Mathematics Stack Exchange
Mathematics Stack Exchange

Questions tagged [projection]

This tag is for questions relating to "Projection", which is nothing but the shadow cast by an object. An everyday example of a projection is the casting of shadows onto a plane. Projection has many application in various areas of Mathematics (such as Euclidean geometry, linear algebra, topology, category theory, set theory etc.) as well as Physics.

The concept of projection in mathematics is a very old one, most likely has its roots in the phenomenon of the shadows cast by real-world objects on the ground. Originally, the notion of projection was introduced in Euclidean geometry to denote the projection of the Euclidean space of three dimensions onto a plane in it.

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Type I: In plane projections, a series of points on one plane may be projected onto a second plane by choosing any focal point, or origin, and constructing lines from that origin that pass through the points on the first plane and impinge upon the second. This type of mapping is called a central projection.

The figures made to correspond by the projection are said to be in perspective, and the image is called a projection of the original figure. If the rays are parallel instead, the projection is likewise called parallel; if, in addition, the rays are perpendicular to the plane upon which the original figure is projected, the projection is called orthogonal. If the two planes are parallel, then the configurations of points will be identical; otherwise this will not be true.

Type II: A second common type of projection is called stereographic projection. It refers to the projection of points from a sphere to a plane. This may be accomplished most simply by choosing a plane through the centre of the sphere and projecting the points on its surface along normals, or perpendicular lines, to that plane.

In general, however, projection is possible regardless of the attitude of the plane. Mathematically, it is said that the points on the sphere are mapped onto the plane; if a one-to-one correspondence of points exists, then the map is called conformal.

  • In an abstract setting we can generally say that, a projection is a mapping of a set (or other mathematical structure) into a subset (or sub-structure), which is equal to its square for mapping composition (or, in other words, which is idempotent).

The restriction to a subspace of a projection is also called a projection, even if the idempotence property is lost.

References:

https://en.wikipedia.org/wiki/Projection_(mathematics)

https://www.britannica.com/science/projection-geometry

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What are the "rules" of Cavalier and military oblique projections?

I am trying to learn the "rules" of the different types of orthographic projections. For example: The above adequately/simply explains the rules of trimetric, dimetric and isometric axonometric projections. Unfortunately, I have not been able to…
mhulse
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Projection $(I-p)=(I+p)$

Let $p$ be a projection such that the projection $(I-p)$ is invertible. Does $(I-p)=(I+p)$ hold? I proved it this way: $$(I-p)^2=(I-p)=(I^2-p^2)=(I-p)(I+p)$$ Hence, $$(I-p)^{-1}(I-p)^2= (I+p).$$ This is equivalent to $$(I-p)=(I+p).$$ I used…
user926300
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Ellipse projection knowing semiaxes vectors

I'd like to know the semi-projection of a tilted ellipse on $x$ and $y$ axes, called as $O_\parallel$ and $O_\perp$, knowing the vectors $\vec{\zeta}=(\zeta_x,\zeta_y)$ and $\vec{ \nu}=(\nu_x,\nu_y)$ and that, as obvious $\hat{x}=(1,0) ,…
omega
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parametric equation of a line through point of projection

with regard to my previous question which says: We can write equations describin coordinate positions along this perspective projection line in parametric form as: $$ x' = x-xu \\ y'=y-yu\\z'=z-(z-z_{prp})u $$ I've made a 3D illustration as per my…
juztcode
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Reconstruction Problem for Result Matrix of Radon Transform and solving length of r from Multiplying of Attenuation Coefficient and r(or rho)

We've been on a project that given us in Medical Imaging Systems class about that Computed Tomography Simulation on MATLAB for 3 months. We are still going on comprehensive research on these all of subjects. We've a little information about Radon…
remidosol
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Projecting an implicit system of equations into lower dimensions

I have an implicitly defined system (say $x^2 + y^2 + z^2 - 1 = 0$). I want to find an expression that will describe the points satisfying the earlier equation when projected onto a lower dimension. For example, consider the sphere discussed…
Curious Iitian
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Project a point onto a plane, given some constraints

I tried some of the formulas answered here, but none of them works within the constraints of my problem. Here is it: I got two points - P1 and P2 and a line - [Pa, Pb]. Inbetween these points, I detect a intersection with the line, giving the point…
Ramon Amorim
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Projection Formula

Does someone know if in the problem the projection of x onto U is defined like that : $x_u = \displaystyle \frac{\langle x,u\rangle}{u. u}$ $u$ Problem: Let $U,V\subset\mathbb C^n$ be two subspaces, such that $\mathbb C^n = U+V$ and further…
Kai
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What is the solution set for the equation$ x ^ y = y ^ x$ in positive real numbers, x not equal to y?

I note from the archive discussion of the case for integers, which I'm fine with. For the positive reals, I have set up axes for x, y and z = x ^ y. The solution set is then graphed by a space curve in the surface, necessarily symmetrical about the…
Paul Stephenson
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Projective transformation between colinear points in 2D with 2x2 homography possible?

Referring to: 2.5 The projective geometry of 1D by Richard Hartley and Andrew Zissermann. Can I compute a projective transformation matrix 2x2 from two sets of 3 1D colinear points? I want to find the projective transformation of 2 sets of 3…
Pj Toopmuch
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Show the Euclidian projection onto a closed set is a Lipschitz function

Let $f(x)=\min_{y \in C}\|y-x\|$ where $C$ is a closed set in $\mathbb{R}^n$ and $x,y \in \mathbb{R}^n$. Show $f(x)$ is a Lipschitz function with constant $L=1$. My try I need to show $$ |f(x_2)-f(x_1)| \leq \|x_2-x_1\| \quad \forall x_1,x_2 \in…
Saeed
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Is the orthogonal projection of a bounded point bounded?

Let $v \in \mathbb{R}^n$ be a bounded point ($||v||\leq M$ for some $M>0$) and $C$ be a closed set. Is $y \in P_C(v)$ a bounded point (it may not be unique when $C$ is not convex) where $P_C(x)=\arg\min_{z\in C} ||z-v||^2$? My intuition: I know the…
Saeed
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Projection on the intersection of given sets

I would like to ask for help with the next problem: Let $a,b \in \mathbb{R}$ such that $a
Bastiramelo
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Random projection with some dimensions frozen : How does it affect the Johnson-Lindenstrauss lemma?

I am working with a specific kind of random projection: I have some data that belongs to $\mathbb{R}^{i,j,k}$, and I am using a random projection to only embed the third axis to $p
Tim
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Projection of a vector onto a non-orthonormal basis vector?

Suppost $v$ be a vector and I want to project onto a non-orthonormal basis vector $u$. There is no span just two of these vectors. How do I do that? Is it correct that if I say there is no span? There are many question on this topic but I did not…
jomegaA
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