); + BOOST_CHECK(G::corresponding_point_in_u(n1)==0); + BOOST_CHECK(G::corresponding_point_in_v(0)==n1); + BOOST_CHECK(G::corresponding_point_in_v(n2)==0); + // + BOOST_CHECK(G::size()==(n1+n2)); + // + BOOST_CHECK((int) d->size() <= (n1+n2)*(n1+n2) - n1*n2 + 1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,0))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,n1-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,n1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,n2-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,n2))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(0,(n1+n2)-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,0))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,n1-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,n1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,n2-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,n2))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance(n1,(n1+n2)-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,0))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,n1-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,n1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,n2-1))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,n2))==1); + BOOST_CHECK(std::count(d->begin(), d->end(), G::distance((n1+n2)-1,(n1+n2)-1))==1); +} + +BOOST_AUTO_TEST_CASE(planar_neighbors_finder) { + Planar_neighbors_finder pnf(1.); + for(int v_point_index=0; v_point_index<n1; v_point_index+=2) + pnf.add(v_point_index); + // + BOOST_CHECK(pnf.contains(0)); + BOOST_CHECK(!pnf.contains(1)); + BOOST_CHECK(pnf.contains(2)); + BOOST_CHECK(!pnf.contains(3)); + // + pnf.remove(0); + pnf.remove(1); + // + BOOST_CHECK(!pnf.contains(0)); + BOOST_CHECK(!pnf.contains(1)); + BOOST_CHECK(pnf.contains(2)); + BOOST_CHECK(!pnf.contains(3)); + // + int v_point_index_1 = pnf.pull_near(n2/2); + BOOST_CHECK((v_point_index_1 == -1) || ((G::distance(n2/2,v_point_index_1)<=1.))); + BOOST_CHECK(!pnf.contains(v_point_index_1)); + std::list<int> l = *pnf.pull_all_near(n2/2); + bool v = true; + for(auto it = l.cbegin(); it != l.cend(); ++it) + v = v && (G::distance(n2/2,*it)>1.); + BOOST_CHECK(v); + int v_point_index_2 = pnf.pull_near(n2/2); + BOOST_CHECK(v_point_index_2 == -1); +} + +BOOST_AUTO_TEST_CASE(neighbors_finder) { + Neighbors_finder nf(1.); + for(int v_point_index=1; v_point_index<((n2+n1)*9/10); v_point_index+=2) + nf.add(v_point_index); + // + int v_point_index_1 = nf.pull_near(n2/2); + BOOST_CHECK((v_point_index_1 == -1) || (G::distance(n2/2,v_point_index_1)<=1.)); + std::list<int> l = *nf.pull_all_near(n2/2); + bool v = true; + for(auto it = l.cbegin(); it != l.cend(); ++it) + v = v && (G::distance(n2/2,*it)>1.); + BOOST_CHECK(v); + int v_point_index_2 = nf.pull_near(n2/2); + BOOST_CHECK(v_point_index_2 == -1); +} + +BOOST_AUTO_TEST_CASE(layered_neighbors_finder) { + Layered_neighbors_finder lnf(1.); + for(int v_point_index=1; v_point_index<((n2+n1)*9/10); v_point_index+=2) + lnf.add(v_point_index, v_point_index % 7); + // + int v_point_index_1 = lnf.pull_near(n2/2,6); + BOOST_CHECK((v_point_index_1 == -1) || (G::distance(n2/2,v_point_index_1)<=1.)); + int v_point_index_2 = lnf.pull_near(n2/2,6); + BOOST_CHECK(v_point_index_2 == -1); + v_point_index_1 = lnf.pull_near(n2/2,0); + BOOST_CHECK((v_point_index_1 == -1) || (G::distance(n2/2,v_point_index_1)<=1.)); + v_point_index_2 = lnf.pull_near(n2/2,0); + BOOST_CHECK(v_point_index_2 == -1); +} + +BOOST_AUTO_TEST_CASE(graph_matching) { + Graph_matching m1; + m1.set_r(0.); + int e = 0; + while (m1.multi_augment()) + ++e; + BOOST_CHECK(e <= 2*sqrt(2*(n1+n2))); + Graph_matching m2 = m1; + BOOST_CHECK(!m2.multi_augment()); + m2.set_r(upper_bound); + e = 0; + while (m2.multi_augment()) + ++e; + BOOST_CHECK(e <= 2*sqrt(2*(n1+n2))); + BOOST_CHECK(m2.perfect()); + BOOST_CHECK(!m1.perfect()); +} + +BOOST_AUTO_TEST_CASE(global){ + std::uniform_real_distribution<double> unif1(0.,upper_bound); + std::uniform_real_distribution<double> unif2(upper_bound/1000.,upper_bound/100.); + std::default_random_engine re; + std::vector< std::pair<double, double> > v1, v2; + for (int i = 0; i < n1; i++) { + double a = unif1(re); + double b = unif1(re); + double x = unif2(re); + double y = unif2(re); + v1.emplace_back(std::min(a,b), std::max(a,b)); + v2.emplace_back(std::min(a,b)+std::min(x,y), std::max(a,b)+std::max(x,y)); + if(i%5==0) + v1.emplace_back(std::min(a,b),std::min(a,b)+x); + if(i%3==0) + v2.emplace_back(std::max(a,b),std::max(a,b)+y); + } + BOOST_CHECK(bottleneck_distance(v1, v2) <= upper_bound/100.); +} |