# Implicit-Surface

**Repository Path**: gnudebian/Implicit-Surface

## Basic Information

- **Project Name**: Implicit-Surface
- **Description**: No description available
- **Primary Language**: Unknown
- **License**: Not specified
- **Default Branch**: master
- **Homepage**: None
- **GVP Project**: No

## Statistics

- **Stars**: 0
- **Forks**: 0
- **Created**: 2021-11-07
- **Last Updated**: 2021-11-07

## Categories & Tags

**Categories**: Uncategorized

**Tags**: None

## README

# Implicit-Surface
An implicit surface is a set of points p such that f(p) = 0, where f is a trivariate function (i.e., p ∈ ℜ3). The surface is also known as the zero set of f and may be written Z(f). According to the implicit surface theorem, if zero is a regular value of f, then the zero set is a two-dimensional manifold. An iso-surface is a similar set of points for which f(p) = c, where c is the iso-contour value of the surface. The function f is sometimes called the implicit function, although we prefer implicit surface function. A review of the salient properties of implicit surfaces may be found in [Hoffmann 1989].

# Main menu
![alt text](ReadMeImgs/mainMenu_.png)

# Add points
![alt text](ReadMeImgs/addingPoints.png)

# Murakami : Merge
![alt text](ReadMeImgs/Merge.png)

# Murakami : Union
![alt text](ReadMeImgs/Union.png)

# Murakami : Intersection
![alt text](ReadMeImgs/Intersaction.png)