What is Cyclic: Definition and 323 Discussions

In group theory, a branch of abstract algebra, a cyclic group or monogenous group is a group that is generated by a single element. That is, it is a set of invertible elements with a single associative binary operation, and it contains an element g such that every other element of the group may be obtained by repeatedly applying the group operation to g or its inverse. Each element can be written as a power of g in multiplicative notation, or as a multiple of g in additive notation. This element g is called a generator of the group.Every infinite cyclic group is isomorphic to the additive group of Z, the integers. Every finite cyclic group of order n is isomorphic to the additive group of Z/nZ, the integers modulo n. Every cyclic group is an abelian group (meaning that its group operation is commutative), and every finitely generated abelian group is a direct product of cyclic groups.
Every cyclic group of prime order is a simple group, which cannot be broken down into smaller groups. In the classification of finite simple groups, one of the three infinite classes consists of the cyclic groups of prime order. The cyclic groups of prime order are thus among the building blocks from which all groups can be built.

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  1. S

    Is Aut(C_2p) Cyclic for Prime p Values 5, 7, 11?

    I came across a section of my notes that claimed the automorphism group of the cyclec groups C_2p where p=5,7,11 is cyclic, that is Aut(C_2p) is cyclic for p = 5,7,11. I wasn't able to see why this is so. Is it just a fact or is there some sort of proof of the above...? Thanks
  2. K

    How Do You Calculate Entropy Change in a Reversible Cyclic Process?

    An ideal gas undergoes a reversible, cycli process. First it expands isothermally from state A to state B. It is then compressed adiabatically to state C. Finally, it is cooled at constant volume to its original state, A. I have to calculate the change in entropy of the gas in each one of the...
  3. MathematicalPhysicist

    Cyclic Subspaces: Proving Equality of Zero Spaces for Coprime Polynomials

    prove that Z(v,T)=Z(u,T) iff g(T)(u)=v, where g(t) is prime compared to a nullify -T of u. (which means f(t) is the minimal polynomial of u, i.e f(T)(u)=0). (i think that when they mean 'is prime compared to' that f(t)=ag(t) for some 'a' scalar). i tried proving this way: suppose, g(T)(u)=v...
  4. MathematicalPhysicist

    Can the Cyclic Universe Theory Be Explained Without Superstring Theory?

    the cyclic universe... is the theory proposed by paul steinhardt can be explained even without the use of superstring theory? i mean can you apply other theories (such as lqg) to explain the cyclic universe idea, or it's entirely depended on strings and extra dimensions?
  5. T

    Proving Existence of a Cyclic Vector for T

    "Suppose V is an n-dimensional vector space over an algebraically closed field F. Let T be a linear operator on V. Prove that there exists a cyclic vector for T <=> the minimal polynomial is equal to the characteristic polynomial of T." (A cyclic vector is one such that (v,Tv,...,T^n-1 v) is a...
  6. E

    Efficiency of Carnot Engine w/ 0.75kg Ideal Gas

    http://img20.imageshack.us/img20/2964/physics16ri.th.png The working substance of a cyclic heat engine is 0.75kg of an ideal gas. The cycle consists of two isobaric processes and two isometric processes as shown in Fig. 12.21 (image above). What would be the efficiency of a Carnot engine...
  7. J

    Cyclic Abelian Groups: True for All Cases?

    is this true for all cases? i know something can be abelian and not cyclic. thanks
  8. A

    Cyclic frequency of unknown weight

    When an unknown weight W was suspended from a spring with an unknown force constant k, it reached its equilibrium position and the spring was stretched 14.2cm because of the weight W. Then the weight W was pulled further down to a position 16cm (1.8cm below its equilibrium position) and...
  9. N

    Sum of interior angles of cyclic hexagon

    Right I have been given the following problem and cannot resolve it. I have had an attempt but without much success. Could anyone help me with this exercise, please? Hints or a little more welcome :-) A cyclic hexagon is a hexagon whose vertices all lie on the circumference of a circle...
  10. H

    Normal subgroups, isomorphisms, and cyclic groups

    I'm really stuck on these two questions, please help! 1. Let G={invertible upper-triangular 2x2 matrices} H={invertbile diagonal matrices} K={upper-triangular matrices with diagonal entries 1} We are supposed to determine if G is isomorphic to the product of H and K. I have concluded...
  11. A

    Vanishing of a cyclic integral the property of a state function?

    Why is the vanishing of a cyclic integral the property of a state function?
  12. A

    Cyclic Group Problem: Showing X Forms a Group

    Show that the set X = \{x : 0 < x < p^m, x \equiv 1 (\mathop{\rm mod}p)\} where p is an odd prime, together with multiplication mod p^m forms a cyclic group. It might help to write the x in X in the form: x = 1 + a_1p^1 + \dots + a_{m-1}p^{m-1} for (a_1,\, a_2,\, \dots ,\, a_{m-1}) \in...
  13. C

    Intersection of cyclic subgroups

    This time I need a yes/no answer (but a definitive one!): Suppose we have a group of finite order G, and two cyclic subgroups of G named H1 and H2. I know the intersection of H1 and H2 is also a subground of G, question is - is it also cyclic? And can I tell who is the creator of it, suppose I...
  14. A

    Infrared spectroscopy of a cyclic alkene

    At school we extracted limonene from orange peels and we had to make an IR spectroscopy for it but I don't see anywhere how we can know the product has a ring constitution... I see a lot of information about aromatic rings but nothing for an alkene ring... Can anybody help me?
  15. D

    Geographic Profiling Using Cyclic

    How does one find the most probable central location of something/someone when four points of their earlier location have been recorded and drafted? For example, if one is given points A, B, D, and C, how would they find the central location? This method must use cyclic quadrilaterals, and four...
  16. G

    Cyclic Voltammetry: Meaning & Lab Results

    I'm trying to do this ferrocene lab, and we did cyclic voltammetry on our purified product and I calculated these results: E_1/2= 664.6 mV I_pc/I_pa=-.6221 Delta Ep=29.2 mV Can anyone tell me what these numbers mean? I don't really understand what voltammetry tells you about your...
  17. N

    Belian group A that is the direct sum of cyclic groups

    If I have an abelian group A that is the direct sum of cyclic groups, say A=[tex]C_5 \oplus C_35[\tex], would I be right in saying the annihilator of A (viewed as a Z-module) is generated by (5,35)? If not, how do I find it?
  18. S

    Exploring Properties of Cyclic Quadrilaterals

    Here's an interesting question which is related to proofs, one of the hardest chapters of math: If a circle can be drawn to pass through the 4 vertices of a Quadrilateral, we call this a "cyclic quadrilateral". What special properties do you think a cyclic quadrilateral has that wouldn't be...
  19. R

    Is the Universe Undergoing an Infinite Series of Expansions and Contractions?

    Here is a new paper by Niel Turok and Paul J Steinhardt. http://uk.arxiv.org/PS_cache/hep-th/pdf/0403/0403020.pdf The initial reading makes one ask a simple question, if I was to be at a far away location, say at the QSO of farthest detected Galaxy, and I looked back to the location of...
  20. N

    Klein and Cyclic Groups: Definitions and Subgroups

    Hi everybody! Question #1 What is the definition of a Klein group? The K_4 group has a table that looks like this: \begin{array}{c|cccc} *&e&a&b&c \\\hline e&e&a&b&c\\ a&a&e&c&b\\ b&b&c&e&a\\ c&c&b&a&e \end{array} What is the strict definition of a Klein group? That every...
  21. M

    Cyclic Model: Introduction by Steinhardt & Turok

    The cyclic model was introduced in this paper: "A cyclic model of the universe" http://arxiv.org/abs/hep-th/0111030 and is a idea of Steinhardt and Turok. (Some might some day recognize the great quantities of ideas that Steinhardt has introduced in the last 30 years). The model proposes an...
  22. Y

    What is the number of elements in the set {x^(13n) : n is a positive integer}?

    A cyclic group of order 15 has an element x such that the set {x^3, x^5, x^9} has exactly two elements. The number of elements in the set {x^(13n) : n is a positive integer} is : 3. WHy is the answer 3? Thanks!
  23. A

    Uncovering the Rule of 'Cyclic' Primes

    1/7 = .142857... (repeated) 2/7 = .285714... 3/7 = .428571... 4/7 = .571428... 5/7 = .714285... 6/7 = .857142... So, you get all n/7 from the same 'cycle' of 6 digits. Let's call 7 a 'cyclic' integer. The next cyclic integers are 17, 19, 23,... They are all prime. But 11, 13, or 37 are...
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