Hi all , How can I find lecture notes on ArXiv ? I was looking for lecture notes on Yang-mills theories treated in the language of differential geometry but didn't succeed till now . Can some one recommend me some good resource for it?
Homework Statement
Show that if M is a surface such that every geodesic is a plane curve, then M is a part of a plane or a sphere.
Homework Equations
- If a geodesic, \alpha, on M is contained in a plane, then \alpha is also a line of curvature.
- Let p be any point on a surface M and...
Homework Statement
Homework Equations
From my notes: (\psi_{*}v)_{k}(x)=\sum_{i=1}^{n}v_{i}(x)\frac{{{{{\partial}}}}{\psi_{k}(x)}}{{x_{i}}}
The Attempt at a Solution
Okay so i) is fine (ignoring the typo in the question) but I'm a bit confused about ii)
I don't see any need...
Homework Statement
Let M be a differentiable manifold. Let X and Y be two vector fields on M, and let t be a tensor field on M. Prove
\mathcal{L}_{[X,Y]}t = \mathcal{L}_X\mathcal{L}_Yt -\mathcal{L}_Y\mathcal{L}_Xt
Homework Equations
All is fair game, though presumably a coordinate-free...
Hello.
I'm new here and I'm not sure if I should post this topic here or in general math, or anywhere else. Feel free to move the topic elsewhere if needed.
Just a bit of explanation first.
I'm not from USA (so forgive any grammar errors) and I don't understand completely your academic...
My university is offering a Differential Geometry course next semester and while I am interested in the subject, I do not plan to take the class unless it has practical use for me. I have no interest in doing theoretical work. Does differential geometry serve any use to applied physics/engineering?
Homework Statement
Consider the ellipsoid L \subsetE3 specified by
(x/a)^2 + (y/b)^2 + (z/c)^2=1
(a, b, c \neq 0). Define f: L-S^{2} by f(x, y, z) = (x/a, y/b. z/c).
(a) Verify that f is invertible (by finding its inverse).
(b) Use the map f, together with a smooth atlas of S^{2}, to...
HI, am a newbie to differential geometry..Can anyone please suggest me a book suitable for Maths hons student...
Before posting read this out...
required topics-
one parameter family of surfaces, developables associated with a curve : polar and rectifying & osculating developables ,two...
So I need to decide by tomorrow, whether I'll be taking topology or diff geo, (along with real analysis and advanced linear algebra). I've sat in on both classes for the first lecture, and I'm still not certain which class would be more difficult. My diff geo class has no exams, and instead...
I'm looking to learn general relativity, but I'm having a hard time. Frankly, I can't find any textbooks that I can understand.
There seems to be a gap between the maths I did at uni, and the maths of general relativity.
I've done vector calculus, differential equations, linear algebra and...
According to the preceding paragraph,
x^i(t) \equiv x^i (\gamma (t)).
For now, I have the lowly ambition of trying to understand the notation. I think the xi on the left of the "quoted" equation is a coordinate presentation of a curve (Fecko's curves are functions from an interval to a...
I 've been reading about Homotopy , homology and abstract lie groups and diff.forms and I would like to see those beautiful ideas applied on a Nonabelian Gauge Theory . Any recommendations for a textbook that apply these ideas to gauge theory ? Text books on particle Physics and QFT do not...
Hi guys. I finished working through D'Inverno's "Introducing Einstein's Relativity" and Schutz's "A First Course in General Relativity" and some of Carroll's "Spacetime and Geometry" but I don't really feel like I learned most of what is out there. I also feel that before I can tackle Wald I...
I'm an undergraduate student who is trying to decide whether to focus on mathematics or physics. I'd like to know how much Differential Geometry is applicable to GR? If I were to take rigorous courses in Differentiable Manifolds and Differential Geometry, will these courses allow a deeper...
My university doesn't offer many courses on theoretical physics (I'm studying applied physics), but because I might want to get my masters degree in theoretical physics, I want to read into some of the math and physics.
What books would you recommend to a student who has had linear algebra...
Homework Statement
a(t)=<1+t^2,4/t,8*(2-t)^(1/2)>
Express the acceleration vector
a''(1) as the sum of a vector parallel to a'(1) and a vector orthogonal to a'(1)
Homework Equations
The Attempt at a Solution
I took the first two derivatives and calculated a'(t)=<2t, -4t^2, -4/(2-t)^(1/2)>...
Homework Statement
I'm going over a proof in Differential Geometry of Curves and Surfaces by do Carmo, and I don't know why the proof can't be shortened to my proof given below. (Proposition 9 on page 130)
Proposition. Let f:U-->R be a differentiable function defined on a connected open subset...
I have been working on determining which partial derivative exists for the surface z=y. i.e. ( partial of f in respect to x, partial of f in respect to y, partial of f in resprct to z). The function f= x^2 -y-z. I think the only ones that exist would be the partial in respect to y and the...
Homework Statement
Given the following:
Some surface M: z=f(x,y) where f(0,0)=fx(0,0)=fy(0,0)
and
U =-f1U1-fyU2+U3}/Sqrt[1+fx2+fy2]
and
u1 = U1(0)
u2 = U2(0)
are vectors tangent to M at the origin 0.
We want to prove
S(u1)=fxxu1+fxyu2
My problem here is conceptually wadding through this...
My school offers this course at the senior undergraduate/graduate level, and its only offered the semester before General Relativity is offered. Would taking this course really "help out" that much with the mathematics of GR? I am trying to select a few math courses to take that could possibly...
Last night in a lecture my professor explained that some partial differential equations are used to observe events on minimal surface (e.g. membranes).
A former advisor, someone that studied differential geometry, gave a brief summary of minimal surfaces but in a diffy G perspective.
1.)...
Homework Statement
let f: J --> R^2 be a unit speed curve curve and define it's tangentially equidistant campanion by g(u) = f(t) + r*f'(t) for a fixed r>0. Show that the centre of the osculating circle of f at some u in J is the intersection of the line normal to f'(u) through f(u) and the...
I have two classes that I think I can fit in on my last semester at university.
I am doing the combined Mathematics & Physics major. I am more interested in physics. However, the two classes I can fit, happen to be mathematics classes. PDE's seem like they are very useful for physics and...
Hi, I'm looking to apply for theoretical physics PhDs in the coming year and have been recommended getting a little more mathematics under my belt. I have already done a bit of differential geometry in my G.R. course but I don't think it went into enough depth to be useful outside of what we...
Hi guys,
what are the fields of theoretical physics (if any) -besides General Relativity, String Theory, Quantum Gravity...- where Differential Geometry and Tensorial Calculus currently find strong application?
Thanx
Is "classical" differential geometry still useful?
As a physics major I have seen in general relativity the power of modern differential geometry such as coordinate-free treatment of manifolds and Riemannian geometry. However, I've also encountered math textbooks devoted to "classical"...
Hi everyone.
I am a senior undergrad math major and I'm looking for a Differential Geometry book to self-study. I have studied most/all of the other undergrad topics: algebra; real and complex analysis; point-set topology; etc.
Any recommendations? Thanks
Sorry i wasnt able to get help in the homework department. figured id try here.
Homework Statement
For a coordinate patch x: U--->\Re^{3}show thatu^{1}is arc length on the u^{1} curves iff g_{11} \equiv 1
The Attempt at a Solution
So i know arc legth of a curve \alpha (t) =...
Homework Statement
For a coordinate patch x: U--->\Re^{3}show thatu^{1}is arc length on the u^{1} curves iff g_{11} \equiv 1
The Attempt at a Solution
So i know arc legth of a curve \alpha (t) = \frac{ds}{dt} = \sum g_{ij} \frac {d\alpha^{i}}{dt} \frac {d\alpha^{j}}{dt} (well that's actually...
hi,
I'm entering my 3rd year of PMAT degree and need to make a choice between differential geometry and number theory. These are both undergrad courses. I am trying to decide which would be more interesting/useful to take. I am planning on going into grad school, so it would be nice to choose a...
When I say "SR" in this post, I mean the set of classical and quantum theories of particles and fields in Minkowski spacetime.
I'm trying to come up with a list of topics in SR that can be dealt with in a better way when we have defined Minkowski spacetime as a manifold instead of as a vector...
Let M be the surface defined by z=x2+3xy-5y2. Find a unit normal vector field U defined on a neighborhood of p on M.
First, I reparameterized the equation for the surface to get x(u,v)=(u,v,u2+3xy-5y2). Next I found two tangent vectors xu(u,v)=(1,0,2u+3v) and xv=(0,1,3u-10v). The next step is...
Hey,
I was wondering if anyone could recommend an introductory book for differential geometry. I am studying general relativity and need some help with this topic.
Thanks.
Homework Statement
A function F of n real variables is called homogeneous of degree r if it satisfies
F(tx_1, tx_2, ..., tx_n) = (t^r)F(x_1,x_2,...,x_n)
By differentiation with respect to t, show that a function F is an eigenfunction of the operator:
x^1 ∂/∂x_1 + ... + x^n ∂/∂x_n...
I am not a mathematician but I have noticed how strangley similar the treatments of curvature and residues are when you compare the residues of residue calculus and the curviture of the gauss bonet forumlation of surfaces. Is there some generalization of things that contains both of these...
The first few sections of this book gave me a good sense of the solid foundation that the author is building in this book. While it may be review for many, this guy writes so well, it's a pleasure to read...
I'm completely confused with patches, which were introduced to us very briefly (we were just given pictures in class). I am using the textbook Elementary Differential Geometry by O'Neill which I can't read for the life of me. I'm here with a simple question and a somewhat harder one...
Fix a number L > 2. Consider all smooth plane curves r of length L that connect (−1, 0) and (1, 0) and are contained in the upper half-plane. Note that and the segment [−1, 1] of the X-axis together bound a plane domain D. Find r such that D has the maximal possible area.
After finding and reading Geroch's notes on Quantum Mechanics formulated within Differential Geometry, I was wondering if there are other books that treat Quantum Mechanics in a similar fashion, focusing upon the geometrical aspects of Quantum Mechanics in order to formulate it.
Homework Statement
1.
2.
Homework Equations
Frenet Formulas, definitions of curvature, torsion and generalized helix
The Attempt at a Solution
for 1)
I think I got part A down - I had α = λT + µN + νT, took the derivatives and plugged in the Frenet formulas to get:
λ′ − µκ...
Homework Statement
Find the Frenet apparatus for the curve \alpha (t) = (at, bt^2, ct^3), where abc \neq 0.
Homework Equations
The Frenet equations
The Attempt at a Solution
The derivative of the curve is the expression for the tangent vector. The second derivative (the first...
heeello friends!;]
i have book "wstęp do współczesnej geometrii różniczkowej" written by Konstanty Radziszewski, this title in english mean something like... "basics of modern differential geometry", and here are many formulas which look similar to one another, but I never know what it means and...
Show that the knowledge of the vector function n = n(s) (normal vector) of a unit-speed
curve
, with non-zero torsion everywhere, determines the curvature and the torsion
don't have any clues about what i am supposed to prove!~
First of all, hello :)
I'd like to request some aid concerning a problem that is really getting to me. I know it should be simple but I'm not getting the right results.
Homework Statement
Given that V^{\mu} is a Killing vector, prove that:
V^{\mu;\lambda}_{;\lambda} +...
Dear fellow Mathematicians and Physicists,
As the fall term closes and spring term starting next year, I am deciding on which math class to take. Simply put, I'm a math major (possibly engineering if there are enough slots in my schedule), more applied, seeking to apply math concepts to...
I would like to explore writing differential geometry in matrix format and was wondering if any of the experts here knows a good resource for that? I have tried Google and can't find anything definitive.
Thanks in advance!