What is Groups: Definition and 905 Discussions

Google Groups is a service from Google that provides discussion groups for people sharing common interests. The Groups service also provides a gateway to Usenet newsgroups via a shared user interface.
Google Groups became operational in February 2001, following Google's acquisition of Deja's Usenet archive. Deja News had been operational since March 1995.
Google Groups allows any user to freely conduct and access threaded discussions, via either a web interface or e-mail. There are at least two kinds of discussion group. The first kind are forums specific to Google Groups, which act more like mailing lists. The second kind are Usenet groups, accessible by NNTP, for which Google Groups acts as gateway and unofficial archive. The Google Groups archive of Usenet newsgroup postings dates back to 1981. Through the Google Groups user interface, users can read and post to Usenet groups.In addition to accessing Google and Usenet groups, registered users can also set up mailing list archives for e-mail lists that are hosted elsewhere.

View More On Wikipedia.org
Recent contents Top users
  1. Elham1990

    A Parton distribution functions

    Hello I plotted the Parton distribution functions in Mathematica. Now I want to compare the graphs drawn with the graphs of other groups(xu and xd). How should I do this?
  2. S

    Number of ways to partition n persons and probability to form n groups

    1) At first my answer was ##n! \begin{pmatrix} n+r-1 \\ r - 1 \end{pmatrix} ## But I think that's not correct because let say first group consists of person A and B, by multiplying with n!, I also consider first group to be B and A which is just the same as A and B so there is double counting...
  3. JackNicholson

    I Isomorphisms between C4 & Z4 Groups

    0 Hint: Show that the isomorphism preserves the order of the element My solution: C4 = {e,r,r^2,r^3} where e-identity element and r is rotation by 90° Z4 = {0,1,2,3} LEMMA: ! Isomorphism preserves the order of the element ! (PROOF OF IT)Now we calcuate the order of the elements of both...
  4. Euge

    POTW Product of Two Finite Cyclic Groups

    For each positive integer ##m##, let ##C_m## denote a cyclic group of order ##m##. Show that for all positive integers ##m## and ##n##, there is an isomorphism ##C_m \times C_n \simeq C_d \times C_l## where ##d = \operatorname{gcd}(m,n)## and ##l = \operatorname{lcm}[m,n]##.
  5. A

    I Using the orbit-stabilizer theorem to identify groups

    I want to identify: ##S^n## with the quotient of ##O(n + 1,R)## by ##O(n,R)##. ##S^{2n+1}## with the quotient of ##U(n + 1)## by ##U(n)##. The orbit-stabilizer theorem would give us the result, but my problem is to apply it. My problem is how to find the stabilizer. In 1 how to define the...
  6. A

    A About computing the tangent space at 1 of certain lie groups

    Hello :), I am wondering of the right and direct method to calculate the following tangent spaces at ##1##: ##T_ISL_n(R)##, ##T_IU(n)## and ##T_ISU(n)##. Definitions I know: Given a smooth curve ##γ : (− ,) → R^n## with ##γ(0) = x##, a tangent vector ##˙γ(0)## is a vector with components...
  7. fresh_42

    Insights When Lie Groups Became Physics

    Continue reading...
  8. redtree

    I Pin & Spin Groups: Double Covers of Orthogonal & SO Groups

    Pin Groups are the double cover of the Orthogonal Group and Spin Groups are the double cover of the Special Orthogonal Group. Both sets of the double cover are considered to be groups, but it seems that only one of the sets of the double cover actually contains the identity element, which means...
  9. PhysicsRock

    Prove relation between the group of integers and a subgroup

    So, a friend of mine has attempted a solution. Unfortunately, he's having numbers spawn out of nowhere and a lot of stuff is going on there which I can't make sense of. I'm going to write down the entire attempt. $$ 0 \in X \; \text{otherwise no subgroup since neutral element isn't included}...
  10. W

    B Why are SU(3), SU(2) and U(1) groups used in the Standard Model?

    hi, i have studied Standard Model for particle physics - at present it is described by three groups - i have studied - these groups but could not establish what particular feature suggest of these group to be used to describe SM. Thanks
  11. P

    A Clarifying Fradkin's Terminology on Quantum Numbers of Gauge Groups

    Hi, I'd like to clarify the following terminology (Fradkin, Quantum Field Theory an integrated approach) "carry the quantum numbers of the representation of the gauge group": Does the author basically mean that the wilson loop is a charged operator, in a sense that it transforms non-trivially...
  12. M

    Probability/Combinatorics: # ways of picking 5 from 3 groups of 6

    Hi, I was attempting the following question and was getting slightly stuck. Question: We have a bag of 18 marbles: 6 red, 6 blue, and 6 yellow. Now I randomly select 5 marbles from the bag without replacement. What is the probability that I have picked out EXACTLY 2 colors? Attempt: I tried...
  13. Theia

    MHB Algorithm to arrange N people into groups of K

    Hi all! I've been trying to find a reasonable way to solve following problem: N people meet each others in groups of K people such that no one meets more than once. If I'm not mistaken, this requires two things: N must be divisible by K N - 1 must be divisible by K - 1. Let's assume these...
  14. M

    MHB Show that the groups are abelian

    Hey! :giggle: Let $p<q$ different prime numbers. a) If $q\neq 1\pmod p$ show that each group of order $pq$ is abelian. b) If $q\neq \pm 1\pmod p$ show that each group of order $pq^2$ is abelian.I have done the following : a) Let $H$ be a $p$-Sylow subgroup of $G$ and let $K$ be a $q$-Sylow...
  15. G

    I Central Extension and Cohomology Groups

    Wikipedia says that a general projective representation cannot be lifted to a linear representation and the obstruction to this lifting can be understood via group cohomology. For example, I see that a spin group is a central extension of SO(3) by Z/2. More generally I can follow the reasoning...
  16. Ivan Seeking

    Where did old videos of rock groups come from?

    I have often been surprised to find music videos from the late 60s and early 70s, of people and groups like David Bowie, and The Guess Who. This surprises me because the first music videos I remember came along with MTV in the 80s. And I have often heard it discussed that MTV rushed in a new era...
  17. C

    Combination problem with 4 groups of values

    Summary:: 10 values are divided into 4 groups and need a combination of these with restrictions placed on group size, ordering and combinations I have a combinations question.. i have 4 group of values A , B, C and D, with A-2 values, B-3 values , C-2 values, D-3 values. 1. From each group...
  18. K

    I Transition Functions and Lie Groups

    I understand that on Riemannian manifolds, the transition functions that glue charts together are coordinate transformations (Jacobian matrices). However, I am not quite sure how transition functions work in the context of Lie groups and Fiber bundles. Do we consider the manifolds to be flat...
  19. W

    I Can a group be isomorphic to one of its quotients?

    Of course it must be an infinite group, otherwise |G/N|=|G|/|N| and then {e} is the only ( and trivial) solution. I understand there is a result that for every quotient Q:=G/N there is a subgroup H that is isomorphic to Q. Is that the case?
  20. J

    Is the Direct Product of Groups Associative and Have an Identity Element?

    So I that I need to prove the axioms: associativity, existence of the identity element, and existence of the right inverse. For associativity I know that the binary operations of G and H have to already be associative, and the elements of G X H are made up of these binary operations, so...
  21. L

    A What is the difference between groups SU(n) and SO(n,C)?

    What is the difference between groups ##SU(n)## and ##SO(n,\mathbb{C})##? They look completely the same.
  22. D

    A Why are sheafs defined using abelian groups?

    Let M be a manifold. The space of cotangent spaces to M is called the cotangent bundle T*M. a function on M can be lifted into the cotangent bundle. On the manifold T*M we can define a 1-form θ which describes the natural lifts and so on. A vector field on M is a section of the tangent bundle...
  23. T

    B Examples of manifolds not being groups

    Hello there. Do you know any examples of manifolds not being groups?Can you talk about some of them developing them as much as you want?Thank you.
  24. F

    Showing two groups are equal/Pontryagin duality

    I am confused because ##H## is a subgroup of ##G## and ##H^{\perp\perp}## is a set of homomorphisms. Are we trying to show ##f(H) = H^{\perp\perp}## where ##f## is the isomorphism defined in the definitions above? Proof: We want to show ##H = (H^\perp)^\perp##. ##(\subset):## Let ##h \in H##...
  25. M

    A New ideas about symmetry groups

    https://arxiv.org/abs/2009.14613 A group-theorist's perspective on symmetry groups in physics Robert Arnott Wilson [Submitted on 29 Sep 2020 (v1), last revised 12 Nov 2020 (this version, v3)] R.A. Wilson (physics blog) worked on finite simple groups such as the famous "Monster". He writes...
  26. J

    I Decomposition per the Fundamental Theorem of Finite Abelian Groups

    According to the book I am using, one can decompose a finite abelian group uniquely as a direct sum of cyclic groups with prime power orders. Uniquely meaning that the structures in the group somehow force you to one particular decomposition for any given group. Unfortunately, the book gives no...
  27. iVenky

    Are there any meet-up groups in California, USA?

    I live in the California Bay Area. Wondering if there are meet-up groups for meeting people in this forum.
  28. LCSphysicist

    I About groups and continuous curves

    Define $$\phi(A)$$ a transformation which, acting on a vector x, returns $$AxA^{*}$$, in such way that if A belongs to the group $$SL(2,C)$$, $$||\phi(A)x||^2 = ||x||^2$$, so it conserves the metric and so is a Lorentz transformation. $$\phi(AB)x = (AB)x(AB)^{*} = ABxB^{*}A^{*} = A(BxB^{*})A^{*}...
  29. L

    MHB Connecting linear algebra concepts to groups

    The options are rank(B)+null(B)=n tr(ABA^{−1})=tr(B) det(AB)=det(A)det(B) I'm thinking that since it's invertible, I would focus on the determinant =/= 0. I believe the first option is out, because null (B) would be 0 which won't be helpful. The second option makes the point that AA^{−1} is I...
  30. P

    MHB Exploring Finite Group Theory: Finding the Upper Bound of Groups of Order

    In the context of group theory, there's a theorem that states that for a given positive integer \(n\) there exist finitely different types of groups of order \(n\). Notice that the theorem doesn´t say anything of how many groups there are, only states that such groups exist. In the proof of this...
  31. JD_PM

    I Understanding Lorentz Groups and some key subgroups

    This thread is motivated by samalkhaiat's comment here I know that the Lorentz Group is formed by all matrices that satisfy $$\eta = \Lambda^{T} \eta \Lambda \tag{1.1}$$ Which is equivalent to $$\eta_{\mu\nu}\Lambda^{\mu}{}_{\rho}\Lambda^{\nu}{}_{\sigma} = \eta_{\rho \sigma} \tag{1.2}$$ If...
  32. S

    Algebra Book on Lie algebra & Lie groups for advanced math undergrad

    Posting for my son (who does not have an account here): He's a sophomore math major in college and is looking for a good book on Lie algebra and Lie Groups that he can study over the summer. He wants mathematical rigor, but he is thinking of grad school in theoretical physics, so he also wants...
  33. T

    I Trying to Split Six People into Two Groups and Have Each Person Meet

    Real World Application here. I'm creating a virtual meeting involving six people and will have the first round include two groups of three. Then we'll switch a few times. I tried hopelessly to do it such that after three rounds, everyone would see everyone else at least once. Was so close...
  34. V

    A Stone's theorem on one-parameter unitary groups and new observables?

    I have been following the proof of the Stone's theorem on one-parameter unitary groups. The question is if the current list of self-adjoint operators used in quantum mechanics, including position and momentum operators, is exhaustive or not? Put it another way, can we say that there is no...
  35. Lauren1234

    Is this matrix a non-abelian group?

    I know for a group to be abelian a*b=b*a I tried multiplying the matrix by itself also but I’m not sure what I’m looking for. picture is below of the matrix https://www.physicsforums.com/attachments/255812
  36. L

    A Representations of finite groups: Irreducible and reducible

    Matrix representation of a finite group G is irreducible representation if \sum^n_{i=1}|\chi_i|^2=|G|. Representation is reducible if \sum^n_{i=1}|\chi_i|^2>|G|. What if \sum^n_{i=1}|\chi_i|^2<|G|. Are then multiplication of matrices form a group? If yes what we can say from...
  37. L

    A Representations of finite groups -- Equivalent representations

    I am confused. Look for instance cyclic ##C_2## group representation where D(e)= \begin{bmatrix} 1 & 0\\ 0 & 1 \end{bmatrix} and D(g)= \begin{bmatrix} 0 & 1\\ 1 & 0 \end{bmatrix} and let's take invertible matrix A= \begin{bmatrix} 1 & 2\\ 3 & 4 \end{bmatrix}. Then A^{-1}=...
  38. B

    I Questions about Rotation Groups in Physics

    I have questions concerning group theory, esprecially Rotation groups. The first is: Are rotations groups f.ex. SO(2) defined for rotations in the actual physical 2 dimensional plane or are general rotations in any 2 dimensional space included? Someone wrote that "the action of an element of...
  39. S

    Algebra Lie Groups and Lie Algebras by Robert Gilmore

    Anyone reading Lie Groups and Lie Algebras and Some of Their Applications by Robert Gilmore , might be interested in a series of YouTube videos by "XylyXylyX" that follows the book. The first lecture is:
  40. C

    MHB Finite vs Ring Groups: Examining Theorems

    Dear Everyone, Does every theorem that holds for finite group holds for ring groups? Why or Why not?Thanks Cbarker1
  41. Haorong Wu

    Schools Are there any good groups about quantum computation?

    Hi. After learning quantum computation for months, it fascinates me. Quantum computation expands my view about computational methods. I believe that many future achievements can be obtained from quantum computing, especially the combination of AI and quantum computation. Meanwhile, I think...
  42. S

    Schools Who are the Top Non-Equilibrium Research Groups in North America and Europe?

    I realize the question is quite broad but what research groups working on statistical physics, stochastic processes, and complex systems are generally considered the best? Would like to know about Europe and America alike.
  43. L

    A Why does the Lie group ##SO(N)## have ##n=\frac{N(N-1)}{2}## real parameters?

    When we have a Lie group, we want to obtain number of real parameters. In case of orthogonal matrices we have equation R^{\text{T}}R=I, that could be written in form \sum_i R_{i,j}R_{i,k}=\delta_{j,k}. For this real algebra ##SO(N)## there is ##n=\frac{N(N-1)}{2}## real parameters. Why this is...
  44. A

    Sub groups of the dihedral group

    Homework Statement This is only a step in a proof I am trying to make. Let Dm be the dihedral group. r is the rotation of 2π/m around the origin and s is a reflexion about a line passing trough a vertex and the origin. Let<s> and <r> be two subgroups of Dm. Is there a theorem that states...
  45. Matthew Strasiotto

    Doping semiconductors compounded from various element groups

    Hi all - This is pulled from a past paper - Homework Statement I'm only going to state the components that I find challenging of this problem - The rest will be attached in my solution set. Essentially - given an intrinsic semiconductor comprised of group II-VI elements. Upon doping with group...
  46. A

    Show injectivity, surjectivity and kernel of groups

    Homework Statement I am translating so bear with me. We have two group homomorphisms: α : G → G' β : G' → G Let β(α(x)) = x ∀x ∈ G Show that 1)β is a surjection 2)α an injection 3) ker(β) = ker(α ο β) (Here ο is the composition of functions.) Homework Equations This is from a...
  47. L

    Group Theory: Finite Abelian Groups - An element of order

    Homework Statement Decide all abelian groups of order 675. Find an element of order 45 in each one of the groups, if it exists. Homework Equations /propositions/definitions[/B] Fundamental Theorem of Finite Abelian Groups Lagrange's Theorem and its corollaries (not sure if helpful for this...
  48. K

    I Symmetry Group Freedom: Choosing How Groups Act on Coordinates

    One could argue that this question should be posted on the maths forum, but I see it so frequently in physics that I find it more productive to ask it here. In a symmetry group, do we have freedom of choice of how the group is going to act in the coordinates? Or is the way the group act on the...
  49. karush

    MHB 3.13 Compute the orders of the following groups:

    \nmh{837} Compute the orders of the following groups: $U(3), U(4), U(12)$ and $U(3), U(5), U(15)$. On the basis of your answers, make a conjecture about the relationship among $|U(r)|, |U(s)|$, and $|U(rs)|$. ok I still don't have a clear idea on how to do this $ax=1$ $U(3)=3$
  50. karush

    MHB Orders of Elements in Groups $$\Bbb{Z}_{12}, U(10), U(12), D4$$

    nmh{909} For each group in the following list, $$ \Bbb{Z}_{12}, \qquad U(10)\qquad U(12) \qquad D4 $$ (a) find the order of the group $$|\Bbb{Z}_{12}|=12$$ (b) the order of each element in the group.ok the eq I think we are supposed to use is $$\textit{ if } o(g)=n \textit{ then }...
Back
Top