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couponavengers.comHostgator is a huge privately owned hosting company running from several cutting-edge facilities in Dallas, Texas. Hostgator was founded in 2002, because then they have grown quickly and currently host over 400,000 sites. They are also widely considered to be the worlds leading company of reseller hosting accounts. At present they provide hosting to over 10,000 specific reseller account customers.

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@@ Line 1: / Line 1: @@
-[[Image:Indicator function illustration.png|right|thumb|The graph of the indicator function of a two-dimensional subset of a square.]]
+<br><br>[http://www.couponavengers.com/hostgator-coupon-codes/ couponavengers.com]Hostgator is a huge privately owned hosting company running from several cutting-edge facilities in Dallas, Texas. Hostgator was founded in 2002, because then they have grown quickly and currently host over 400,000 sites. They are also widely considered to be the worlds leading company of reseller hosting accounts. At present they provide hosting to over 10,000 specific reseller account customers.<br><br>Hostgator offers numerous different webhosting plans, and cater to a broad array of consumers. From the first time web designer who needs simple, stress free of cost hosting for their personal website; all the means through to huge corporations, who need specialist devoted hosting services.<br><br>Hostgator's hosting packages can be split into three teams; conventional shared hosting plans (appropriate for the vast majority individuals), reseller hosting plans (these are primarily for individuals and businesses that want to "resell" their account resources to clients of their own), and lastly devoted server plans (these accounts offer customer their own server, so they do not have to share its resources with anyone else). Extremely few of us will every require a devoted server so this evaluation will focus on the shared hosting plans that Hostgator offer.<br><br>Attributes<br><br>Hostgator's three primary shared hosting strategies are called: "Hatchling" (the entry level plan priced at $6.95 / month), "Baby" (this is the most popular plan, and it is likely to please the requirements of a really large range of customers), and "Swamp" (similar as the "Baby" strategy, but with boosts in bandwidth and disk area, priced at $14.95 / month).<br><br>For a full list of attributes and a side by side comparison of all hosting strategies you must go to Hostgator's site below. Below is an evaluation of the most crucial attributes of the "Child" strategy, this is most likely the most appropriate bundle for most individuals, and it is our favorite plan.<br><br>Disk space 100GB - This quantity has been recently updated by Hostgator from 5GB to a huge 100GB. All individuals are most likely to find it difficult to exhaust this amount of disk area.<br><br>Bandwidth 1000GB/month - Likewise increased is the bandwidth allotment, from 75GB to a relatively extreme 1000GB. Once again practically zero possibility of making use of all that, but it's nice to know that you definitely will not be facing additional charges for reviewing your restriction, even if you have a very busy website(s).<br><br>Site Studio website builder - This is a great complimentary program that allows you to construct your website from scratch. You have over 500 templates and color plans to select from. You require no HTML experience, or code writing expertise. It offers the most basic possible means of designing an expert looking site in a really brief area of time. There is no need to take my word for it, as Hostgator provides us with a trial version of the software on their website!<br><br>Endless add-on domains - This truly is the attract attention feature of this hosting plan (the "Hatchling" plan just [http://www.Britannica.com/search?query=permits permits] 1 domain), and allows you to host as numerous internet sites as you such as on a single account, at no additional expense. All your internet sites then share your account resources. This allows you to make complete use of your massive bandwidth and disk space allowances, and host multiple internet sites at a portion of the regular expense. Great!<br><br>99.9 % Uptime assurance - This basically informs us that Hostgator is a major host providing a reliable service. If uptime drops below this figure in any offered month then you don't spend for that months hosting, it's as easy as that! We would never ever consider utilizing a host that did not provide a solid uptime guarantee; this is simply since there is only one excellent reason a host will not provide an uptime assurance - unreliable uptime!<br><br>30 Day refund assurance - This has become a quite basic function in the internet hosting area, though it's good to have for added peace of mind.<br><br>Instant setup - The majority of hosting service providers take 24-48 hours to setup your account however Hostgator guarantees to have you working in under 15 minutes (they do not charge a setup cost either)!<br><br>Endless MySQL data sources - This is really helpful because each Fantastico (see below) script requires its own MySQL database.<br><br>Fantastico DeLuxe - This impressive program permits you to immediately install over 50 scripts through your control board. Scripts consist of blog sites, forums, galleries, shopping carts, and more.<br><br>Unrestricted email accounts - Permits you to have as lots of, or as few, different email addresses as you like.<br><br>cPanel control panel - At the heart of any webhosting experience is the control board, fortunately Hostgator utilizes one of the very best systems around, a cPanel. It's well laid out and easy to run. It contains numerous attributes and provides good performance. Most importantly, there is a full working trial on the Hostgator website, so you can test it out yourself!<br><br>Customer support and technical support<br><br>Hostgator offers us 24/7 phone support, and live online talk. The fact that you are provided 2 choices to receive instant technical support at any time of the day is terrific. Our experience has actually constantly been very good when calling Hostgator, their operatives are extremely polite and most significantly they appear to know their stuff when dealing with technical issues.<br><br>Performance<br><br>The efficiency from Hostgator's servers is excellent! Hostgator place much tighter limits on the variety of sites sharing the exact same server compared to most various other shared hosting providers. This offers greater dependability since less strain is put on the servers; and it also considerably enhances the rate at which your web pages run.<br><br>Server efficiency is another one of the crucial areas where Hostgator distinguish themselves from the group of other webhosting.<br><br>Our verdict<br><br>Overall there is so much to like about the method Hostgator does business, they truly do seem to have a good grasp on exactly what the average client needs from an internet hosting company. Seldom do you discover reports of dissatisfied Hostgator clients, and after hosting with them ourselves we now know why! Reliability, performance, and uptime from the servers is first rate, also client service is method ahead of the majority of various other host out there. The location where Hostgator really stands out is value for money.  When you have just about any concerns concerning wherever as well as the best way to use [http://www.gorod-nadym.ru/navicat-hostgator Hostgator Coupon Codes], you can e-mail us at our website. At simply $9.95 / month for the "Baby" plan (that includes limitless domains); anybody aiming to host more than one website has a quite simple choice to make. The other wonderful aspect of this plan is that you do not need to register to a contract. You pay on a month-by-month basis, which leaves you complimentary to cancel your account at any time without losing money. So to sum up, we don't really have any bad things about Hostgator; at the rates they charge, we really feel that they offer a phenomenal service. Keep up the great Hostgator!
-In [[mathematics]], an '''indicator function''' or a '''characteristic function''' is a [[Function (mathematics)|function]] defined on a [[Set (mathematics)|set]] ''X'' that indicates membership of an [[Element (mathematics)|element]] in a [[subset]] ''A'' of ''X'', having the value 1 for all elements of ''A'' and the value 0 for all elements of ''X'' not in ''A''.
-==Definition==
-The indicator function of a subset ''A'' of a set ''X'' is a function
-:<math>\mathbf{1}_A \colon X \to \{ 0,1 \} \,</math>
-defined as
-:<math>\mathbf{1}_A(x) :=
-\begin{cases}
-&\text{if } x \in A, \\
-&\text{if } x \notin A.
-\end{cases}
-</math>
-The [[Iverson bracket]] allows the equivalent notation, [''x'' ∈ ''A''], to be used instead of '''1'''<sub>''A''</sub>(''x'').
-The function '''1'''<sub>''A''</sub> is sometimes denoted '''1'''<sub>''A'' ∈ A</sub>, χ<sub>''A''</sub> or '''I'''<sub>''A''</sub> or even just ''A''. (The [[Greek alphabet|Greek letter]] χ appears because it is the initial letter of the Greek word ''characteristic''.)
-==Remark on notation and terminology==
-* The notation '''1'''<sub>''A''</sub> is also used to denote the [[identity function]].{{clarify|date=July 2012}}
-* The notation χ<sub>''A''</sub> is also used to denote the [[Characteristic function (convex analysis)|characteristic function]] in [[convex analysis]].{{clarify|date=July 2012}}
-A related concept in [[statistics]] is that of a [[dummy variable (statistics)|dummy variable]] (this must not be confused with "dummy variables" as that term is usually used in mathematics, also called a [[free variables and bound variables|bound variable]]).
-The term "[[characteristic function (probability theory)|characteristic function]]" has an unrelated meaning in [[probability theory]]. For this reason, [[List of probabilists|probabilists]] use the term '''indicator function''' for the function defined here almost exclusively, while mathematicians in other fields are more likely to use the term ''characteristic function'' to describe the function which indicates membership in a set.
-== Basic properties ==
-The ''indicator'' or ''characteristic'' [[function (mathematics)|function]] of a subset ''A'' of some set ''X'', [[Map (mathematics)|maps]] elements of ''X'' to the [[Range (mathematics)|range]] {0,1}.
-This mapping is [[surjective]] only when ''A'' is a non-empty [[proper subset]] of ''X''. If ''A'' ≡ ''X'', then
-'''1'''<sub>''A''</sub> = 1. By a similar argument, if ''A'' ≡ Ø then '''1'''<sub>''A''</sub> = 0.
-In the following, the dot represents multiplication, 1·1 = 1, 1·0 = 0 etc. "+" and "&minus;" represent addition and subtraction. "<math>\cap </math>" and "<math>\cup </math>" is intersection and union, respectively.
-If <math>A</math> and <math>B</math> are two subsets of <math>X</math>, then
-:<math>\mathbf{1}_{A\cap B} = \min\{\mathbf{1}_A,\mathbf{1}_B\} = \mathbf{1}_A \cdot\mathbf{1}_B,</math>
-:<math>\mathbf{1}_{A\cup B} = \max\{{\mathbf{1}_A,\mathbf{1}_B}\} = \mathbf{1}_A + \mathbf{1}_B - \mathbf{1}_A \cdot\mathbf{1}_B,</math>
-and the indicator function of the [[Complement (set theory)|complement]] of <math>A</math> i.e. <math>A^C</math> is:
-:<math>\mathbf{1}_{A^\complement} = 1-\mathbf{1}_A</math>.
-More generally, suppose <math>A_1, \dotsc, A_n</math> is a collection of subsets of ''X''.  For any
-''x'' ∈ ''X'':
-:<math> \prod_{k \in I} ( 1 - \mathbf{1}_{A_k}(x))</math>
-is clearly a product of 0s and 1s.  This product has the value 1 at
-precisely those ''x'' ∈ ''X'' which belong to none of the sets ''A<sub>k</sub>'' and
-is 0 otherwise. That is
-:<math> \prod_{k \in I} ( 1 - \mathbf{1}_{A_k}) = \mathbf{1}_{X - \bigcup_{k} A_k} = 1 - \mathbf{1}_{\bigcup_{k} A_k}.</math>
-Expanding the product on the left hand side,
-: <math> \mathbf{1}_{\bigcup_{k} A_k}= 1 - \sum_{F \subseteq \{1, 2, \dotsc, n\}} (-1)^{|F|} \mathbf{1}_{\bigcap_F A_k} = \sum_{\emptyset \neq F \subseteq \{1, 2, \dotsc, n\}} (-1)^{|F|+1} \mathbf{1}_{\bigcap_F A_k} </math>
-where |''F''| is the cardinality of ''F''. This is one form of the principle of [[inclusion-exclusion]].
-As suggested by the previous example, the indicator function is a useful notational device in [[combinatorics]].  The notation is used in other places as well, for instance in [[probability theory]]: if <math>X</math> is a [[probability space]] with probability measure <math>\mathbb{P}</math> and <math>A</math> is a [[Measure (mathematics)|measurable set]], then <math>\mathbf{1}_A</math> becomes a [[random variable]] whose [[expected value]] is equal to the probability of <math>A</math>:
-:<math>\operatorname{E}(\mathbf{1}_A)= \int_{X} \mathbf{1}_A(x)\,d\mathbb{P} = \int_{A} d\mathbb{P} = \operatorname{P}(A)</math>.
-This identity is used in a simple proof of [[Markov's inequality]].
-In many cases, such as [[order theory]], the inverse of the indicator function may be defined. This is commonly called the [[generalized Möbius function]], as a generalization of the inverse of the indicator function in elementary [[number theory]], the [[Möbius function]]. (See paragraph below about the use of the inverse in classical recursion theory.)
-==Mean, variance and covariance ==
-Given a [[probability space]] <math>\textstyle (\Omega, \mathcal F, \mathbb P)</math> with <math>A \in \mathcal F</math>, the indicator random variable <math>\mathbf{1}_A \colon \Omega \rightarrow \Bbb{R}</math> is defined by <math>\mathbf{1}_A (\omega) = 1 </math> if <math> \omega \in A,</math> otherwise <math>\mathbf{1}_A (\omega) = 0.</math>
-;[[Mean]]: <math>\operatorname{E}(\mathbf{1}_A (\omega)) = \operatorname{P}(A) </math>
-;[[Variance]]: <math>\operatorname{Var}(\mathbf{1}_A (\omega)) = \operatorname{P}(A)(1 - \operatorname{P}(A)) </math>
-;[[Covariance]]: <math> \operatorname{Cov}(\mathbf{1}_A (\omega), \mathbf{1}_B (\omega)) = \operatorname{P}(A \cap B) - \operatorname{P}(A)\operatorname{P}(B) </math>
-==Characteristic function in recursion theory, Gödel's and Kleene's ''representing function'' ==
-[[Kurt Gödel]] described the ''representing function'' in his 1934 paper "On Undecidable Propositions of Formal Mathematical Systems". (The paper appears on pp.&nbsp;41–74 in [[Martin Davis]] ed. ''The Undecidable''):
-:"There shall correspond to each class or relation R a representing function φ(x<sub>1</sub>, . . ., x<sub>n</sub>) = 0 if R(x<sub>1</sub>, . . ., x<sub>n</sub>) and φ(x<sub>1</sub>, . . ., x<sub>n</sub>) = 1 if ~R(x<sub>1</sub>, . . ., x<sub>n</sub>)." (p. 42; the "~" indicates logical inversion i.e. "NOT")
-[[Stephen Kleene]] (1952) (p.&nbsp;227) offers up the same definition in the context of the [[primitive recursive function]]s as a function φ of a predicate P takes on values 0 if the predicate is true and 1 if the predicate is false.
-For example, because the product of characteristic functions φ<sub>1</sub>*φ<sub>2</sub>* . . . *φ<sub>n</sub> = 0 whenever any one of the functions equals 0, it plays the role of logical OR: IF φ<sub>1</sub> = 0 OR φ<sub>2</sub> = 0 OR . . . OR φ<sub>n</sub> = 0 THEN their product is 0. What appears to the modern reader as the representing function's logical inversion, i.e. the representing function is 0 when the function R is "true" or satisfied", plays a useful role in Kleene's definition of the logical  functions OR, AND, and IMPLY (p.&nbsp;228), the bounded- (p.&nbsp;228) and unbounded- (p.&nbsp;279ff) [[mu operator]]s (Kleene (1952)) and the CASE function (p.&nbsp;229).
-==Characteristic function in fuzzy set theory==
-In classical mathematics, characteristic functions of sets only take values 1 (members) or 0 (non-members). In [[fuzzy set theory]], characteristic functions are generalized to take value in the real unit interval [0,&nbsp;1], or more generally, in some [[universal algebra|algebra]] or [[structure (mathematical logic)|structure]] (usually required to be at least a [[partially ordered set|poset]] or [[lattice (order)|lattice]]). Such generalized characteristic functions are more usually called [[membership function (mathematics)|membership function]]s, and the corresponding "sets" are called ''fuzzy'' sets. Fuzzy sets model the gradual change in the membership [[degree of truth|degree]] seen in many real-world [[predicate (mathematics)|predicate]]s like "tall", "warm", etc.
-==Derivatives of the indicator function==
-A particular indicator function, which is very well known, is the [[Heaviside step function]]. The Heaviside step function is the indicator function of the one-dimensional positive half-line, i.e. the domain [0, ∞). It is well-known that the [[distributional derivative]] of the Heaviside step function, indicated by ''H''(''x''), is equal to the [[Dirac delta function]], i.e.
-:<math>
-\delta(x)=\tfrac{d H(x)}{dx},
-</math>
-with the following property:
-:<math>
-\int_{-\infty}^\infty f(x) \, \delta(x) dx =  f(0).
-</math>
-The derivative of the Heaviside step function can be seen as the 'inward normal derivative' at the 'boundary' of the domain given by the positive half-line. In higher dimensions, the derivative naturally generalises to the inward normal derivative, while the Heaviside step function naturally generalises to the indicator function of some domain ''D''. The surface of ''D'' will be denoted by ''S''. Proceeding, it can be derived that the [[Laplacian of the indicator#Surface Dirac delta function|inward normal derivative of the indicator]] gives rise to a 'surface delta function', which can be indicated by δ<sub>''S''</sub>('''x'''):
-:<math>\delta_S(\mathbf{x})=-\mathbf{n}_x\cdot\nabla_x\mathbf{1}_{\mathbf{x}\in D}</math>
-where ''n'' is the outward [[Normal (geometry)|normal]] of the surface ''S''. This 'surface delta function' has the following property:<ref>{{citation|last=Lange|first=Rutger-Jan|year=2012|publisher=Springer|title=Potential theory, path integrals and the Laplacian of the indicator|journal=Journal of High Energy Physics|volume=2012|pages=29–30|url=http://link.springer.com/article/10.1007%2FJHEP11(2012)032|issue=11|bibcode=2012JHEP...11..032L|doi=10.1007/JHEP11(2012)032|arxiv = 1302.0864 }}</ref>
-:<math>
--\int_{\mathbf{R}^n}f(\mathbf{x})\,\mathbf{n}_x\cdot\nabla_x\mathbf{1}_{\mathbf{x}\in D}\;d^{n}\mathbf{x}=\oint_{S}\,f(\mathbf{\beta})\;d^{n-1}\mathbf{\beta}.
-</math>
-By setting the function ''f'' equal to one, it follows that the [[Laplacian of the indicator#Surface Dirac delta function|inward normal derivative of the indicator]] integrates to the numerical value of the [[surface area]] ''S''.
-==See also==
-* [[Dirac measure]]
-* [[Laplacian of the indicator]]
-* [[Dirac delta]]
-* [[Extension (predicate logic)]]
-* [[Free variables and bound variables]]
-* [[Heaviside step function]]
-* [[Iverson bracket]]
-* [[Kronecker delta]], a function that can be viewed as an indicator for the [[Equality (mathematics)|identity relation]]
-* [[Multiset]]
-* [[Membership function (mathematics)|Membership function]]
-* [[Simple function]]
-* [[Dummy variable (statistics)]]
-{{More footnotes|date=December 2009}}
-== Notes ==
-{{Reflist}}
-== References ==
-* {{cite book | last = Folland | first = G.B. | title = Real Analysis: Modern Techniques and Their Applications | edition = Second | publisher = John Wiley & Sons, Inc. | year = 1999 }}
-* {{cite book
- | first1 = Thomas H. | last1 = Cormen | authorlink1 = Thomas H. Cormen
- | first2 = Charles E. | last2 = Leiserson | authorlink2 = Charles E. Leiserson
- | first3 = Ronald L. | last3 = Rivest | authorlink3 = Ronald L. Rivest
- | first4 = Clifford | last4 = Stein | authorlink4 = Clifford Stein
- | title = [[Introduction to Algorithms]]
- | edition = Second Edition
- | publisher = MIT Press and McGraw-Hill
- | year = 2001
- | isbn = 0-262-03293-7
- | chapter = Section 5.2: Indicator random variables
- | pages = 94&ndash;99
- }}
-* {{cite book
- | editor1-first = Martin | editor1-last = Davis | editor1-link = Martin Davis
- | year = 1965
- | title = The Undecidable
- | publisher = Raven Press Books, Ltd. | location = New York
- }}
-* {{cite book
- | first = Stephen | last = Kleene | authorlink = Stephen Kleene
- | origyear = 1952 | title = Introduction to Metamathematics
- | publisher = Wolters-Noordhoff Publishing and North Holland Publishing Company | location = Netherlands
- | type = Sixth Reprint with corrections
- | year = 1971
- }}
-* {{cite book
- | first1 = George | last1 = Boolos | authorlink1 = George Boolos
- | first2 = John P. | last2 = Burgess | authorlink2 = John P. Burgess
- | first3 = Richard C. | last3 = Jeffrey | authorlink3 = Richard C. Jeffrey
- | year = 2002
- | title = Computability and Logic
- | publisher =  Cambridge University Press | location = Cambridge UK
- | isbn = 0-521-00758-5
- }}
-* {{cite journal
- | first = Lotfi A. | last = Zadeh | authorlink = Lotfi A. Zadeh
- | date = June 1965
- | title = Fuzzy sets
- | journal = [[Information and Control]]
- | volume = 8 | issue = 3 | pages = 338–353
- | url = http://www-bisc.cs.berkeley.edu/zadeh/papers/Fuzzy%20Sets-1965.pdf | format = PDF
- |
-doi = 10.1016/S0019-9958(65)90241-X
- }}
-* {{cite journal
- | first = Joseph | last = Goguen | authorlink = Joseph Goguen
- | year = 1967
- | title = ''L''-fuzzy sets
- | journal = Journal of Mathematical Analysis and Applications
- | volume = 18 | issue = 1 | pages = 145–174
- | doi = 10.1016/0022-247X(67)90189-8
- }}
-[[Category:Measure theory]]
-[[Category:Integral calculus]]
-[[Category:Real analysis]]
-[[Category:Mathematical logic]]
-[[Category:Basic concepts in set theory]]
-[[Category:Probability theory]]
-[[Category:Types of functions]]

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