Mercurial > hg > orthanc-stone
view Framework/Toolbox/AffineTransform2D.cpp @ 527:b1377625e4ba bgo-commands-codegen
Removed ICommand and friends + fixed warnings + added missing header files in
solution (in CMakeLists.txt file)
author | Benjamin Golinvaux <bgo@osimis.io> |
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date | Sun, 17 Mar 2019 20:14:20 +0100 |
parents | b70e9be013e4 |
children | 911297a277c4 |
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/** * Stone of Orthanc * Copyright (C) 2012-2016 Sebastien Jodogne, Medical Physics * Department, University Hospital of Liege, Belgium * Copyright (C) 2017-2019 Osimis S.A., Belgium * * This program is free software: you can redistribute it and/or * modify it under the terms of the GNU Affero 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 * Affero General Public License for more details. * * You should have received a copy of the GNU Affero General Public License * along with this program. If not, see <http://www.gnu.org/licenses/>. **/ #include "AffineTransform2D.h" #include "ImageGeometry.h" #include <Core/Logging.h> #include <Core/OrthancException.h> namespace OrthancStone { AffineTransform2D::AffineTransform2D() : matrix_(LinearAlgebra::IdentityMatrix(3)) { } AffineTransform2D::AffineTransform2D(const Matrix& m) { if (m.size1() != 3 || m.size2() != 3) { throw Orthanc::OrthancException(Orthanc::ErrorCode_IncompatibleImageSize); } if (!LinearAlgebra::IsCloseToZero(m(2, 0)) || !LinearAlgebra::IsCloseToZero(m(2, 1)) || LinearAlgebra::IsCloseToZero(m(2, 2))) { LOG(ERROR) << "Cannot setup an AffineTransform2D with perspective effects"; throw Orthanc::OrthancException(Orthanc::ErrorCode_ParameterOutOfRange); } matrix_ = m / m(2, 2); } void AffineTransform2D::Apply(double& x /* inout */, double& y /* inout */) const { Vector p; LinearAlgebra::AssignVector(p, x, y, 1); Vector q = LinearAlgebra::Product(matrix_, p); if (!LinearAlgebra::IsNear(q[2], 1.0)) { throw Orthanc::OrthancException(Orthanc::ErrorCode_InternalError); } else { x = q[0]; y = q[1]; } } void AffineTransform2D::Apply(Orthanc::ImageAccessor& target, const Orthanc::ImageAccessor& source, ImageInterpolation interpolation, bool clear) const { assert(LinearAlgebra::IsNear(matrix_(2, 0), 0) && LinearAlgebra::IsNear(matrix_(2, 1), 0) && LinearAlgebra::IsNear(matrix_(2, 2), 1)); ApplyAffineTransform(target, source, matrix_(0, 0), matrix_(0, 1), matrix_(0, 2), matrix_(1, 0), matrix_(1, 1), matrix_(1, 2), interpolation, clear); } AffineTransform2D AffineTransform2D::Invert(const AffineTransform2D& a) { AffineTransform2D t; LinearAlgebra::InvertMatrix(t.matrix_, a.matrix_); return t; } AffineTransform2D AffineTransform2D::Combine(const AffineTransform2D& a, const AffineTransform2D& b) { return AffineTransform2D(LinearAlgebra::Product(a.GetHomogeneousMatrix(), b.GetHomogeneousMatrix())); } AffineTransform2D AffineTransform2D::Combine(const AffineTransform2D& a, const AffineTransform2D& b, const AffineTransform2D& c) { return AffineTransform2D(LinearAlgebra::Product(a.GetHomogeneousMatrix(), b.GetHomogeneousMatrix(), c.GetHomogeneousMatrix())); } AffineTransform2D AffineTransform2D::Combine(const AffineTransform2D& a, const AffineTransform2D& b, const AffineTransform2D& c, const AffineTransform2D& d) { return AffineTransform2D(LinearAlgebra::Product(a.GetHomogeneousMatrix(), b.GetHomogeneousMatrix(), c.GetHomogeneousMatrix(), d.GetHomogeneousMatrix())); } AffineTransform2D AffineTransform2D::CreateOffset(double dx, double dy) { AffineTransform2D t; t.matrix_(0, 2) = dx; t.matrix_(1, 2) = dy; return t; } AffineTransform2D AffineTransform2D::CreateScaling(double sx, double sy) { AffineTransform2D t; t.matrix_(0, 0) = sx; t.matrix_(1, 1) = sy; return t; } AffineTransform2D AffineTransform2D::CreateRotation(double angle) { double cosine = cos(angle); double sine = sin(angle); AffineTransform2D t; t.matrix_(0, 0) = cosine; t.matrix_(0, 1) = -sine; t.matrix_(1, 0) = sine; t.matrix_(1, 1) = cosine; return t; } }