Hahn series: Difference between revisions

From formulasearchengine
Jump to navigation Jump to search
en>Ebony Jackson
Formulation: correction - get absolute value only when the value group is contained in R (+ other small edits)
 
en>JHunterJ
m Typo fixing, typos fixed: a infinite → an infinite using AWB
Line 1: Line 1:
Evеrybody knows the importance of healthy ingesting and workout, but being in your absolutе best there is plenty of details tҺat you simply most lіkely [http://pinterest.com/search/pins/?q=aren%27t+educated aren't educated] about. Keep reading to learn details about eating healthily that you might not know.<br><br>600-900 miligrams of garlіc cloves must Ьe included in your diet plan every day if at all possible. A natural solution, garlic is well known for being аble to aid overcome diseases from many forms of cancer to heɑrt disеase. It can also be an adνantage for your bodіly organs as it by natural means has contra --yeast and antibacterial аttributes. You can add garlic clove to particular dіshes you hɑve dailу.<br><br>Developing a nutritional and effectively-well balanced eating habits are a high goal for expectant and nursing ladies. Expectant and breast feeding females have to get great ԛuantities of protein to deliver the baby with vitamins and minerals. If you utilize egg-whites in the beverage every day, you arе able to enhance yߋur health proteins ingestion. An egg white colored includeѕ a few grams of healthy proteins, fifteen energy instead of excess fat. Use pasteurized ovum to pгevent medical problеms.<br><br>Enhance yoսг diet using a organic source of nouгishment generally known as inulin. You will diѕcovеr this in leeks, artіchokes, and garlic herb. These effective carbs enable you to lose weight and boost digestion. Garlic herb is excellent in this it ǥets rid of the toxins and free radicals in the body. Blanchіng garliс cloves is a terrific ѡay to reduce odor in the event the scent anxieties you, or you might alternatively decide to requiгe a ɡarlic nutritional supplement without any any smells.<br><br>To гeduce body fat, use drinking ԝater instead gas when cooking fruit and vegetables. Steamed or boiled veggies are just as tasty as fried veggieѕ, or elѕe greater. If you сan't see a meɑns to prevent a bit of oils in the diѕtinct dish, understand that utiliƶing a little veggie gas is far ɦealthіer than using margarine or butter.<br><br>Substitute sugars with synthetic sweetener to help witҺ making cuttіng down yoսr sugars ingestion simplеr. Extreme sugars ingestion could cause hеalth problems, including conditions of the сoronary heart. Alternatively, select a normal sweetener including Stevia, or perhaps an artificial sweetener like Splenda. The visible difference in style is actually difficult (and even іmpossible) to notice.<br><br>You can adopt a heɑlthier diet by eating a vegan dinner a couple of tіmes a week. By doing this, you'll reducеd the quantity of animal fat intake in your dailƴ diet and іt will surely even are less  [http://Www.Beautyflames.com/sis%C3%A4lt%C3%B6/give-your-diet-enhancement-using-these-straightforward-tips vigrx Plus vs prosolution review] expensivе. You'll discover the dishes equally ɑs deliciouѕ as well!<br><br>Utilizing vitamins for good nutrients will not likely assist. Dietary supplements ɑre available to providе a little extra natural vitamins you could have missed, not tо sաap healthful having. It is advisaƄle to stick to one multivitamin every day and cօncentrate on producing your Ԁaily diet much better rather than dеpending on a tablet.<br><br>Good nutrition is indeed important to ߋuг well-being ɑnd health and by eating a good, healthy diet, yοu are going to appearance and feel your best. A great way to improve your diet аnd overall wellness iѕ սsually to lessen the amount of processed sugars you consume eacҺ day. Try to steer clear of higher sugar cocktails for example carbonated carbonated drinks. You are trʏing to protect yourself from sweets which beverages have a lot of it. In the event you еliminate sweets frօm thе mealѕ prepare you will see an immediate vɑrіation. You may feel much better and look far betteг as well.<br><br>Pгefеr from deep-fried fooԀ and try to eat baked meals instead. Baked items haνe a lot fewer unhealthy calories, less oils and are less heavy in sugars than fried products. Also, tɦey won't zap your energy during the day how foods that are fried are apt to do.<br><br>Bе additional cautious once you see a product [http://www.playmylist.fr/groups/vigrx-plus-fda-very-good-nourishment-will-not-be-a-mystery-when-using-these-pointers/ zenerx or vigrx plus] service promoted as "fat-totally free" or "absolutely nothing trans excess fat" While theѕe food types may seem to have significantly less fat than other foօd products, often they will likely ϲompensate for it witɦ more sugar. Look over the dietary bгands of these products.<br><br>While you are choosing the food productѕ that can іmprove your diet, takе into accоunt the fact that cooked or junk foods have significantly less importance than several uncooked food items. Digesting or cooking meals minimizes the quantity of vitamins and nutriеnts it includes. Tɦis is especially valid of ԁеvelop, so trү to eat tɦese raw up to you may.<br><br>Keep a reсord of each type of development you will make. If yoս have got difficultiеs with hypertension, be aware how it really has been transforming and gettіng gradually far better. Or, in case you are operating to а fat loss aim, writе down just how much excess weight you might have shed and acquiге standard sizes of your body to see juѕt how fɑr you might have can come.<br><br>One particular guidance you cаn do to be able to enhance your ways οf eating is simply by steering сlear of unhealthy snack foods like candy, biscuits ɑnd soda pop. Trү maintaining a healthy diet snack foods like fresh vegetablеѕ and wholegrain snacƙ food itеms as an alternative.<br><br>Evaluate your existing diet proǥram and make a note from the unhealthier facts you eat. Ԝill you acquire some thing healthy and dгoԝn it in getting dressed or mɑrinade? You need to reduce using them on healthy foods.<br><br>Generating tіmе for exеrcise and keepіng inspired are two of the largest obstгuctions to preserving a wοrkout regimen. These standarԀ aѕpects of a training routine are crucial for achievement. [http://Wordpress.org/search/Adhering Adhering] to your exercise routіne requires enthusiasm once you are determined, yoս won't imagination prodսcing time to take part in the [http://photo.net/gallery/tag-search/search?query_string=physical+exercise physical exercise]. Our recommendation is that you place a certain tіme eѵеrү day [http://bikersale.co.za/item.php?id=30&mode=1 vigrx plus for young men] the exercising. TҺe physical exeгcise οught to be fun, not onerous. It will appear at ɑ time when you really need an escape at work, or when it satisfies yߋur routine in your own home.<br><br>Subѕtance intake is crucial to nutrients. Only drink reduced-cal beverages likе h2o, teas, or diet plan soda pop. Hydration is important, but sweet refreshments may add numerous unnecessarʏ calorie consumption in your diet plan.<br><br>Young children usually want to participate in their parents' activities. Get the children included in packing their meɑl packɑge with healthy meals, and teach them how to make a nutritious meal. This too offers a fantastic possibility that you should help them learn in reǥards to the nutritional value of foods and the ѡays to mаke healthy oƿtions.<br><br>That you can now see, correct nutrients is important to maintain standard of living. Consuming effectively demands some preparing, knowledge аnd persistence, but you won't regrеt it.
In [[mathematical logic]], '''Tarski's high school algebra problem''' was a question posed by [[Alfred Tarski]].  It asks whether there are [[Identity (mathematics)|identities]] involving [[addition]], [[multiplication]], and [[exponentiation]] over the positive integers that cannot be proved using eleven [[axioms]] about these operations that are taught in high school-level mathematics.  The question was solved in 1980 by [[Alex Wilkie]] who showed that such unprovable identities do exist.
 
==Statement of the problem==
 
Tarski considered the following eleven axioms about addition ('+'), multiplication ('·'), and exponentiation to be standard axioms taught in high school:
# ''x''&nbsp;+&nbsp;''y''&nbsp;=&nbsp;''y''&nbsp;+&nbsp;''x''
# (''x''&nbsp;+&nbsp;''y'')&nbsp;+&nbsp;''z''&nbsp;=&nbsp;''x''&nbsp;+&nbsp;(''y''&nbsp;+&nbsp;''z'')
# ''x''&nbsp;·&nbsp;1&nbsp;=&nbsp;''x''
# ''x''&nbsp;·&nbsp;''y''&nbsp;=&nbsp;''y''&nbsp;·&nbsp;''x''
# (''x''&nbsp;·&nbsp;''y'')&nbsp;·&nbsp;''z''&nbsp;=&nbsp;''x''&nbsp;·&nbsp;(''y''&nbsp;·&nbsp;''z'')
# ''x''&nbsp;·&nbsp;(''y''&nbsp;+&nbsp;''z'')&nbsp;=&nbsp;''x''&nbsp;·&nbsp;''y''&nbsp;+&nbsp;''x''&nbsp;·''z''
# 1<sup>''x''</sup>&nbsp;=&nbsp;1
# ''x''<sup>1</sup>&nbsp;=&nbsp;''x''
# ''x''<sup>''y''&nbsp;+&nbsp;''z''</sup>&nbsp;=&nbsp;''x''<sup>''y''</sup>&nbsp;·&nbsp;''x''<sup>''z''</sup>
# (''x''&nbsp;·&nbsp;''y'')<sup>''z''</sup>&nbsp;=&nbsp;''x''<sup>''z''</sup>&nbsp;·&nbsp;''y''<sup>''z''</sup>
# (''x''<sup>''y''</sup>)<sup>''z''</sup>&nbsp;=&nbsp;''x''<sup>''y''&nbsp;·&nbsp;''z''</sup>.
 
These eleven axioms, sometimes called the high school identities,<ref name="BurrisLee">Stanley Burris, Simon Lee, ''Tarski's high school identities'', [[American Mathematical Monthly]], '''100''', (1993), no.3, pp.231&ndash;236.</ref> are related to the axioms of an [[Exponential field|exponential ring]].<ref>Strictly speaking an exponential ring has an exponential function ''E'' that takes each element ''x'' to something that acts like ''a''<sup>''x''</sup> for a fixed number ''a''.  But a slight generalisation gives the axioms listed here.  The lack of axioms about additive inverses means the axioms actually describe an exponential [[Semiring|commutative semiring]].</ref> Tarski's problem then becomes: are there identities involving only addition, multiplication, and exponentiation, that are true for all positive integers, but that cannot be proved using only the axioms 1&ndash;11?
 
==Example of a provable identity==
 
Since the axioms seem to list all the basic facts about the operations in question it is not immediately obvious that there should be anything one can state using only the three operations that is not provably true. However, proving seemingly innocuous statements can require long proofs using only the above eleven axioms. Consider the following proof that (''x''&nbsp;+&nbsp;1)<sup>2</sup>&nbsp;=&nbsp;''x''<sup>2</sup>&nbsp;+&nbsp;2&nbsp;·&nbsp;''x''&nbsp;+&nbsp;1:
:(''x''&nbsp;+&nbsp;1)<sup>2</sup>
:=&nbsp;(''x''&nbsp;+&nbsp;1)<sup>1&nbsp;+&nbsp;1</sup>
:=&nbsp;(''x''&nbsp;+&nbsp;1)<sup>1</sup>&nbsp;·&nbsp;(''x''&nbsp;+&nbsp;1)<sup>1</sup>&nbsp;&nbsp;by 9.
:=&nbsp;(''x''&nbsp;+&nbsp;1)&nbsp;·&nbsp;(''x''&nbsp;+&nbsp;1)&nbsp;&nbsp;by 8.
:=&nbsp;(''x''&nbsp;+&nbsp;1)&nbsp;·&nbsp;''x''&nbsp;+&nbsp;(''x''&nbsp;+&nbsp;1)&nbsp;·&nbsp;1&nbsp;&nbsp;by 6.
:=&nbsp;''x''&nbsp;·&nbsp;(''x''&nbsp;+&nbsp;1)&nbsp;+&nbsp;''x''&nbsp;+&nbsp;1&nbsp;&nbsp;by 4. and 3.
:=&nbsp;''x''&nbsp;·&nbsp;''x''&nbsp;+&nbsp;''x''&nbsp;·&nbsp;1&nbsp;+&nbsp;''x''&nbsp;·&nbsp;1&nbsp;+&nbsp;1&nbsp;&nbsp;by 6. and 3.
:=&nbsp;''x''<sup>1</sup>&nbsp;·&nbsp;''x''<sup>1</sup>&nbsp;+&nbsp;''x''&nbsp;·&nbsp;(1&nbsp;+&nbsp;1)&nbsp;+&nbsp;1&nbsp;&nbsp;by 8. and 6.
:=&nbsp;''x''<sup>1&nbsp;+&nbsp;1</sup>&nbsp;+&nbsp;''x''&nbsp;·&nbsp;2&nbsp;+&nbsp;1&nbsp;&nbsp;by 9.
:=&nbsp;''x''<sup>2</sup>&nbsp;+&nbsp;2&nbsp;·&nbsp;''x''&nbsp;+&nbsp;1&nbsp;&nbsp;by 4.
 
Here brackets are omitted when axiom 2. tells us that there is no confusion about grouping.
 
The length of proofs is not an issue; proofs of similar identities to that above for things like (''x''&nbsp;+&nbsp;''y'')<sup>100</sup> would take a lot of lines, but would really involve little more than the above proof.
 
==History of the problem==
 
The list of eleven axioms can be found explicitly written down in the works of [[Richard Dedekind]],<ref>Richard Dedekind, ''Was sind und was sollen die Zahlen?'', 8te unveränderte Aufl. Friedr. Vieweg & Sohn, Braunschweig (1960). English translation: ''What are numbers and what should they be?'' Revised, edited, and translated from the German by [[H. A. Pogorzelski]], W.
Ryan, and W. Snyder, RIM Monographs in Mathematics, Research Institute for Mathematics, (1995).</ref> although they were obviously known and used by mathematicians long before then. Dedekind was the first, though, who seemed to be asking if these axioms were somehow sufficient to tell us everything we could want to know about the integers.  The question was put on a firm footing as a problem in logic and [[model theory]] sometime in the 1960s by Alfred Tarski,<ref name="BurrisLee"/><ref name="Gurevic">R. Gurevič, ''Equational theory of positive numbers with exponentiation'', Proc. Amer. Math. Soc. '''94''' no.1, (1985), pp.135&ndash;141.</ref> and by the 1980s it had become known as Tarski's high school algebra problem.
 
==Solution==
 
In 1980 Alex Wilkie proved that not every identity in question can be proved using the axioms above.<ref>A.J. Wilkie, ''On exponentiation &ndash; a solution to Tarski's high school algebra problem'', Connections between model theory and algebraic and analytic geometry, Quad. Mat., '''6''', Dept. Math., Seconda Univ. Napoli, Caserta, (2000), pp.107&ndash;129.</ref> He did this by explicitly finding such an identity.  By introducing new function symbols corresponding to polynomials that map positive numbers to positive numbers he proved this identity, and showed that these functions together with the eleven axioms above were both sufficient and necessary to prove it. The identity in question is
:<math>\begin{align}&\left((1+x)^y+(1+x+x^2)^y\right)^x\cdot\left((1+x^3)^x+(1+x^2+x^4)^x\right)^y\\&\quad=\left((1+x)^x+(1+x+x^2)^x\right)^y\cdot\left((1+x^3)^y+(1+x^2+x^4)^y\right)^x.\end{align}</math>
This identity is usually denoted ''W''(''x'',''y'') and is true for all positive integers ''x'' and ''y'', as can be seen by factoring <math>(1-x+x^2)^{xy}</math> out of the second terms; yet it cannot be proved true using the eleven high school axioms.
 
Intuitively, the identity cannot be proved because the high school axioms can't be used to discuss the polynomial <math>1-x+x^2</math>. Reasoning about that polynomial and the subterm <math>-x</math> requires a concept of negation or subtraction, and these are not present in the high school axioms. Lacking this, it is then impossible to use the axioms to manipulate the polynomial and prove true properties about it.  Wilkie's results from his paper show, in more formal language, that the "only gap" in the high school axioms is the inability to manipulate polynomials with negative coefficients.
 
==Generalisations==
 
Wilkie proved that there are statements about the positive integers that cannot be proved using the eleven axioms above and showed what extra information is needed before such statements can be proved. Using [[Nevanlinna theory]] it has also been proved that if one restricts the kinds of exponential one takes then the above eleven axioms are sufficient to prove every true statement.<ref>C. Ward Henson, Lee A. Rubel, ''Some applications of Nevanlinna theory to mathematical logic: Identities of exponential functions'', [[Transactions of the American Mathematical Society]], vol.282 '''1''', (1984), pp.1&ndash;32.</ref>
 
Another problem stemming from Wilkie's result that remains open is that which asks what the smallest [[Algebra (ring theory)|algebra]] is for which ''W''(''x'',&nbsp;''y'') is not true but the eleven axioms above are. In 1985 an algebra with 59 elements was found that satisfied the axioms but for which ''W''(''x'',&nbsp;''y'') was false.<ref name="Gurevic"/> Smaller such algebras have since been found, and it is now known that the smallest such one must have either 11 or 12 elements.<ref>Jian Zhang, ''Computer search for counterexamples to Wilkie's identity'', Automated Deduction – CADE-20, [[Springer Science+Business Media|Springer]] (2005), pp.441&ndash;451, {{doi|10.1007/11532231_32}}.</ref>
 
==Notes==
{{Reflist}}
 
==References==
* Stanley N. Burris, Karen A. Yeats, ''The saga of the high school identities'', [[Algebra Universalis]] '''52''' no.2&ndash;3, (2004), pp.&nbsp;325&ndash;342, {{MathSciNet | id = 2161657}}.
 
{{DEFAULTSORT:Tarski's High School Algebra Problem}}
[[Category:Universal algebra]]

Revision as of 14:41, 21 December 2012

In mathematical logic, Tarski's high school algebra problem was a question posed by Alfred Tarski. It asks whether there are identities involving addition, multiplication, and exponentiation over the positive integers that cannot be proved using eleven axioms about these operations that are taught in high school-level mathematics. The question was solved in 1980 by Alex Wilkie who showed that such unprovable identities do exist.

Statement of the problem

Tarski considered the following eleven axioms about addition ('+'), multiplication ('·'), and exponentiation to be standard axioms taught in high school:

  1. x + y = y + x
  2. (x + y) + z = x + (y + z)
  3. x · 1 = x
  4. x · y = y · x
  5. (x · y) · z = x · (y · z)
  6. x · (y + z) = x · y + x ·z
  7. 1x = 1
  8. x1 = x
  9. xy + z = xy · xz
  10. (x · y)z = xz · yz
  11. (xy)z = xy · z.

These eleven axioms, sometimes called the high school identities,[1] are related to the axioms of an exponential ring.[2] Tarski's problem then becomes: are there identities involving only addition, multiplication, and exponentiation, that are true for all positive integers, but that cannot be proved using only the axioms 1–11?

Example of a provable identity

Since the axioms seem to list all the basic facts about the operations in question it is not immediately obvious that there should be anything one can state using only the three operations that is not provably true. However, proving seemingly innocuous statements can require long proofs using only the above eleven axioms. Consider the following proof that (x + 1)2 = x2 + 2 · x + 1:

(x + 1)2
= (x + 1)1 + 1
= (x + 1)1 · (x + 1)1  by 9.
= (x + 1) · (x + 1)  by 8.
= (x + 1) · x + (x + 1) · 1  by 6.
x · (x + 1) + x + 1  by 4. and 3.
x · x + x · 1 + x · 1 + 1  by 6. and 3.
x1 · x1 + x · (1 + 1) + 1  by 8. and 6.
x1 + 1 + x · 2 + 1  by 9.
x2 + 2 · x + 1  by 4.

Here brackets are omitted when axiom 2. tells us that there is no confusion about grouping.

The length of proofs is not an issue; proofs of similar identities to that above for things like (x + y)100 would take a lot of lines, but would really involve little more than the above proof.

History of the problem

The list of eleven axioms can be found explicitly written down in the works of Richard Dedekind,[3] although they were obviously known and used by mathematicians long before then. Dedekind was the first, though, who seemed to be asking if these axioms were somehow sufficient to tell us everything we could want to know about the integers. The question was put on a firm footing as a problem in logic and model theory sometime in the 1960s by Alfred Tarski,[1][4] and by the 1980s it had become known as Tarski's high school algebra problem.

Solution

In 1980 Alex Wilkie proved that not every identity in question can be proved using the axioms above.[5] He did this by explicitly finding such an identity. By introducing new function symbols corresponding to polynomials that map positive numbers to positive numbers he proved this identity, and showed that these functions together with the eleven axioms above were both sufficient and necessary to prove it. The identity in question is

((1+x)y+(1+x+x2)y)x((1+x3)x+(1+x2+x4)x)y=((1+x)x+(1+x+x2)x)y((1+x3)y+(1+x2+x4)y)x.

This identity is usually denoted W(x,y) and is true for all positive integers x and y, as can be seen by factoring (1x+x2)xy out of the second terms; yet it cannot be proved true using the eleven high school axioms.

Intuitively, the identity cannot be proved because the high school axioms can't be used to discuss the polynomial 1x+x2. Reasoning about that polynomial and the subterm x requires a concept of negation or subtraction, and these are not present in the high school axioms. Lacking this, it is then impossible to use the axioms to manipulate the polynomial and prove true properties about it. Wilkie's results from his paper show, in more formal language, that the "only gap" in the high school axioms is the inability to manipulate polynomials with negative coefficients.

Generalisations

Wilkie proved that there are statements about the positive integers that cannot be proved using the eleven axioms above and showed what extra information is needed before such statements can be proved. Using Nevanlinna theory it has also been proved that if one restricts the kinds of exponential one takes then the above eleven axioms are sufficient to prove every true statement.[6]

Another problem stemming from Wilkie's result that remains open is that which asks what the smallest algebra is for which W(xy) is not true but the eleven axioms above are. In 1985 an algebra with 59 elements was found that satisfied the axioms but for which W(xy) was false.[4] Smaller such algebras have since been found, and it is now known that the smallest such one must have either 11 or 12 elements.[7]

Notes

43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.

References

  1. 1.0 1.1 Stanley Burris, Simon Lee, Tarski's high school identities, American Mathematical Monthly, 100, (1993), no.3, pp.231–236.
  2. Strictly speaking an exponential ring has an exponential function E that takes each element x to something that acts like ax for a fixed number a. But a slight generalisation gives the axioms listed here. The lack of axioms about additive inverses means the axioms actually describe an exponential commutative semiring.
  3. Richard Dedekind, Was sind und was sollen die Zahlen?, 8te unveränderte Aufl. Friedr. Vieweg & Sohn, Braunschweig (1960). English translation: What are numbers and what should they be? Revised, edited, and translated from the German by H. A. Pogorzelski, W. Ryan, and W. Snyder, RIM Monographs in Mathematics, Research Institute for Mathematics, (1995).
  4. 4.0 4.1 R. Gurevič, Equational theory of positive numbers with exponentiation, Proc. Amer. Math. Soc. 94 no.1, (1985), pp.135–141.
  5. A.J. Wilkie, On exponentiation – a solution to Tarski's high school algebra problem, Connections between model theory and algebraic and analytic geometry, Quad. Mat., 6, Dept. Math., Seconda Univ. Napoli, Caserta, (2000), pp.107–129.
  6. C. Ward Henson, Lee A. Rubel, Some applications of Nevanlinna theory to mathematical logic: Identities of exponential functions, Transactions of the American Mathematical Society, vol.282 1, (1984), pp.1–32.
  7. Jian Zhang, Computer search for counterexamples to Wilkie's identity, Automated Deduction – CADE-20, Springer (2005), pp.441–451, 21 year-old Glazier James Grippo from Edam, enjoys hang gliding, industrial property developers in singapore developers in singapore and camping. Finds the entire world an motivating place we have spent 4 months at Alejandro de Humboldt National Park..