NVIDIA Modulus Sym v1.3.0
v1.3.0

deeplearning/modulus/modulus-sym-v130/_modules/modulus/sym/geometry/primitives_2d.html

Source code for modulus.sym.geometry.primitives_2d

# Copyright (c) 2023, NVIDIA CORPORATION & AFFILIATES. All rights reserved.
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# Licensed under the Apache License, Version 2.0 (the "License");
# you may not use this file except in compliance with the License.
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#     http://www.apache.org/licenses/LICENSE-2.0
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"""
Primitives for 2D geometries
see https://www.iquilezles.org/www/articles/distfunctions/distfunctions.html
"""

import sys
from operator import mul
from sympy import Symbol, Abs, Max, Min, sqrt, sin, cos, acos, atan2, pi, Heaviside
from functools import reduce

pi = float(pi)
from sympy.vector import CoordSys3D
from .curve import SympyCurve
from .helper import _sympy_sdf_to_sdf
from .geometry import Geometry, csg_curve_naming
from .parameterization import Parameterization, Parameter, Bounds


[docs]class Line(Geometry): """ 2D Line parallel to y-axis Parameters ---------- point_1 : tuple with 2 ints or floats lower bound point of line segment point_2 : tuple with 2 ints or floats upper bound point of line segment normal : int or float normal direction of line (+1 or -1) parameterization : Parameterization Parameterization of geometry. """ def __init__(self, point_1, point_2, normal=1, parameterization=Parameterization()): assert point_1[0] == point_2[0], "Points must have same x-coordinate" # make sympy symbols to use l = Symbol(csg_curve_naming(0)) x = Symbol("x") # curves for each side curve_parameterization = Parameterization({l: (0, 1)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) dist_y = point_2[1] - point_1[1] line_1 = SympyCurve( functions={ "x": point_1[0], "y": point_1[1] + l * dist_y, "normal_x": 1e-10 + normal, # TODO rm 1e-10 "normal_y": 0, }, parameterization=curve_parameterization, area=dist_y, ) curves = [line_1] # calculate SDF sdf = normal * (point_1[0] - x) # calculate bounds bounds = Bounds( { Parameter("x"): (point_1[0], point_2[0]), Parameter("y"): (point_1[1], point_2[1]), }, parameterization=parameterization, ) # initialize Line super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Channel2D(Geometry): """ 2D Channel (no bounding curves in x-direction) Parameters ---------- point_1 : tuple with 2 ints or floats lower bound point of channel point_2 : tuple with 2 ints or floats upper bound point of channel parameterization : Parameterization Parameterization of geometry. """ def __init__(self, point_1, point_2, parameterization=Parameterization()): # make sympy symbols to use l = Symbol(csg_curve_naming(0)) y = Symbol("y") # curves for each side curve_parameterization = Parameterization({l: (0, 1)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) dist_x = point_2[0] - point_1[0] dist_y = point_2[1] - point_1[1] line_1 = SympyCurve( functions={ "x": l * dist_x + point_1[0], "y": point_1[1], "normal_x": 0, "normal_y": -1, }, parameterization=curve_parameterization, area=dist_x, ) line_2 = SympyCurve( functions={ "x": l * dist_x + point_1[0], "y": point_2[1], "normal_x": 0, "normal_y": 1, }, parameterization=curve_parameterization, area=dist_x, ) curves = [line_1, line_2] # calculate SDF center_y = point_1[1] + (dist_y) / 2 y_diff = Abs(y - center_y) - (point_2[1] - center_y) outside_distance = sqrt(Max(y_diff, 0) ** 2) inside_distance = Min(y_diff, 0) sdf = -(outside_distance + inside_distance) # calculate bounds bounds = Bounds( { Parameter("x"): (point_1[0], point_2[0]), Parameter("y"): (point_1[1], point_2[1]), }, parameterization=parameterization, ) # initialize Channel2D super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Rectangle(Geometry): """ 2D Rectangle Parameters ---------- point_1 : tuple with 2 ints or floats lower bound point of rectangle point_2 : tuple with 2 ints or floats upper bound point of rectangle parameterization : Parameterization Parameterization of geometry. """ def __init__(self, point_1, point_2, parameterization=Parameterization()): # make sympy symbols to use l = Symbol(csg_curve_naming(0)) x, y = Symbol("x"), Symbol("y") # curves for each side curve_parameterization = Parameterization({l: (0, 1)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) dist_x = point_2[0] - point_1[0] dist_y = point_2[1] - point_1[1] line_1 = SympyCurve( functions={ "x": l * dist_x + point_1[0], "y": point_1[1], "normal_x": 0, "normal_y": -1, }, parameterization=curve_parameterization, area=dist_x, ) line_2 = SympyCurve( functions={ "x": point_2[0], "y": l * dist_y + point_1[1], "normal_x": 1, "normal_y": 0, }, parameterization=curve_parameterization, area=dist_y, ) line_3 = SympyCurve( functions={ "x": l * dist_x + point_1[0], "y": point_2[1], "normal_x": 0, "normal_y": 1, }, parameterization=curve_parameterization, area=dist_x, ) line_4 = SympyCurve( functions={ "x": point_1[0], "y": -l * dist_y + point_2[1], "normal_x": -1, "normal_y": 0, }, parameterization=curve_parameterization, area=dist_y, ) curves = [line_1, line_2, line_3, line_4] # calculate SDF center_x = point_1[0] + (dist_x) / 2 center_y = point_1[1] + (dist_y) / 2 x_diff = Abs(x - center_x) - (point_2[0] - center_x) y_diff = Abs(y - center_y) - (point_2[1] - center_y) outside_distance = sqrt(Max(x_diff, 0) ** 2 + Max(y_diff, 0) ** 2) inside_distance = Min(Max(x_diff, y_diff), 0) sdf = -(outside_distance + inside_distance) # calculate bounds bounds = Bounds( { Parameter("x"): (point_1[0], point_2[0]), Parameter("y"): (point_1[1], point_2[1]), }, parameterization=parameterization, ) # initialize Rectangle super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Circle(Geometry): """ 2D Circle Parameters ---------- center : tuple with 2 ints or floats center point of circle radius : int or float radius of circle parameterization : Parameterization Parameterization of geometry. """ def __init__(self, center, radius, parameterization=Parameterization()): # make sympy symbols to use theta = Symbol(csg_curve_naming(0)) x, y = Symbol("x"), Symbol("y") # curve for perimeter of the circle curve_parameterization = Parameterization({theta: (0, 2 * pi)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) curve = SympyCurve( functions={ "x": center[0] + radius * cos(theta), "y": center[1] + radius * sin(theta), "normal_x": 1 * cos(theta), "normal_y": 1 * sin(theta), }, parameterization=curve_parameterization, area=2 * pi * radius, ) curves = [curve] # calculate SDF sdf = radius - sqrt((x - center[0]) ** 2 + (y - center[1]) ** 2) # calculate bounds bounds = Bounds( { Parameter("x"): (center[0] - radius, center[0] + radius), Parameter("y"): (center[1] - radius, center[1] + radius), }, parameterization=parameterization, ) # initialize Circle super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Triangle(Geometry): """ 2D Isosceles Triangle Symmetrical axis parallel to y-axis Parameters ---------- center : tuple with 2 ints or floats center of base of triangle base : int or float base of triangle height : int or float height of triangle parameterization : Parameterization Parameterization of geometry. """ def __init__(self, center, base, height, parameterization=Parameterization()): # make sympy symbols to use x, y = Symbol("x"), Symbol("y") t, h = Symbol(csg_curve_naming(0)), Symbol(csg_curve_naming(1)) N = CoordSys3D("N") P = x * N.i + y * N.j O = center[0] * N.i + center[1] * N.j H = center[0] * N.i + (center[1] + height) * N.j B = (center[0] + base / 2) * N.i + center[1] * N.j OP = P - O OH = H - O PH = OH - OP angle = acos(PH.dot(OH) / sqrt(PH.dot(PH)) / sqrt(OH.dot(OH))) apex_angle = atan2(base / 2, height) hypo_sin = sqrt(height**2 + (base / 2) ** 2) * sin(apex_angle) hypo_cos = sqrt(height**2 + (base / 2) ** 2) * cos(apex_angle) dist = sqrt(PH.dot(PH)) * sin(Min(angle - apex_angle, pi / 2)) # curve for each side curve_parameterization = Parameterization({t: (-1, 1), h: (0, 1)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) curve_1 = SympyCurve( functions={ "x": center[0] + t * base / 2, "y": center[1] + t * 0, "normal_x": 0, "normal_y": -1, }, parameterization=curve_parameterization, area=base, ) curve_2 = SympyCurve( functions={ "x": center[0] + h * hypo_sin, "y": center[1] + height - h * hypo_cos, "normal_x": 1 * cos(apex_angle), "normal_y": 1 * sin(apex_angle), }, parameterization=curve_parameterization, area=sqrt(height**2 + (base / 2) ** 2), ) curve_3 = SympyCurve( functions={ "x": center[0] - h * hypo_sin, "y": center[1] + height - h * hypo_cos, "normal_x": -1 * cos(apex_angle), "normal_y": 1 * sin(apex_angle), }, parameterization=curve_parameterization, area=sqrt(height**2 + (base / 2) ** 2), ) curves = [curve_1, curve_2, curve_3] # calculate SDF outside_distance = 1 * sqrt(Max(0, dist) ** 2 + Max(0, center[1] - y) ** 2) inside_distance = -1 * Min(Abs(Min(0, dist)), Abs(Min(0, center[1] - y))) sdf = -(outside_distance + inside_distance) # calculate bounds bounds = Bounds( { Parameter("x"): (center[0] - base / 2, center[0] + base / 2), Parameter("y"): (center[1], center[1] + height), }, parameterization=parameterization, ) # initialize Triangle super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Ellipse(Geometry): """ 2D Ellipse Parameters ---------- center : tuple with 2 ints or floats center point of circle radius : int or float radius of circle parameterization : Parameterization Parameterization of geometry. """ def __init__(self, center, major, minor, parameterization=Parameterization()): # make sympy symbols to use theta = Symbol(csg_curve_naming(0)) x, y = Symbol("x"), Symbol("y") mag = sqrt((minor * cos(theta)) ** 2 + (major * sin(theta)) ** 2) area = pi * ( 3 * (major + minor) - sqrt((3 * minor + major) * (3 * major + minor)) ) try: area = float(area) except: pass # curve for perimeter of the circle curve_parameterization = Parameterization({theta: (0, 2 * pi)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) curve = SympyCurve( functions={ "x": center[0] + major * cos(theta), "y": center[1] + minor * sin(theta), "normal_x": minor * cos(theta) / mag, "normal_y": major * sin(theta) / mag, }, parameterization=curve_parameterization, area=area, ) curves = [curve] # calculate SDF sdf = 1 - (((x - center[0]) / major) ** 2 + ((y - center[1]) / minor) ** 2) # calculate bounds bounds = Bounds( { Parameter("x"): (center[0] - major, center[0] + major), Parameter("y"): (center[1] - minor, center[1] + minor), }, parameterization=parameterization, ) # initialize Ellipse super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
[docs]class Polygon(Geometry): """ 2D Polygon Parameters ---------- points : list of tuple with 2 ints or floats lower bound point of line segment parameterization : Parameterization Parameterization of geometry. """ def __init__(self, points, parameterization=Parameterization()): # make sympy symbols to use s = Symbol(csg_curve_naming(0)) x = Symbol("x") y = Symbol("y") # wrap points wrapted_points = points + [points[0]] # curves for each side curve_parameterization = Parameterization({s: (0, 1)}) curve_parameterization = Parameterization.combine( curve_parameterization, parameterization ) curves = [] for v1, v2 in zip(wrapted_points[:-1], wrapted_points[1:]): # area dx = v2[0] - v1[0] dy = v2[1] - v1[1] area = (dx**2 + dy**2) ** 0.5 # generate normals normal_x = dy / area normal_y = -dx / area line = SympyCurve( functions={ "x": dx * s + v1[0], "y": dy * s + v1[1], "normal_x": dy / area, "normal_y": -dx / area, }, parameterization=curve_parameterization, area=area, ) curves.append(line) # calculate SDF sdfs = [(x - wrapted_points[0][0]) ** 2 + (y - wrapted_points[0][1]) ** 2] conds = [] for v1, v2 in zip(wrapted_points[:-1], wrapted_points[1:]): # sdf calculation dx = v1[0] - v2[0] dy = v1[1] - v2[1] px = x - v2[0] py = y - v2[1] d_dot_d = dx**2 + dy**2 p_dot_d = px * dx + py * dy max_min = Max(Min(p_dot_d / d_dot_d, 1.0), 0.0) vx = px - dx * max_min vy = py - dy * max_min sdf = vx**2 + vy**2 sdfs.append(sdf) # winding calculation cond_1 = Heaviside(y - v2[1]) cond_2 = Heaviside(v1[1] - y) cond_3 = Heaviside((dx * py) - (dy * px)) all_cond = cond_1 * cond_2 * cond_3 none_cond = (1.0 - cond_1) * (1.0 - cond_2) * (1.0 - cond_3) cond = 1.0 - 2.0 * Min(all_cond + none_cond, 1.0) conds.append(cond) # set inside outside sdf = Min(*sdfs) cond = reduce(mul, conds) sdf = sqrt(sdf) * -cond # calculate bounds min_x = Min(*[p[0] for p in points]) if min_x.is_number: min_x = float(min_x) max_x = Max(*[p[0] for p in points]) if max_x.is_number: max_x = float(max_x) min_y = Min(*[p[1] for p in points]) if min_y.is_number: min_y = float(min_y) max_y = Max(*[p[1] for p in points]) if max_y.is_number: max_y = float(max_y) bounds = Bounds( { Parameter("x"): (min_x, max_x), Parameter("y"): (min_y, max_y), }, parameterization=parameterization, ) # initialize Polygon super().__init__( curves, _sympy_sdf_to_sdf(sdf), dims=2, bounds=bounds, parameterization=parameterization, )
© Copyright 2023, NVIDIA Modulus Team. Last updated on Jan 25, 2024.