Zig-zag lemma: Difference between revisions

Latest revision as of 22:29, 31 January 2014

A multiplicative character (or linear character, or simply character) on a group G is a group homomorphism from G to the multiplicative group of a field Template:Harv, usually the field of complex numbers. If G is any group, then the set Ch(G) of these morphisms forms an abelian group under pointwise multiplication.

This group is referred to as the character group of G. Sometimes only unitary characters are considered (thus the image is in the unit circle); other such homomorphisms are then called quasi-characters. Dirichlet characters can be seen as a special case of this definition.

Multiplicative characters are linearly independent, i.e. if $χ_{1}, χ_{2}, \dots, χ_{n}$ are different characters on a group G then from $a_{1} χ_{1} + a_{2} χ_{2} + \dots + a_{n} χ_{n} = 0$ it follows that $a_{1} = a_{2} = \dots = a_{n} = 0$ .

Examples

Consider the (ax + b)-group

G : = {(\begin{matrix} a & b \\ 0 & 1 \end{matrix}) | a > 0, b \in R} .

Functions f_u : G → C such that

f_{u} ((\begin{matrix} a & b \\ 0 & 1 \end{matrix})) = a^{u},

where u ranges over complex numbers C are multiplicative characters.

Consider the multiplicative group of positive real numbers (R⁺,·). Then functions f_u : (R⁺,·) → C such that f_u(a) = a^u, where a is an element of (R⁺, ·) and u ranges over complex numbers C, are multiplicative characters.

@@ Line 1: / Line 1: @@
-Rejection is just information that get back while reaching other associates. It doesn't have any emotions. It's you who gives meaning and thus emotions to rejections. An individual ought acknowledge rejections as well as at them as a helpful feedback and a learning valuable experience.<br><br>Aside from cognitive behavioral therapy, group therapy additionally very helpful for the daily life. They are assigned activities like acting, being part associated with discussion maybe dialogue. Through this, they are able to practice in order to socialize with other people. Slowly they will be aware of how to interact with everyone else and they will become optimistic. This will prepare them to socialize and lower anxiety levels when they are already for your real mode. With all the practices through the therapy the patients' confidence will enhance and these love socializing.<br><br>Why now don't take up a short class within weekend? A cooking class will accomplish. Not only will this help you make more friends, this will also boost your confidence.<br><br>It additionally be be helpful if you work out daily. Exercising can conserve the body to provide chemicals which have been responsible to make people feel pleasure. Might possibly also assist help sleep and eat better.<br><br>By asking questions, you turn a person's eye away from yourself additionally won't be so scared about as a precaution have competence . or your image. This will help you to overcome overcome [https://www.youtube.com/watch?v=kKqUUeVzoLE social anxiety counseling online], relax socially and beat shyness.<br><br>Ask people questions could be a great ice-breaker to get a person talking or are they a conversation continuing. Ask people open questions that require more merely a 'yes'/'no'. Use phrases like "Tell me more", or "I would in order to know more" to try to conversation sure. Many people like  about themselves and will even find you interesting when show you just show a in public record information have state he.<br><br>It's recommended that we all drink more water, get more protein the diets, as well get more alkaline mineral. Doing all these things will let us get right into a much better balance. Drink half physique weight in ounces water per date. Eat 0.5 grams of protein per pound of obesity (supplementing with a capable protein powder is helpful). And, get your meals at least seven servings of fruits and vegetables on a daily basis for their mineral content. If everybody just did this we'd possess a heck belonging to the lot less negative feelings attacks out there.<br><br>By adjusting just that you'll these routines you have, you are often more open alter and you'll have become more willing to step other than your safe place. So try to look at just several small tasks that you could do. What would be among the norm you r? When you are available change, you open yourself up to new experiences and prospects.
+A '''multiplicative character''' (or '''linear character''', or simply '''character''') on a group ''G'' is a [[group homomorphism]] from ''G'' to the [[unit group|multiplicative group]] of a field {{Harv|Artin|1966}}, usually the field of [[complex numbers]].  If ''G'' is any group, then the set Ch(''G'') of these morphisms forms an [[abelian group]] under pointwise multiplication.
+This group is referred to as the [[character group]] of ''G''. Sometimes only ''unitary'' characters are considered (thus the image is in the [[unit circle]]); other such homomorphisms are then called ''quasi-characters''. [[Dirichlet character]]s can be seen as a special case of this definition.
+Multiplicative characters are [[linear independence|linearly independent]], i.e. if <math>\chi_1,\chi_2, \ldots , \chi_n </math> are different characters on a group ''G'' then from <math>a_1\chi_1+a_2\chi_2 + \cdots + a_n \chi_n = 0 </math> it follows that <math>a_1=a_2=\cdots=a_n=0 </math>.
+==Examples==
+*Consider the (''ax''&nbsp;+&nbsp;''b'')-group
+:: <math> G := \left\{ \left. \begin{pmatrix} a & b \\ 0 & 1  \end{pmatrix}\  \right|\  a > 0,\  b \in \mathbf{R} \right\}.</math>
+: Functions ''f''<sub>''u''</sub> : ''G'' → '''C''' such that <math>f_u \left(\begin{pmatrix}
+a & b \\
+& 1  \end{pmatrix}\right)=a^u,</math> where ''u'' ranges over complex numbers '''C''' are multiplicative characters.
+* Consider the multiplicative group of positive real numbers ('''R'''<sup>+</sup>,·). Then functions ''f''<sub>''u''</sub>&nbsp;:&nbsp;('''R'''<sup>+</sup>,·)&nbsp;→&nbsp;'''C''' such that ''f''<sub>''u''</sub>(''a'')&nbsp;=&nbsp;''a''<sup>''u''</sup>, where ''a'' is an element of ('''R'''<sup>+</sup>,&nbsp;·) and ''u'' ranges over complex numbers '''C''', are multiplicative characters.
+[[Category:Group theory]]

Zig-zag lemma: Difference between revisions

Latest revision as of 22:29, 31 January 2014

Examples

Navigation menu

Search