Este documento contiene varias citas sobre la amistad y el apoyo. Algunas de las citas recomiendan escuchar a personas exitosas y crear un buen grupo de apoyo. Otras citas enfatizan que ya somos perfectos tal como somos, que un amigo es un alma que vive en dos cuerpos, y que un abrazo vale más que mil palabras. El documento termina deseando felices fiestas y enviando los mejores deseos.
Парадоксът на Скулем и квантовата информация. Относителност на пълнота по ГьоделVasil Penchev
In 1992, Thoralf Skolem introduced the tenn of «relativity» as to infinity от set theory. Не
demonstrated Ьу Zermelo 's axiomatics 01' set theory (incl. the axiom of choice) that there exist
lInintended interpretations of anу infinite set. ТЬе very notion of set was also «relative». We сan apply
his argurnentation to Gбdеl's incompleteness theorems as well as to his completeness theorem (1930).
Then both the incompleteness of Реапо arithmetic and the completel1ess of first-order logic tum out to
ье also «relative» in Skolem 's sense. Skolem 's «relativity» argumentation of that kind сan ье applied
to а уету wide range of problems and сan ье spoken of the relativity of discreteness and continuity,
of fil1iteness and infinity, of Cantor 's kinds of infinities, etc. The relativity of Skolemian type helps
us for generaIizing Einstein 's principle of relativity from the invarial1ce of the physical laws toward
diffeomorphisms to their invariance toward anу morphisms (including and especiaIly the discrete ones).
Such а kind of generalization from diffeomorphisms (,>,Ihen the notion of velocity always makes sense)
to anу kind of morphism (when 'velocity' тау от тау not make sense) is an extension of the general
Skolemian type оГ relativity between discreteness and continuity от between finiteness and infinity.
Particularly, Lorentz invariance gains constrained vaIidity, becallse the уету notion ofvelocity is limited
to diffeomorphisms. [п the case of entanglement, the physical interaction is discrete. 'Velocity' and
consequently 'Lorentz invariance' do not make sense. Тhat is the simplest explanation ofthe argurnent
EPR, which tums into а paradox оnJу if the universal validity of 'velocity' and 'Lогелtz invariance'
is implicitly accepted. Correspondingly, а тоте generaI class oftopologies is to ье considered, including
discrete от inseparable kinds.
Парадоксът на Скулем и квантовата информация. Относителност на пълнота по ГьоделVasil Penchev
In 1992, Thoralf Skolem introduced the tenn of «relativity» as to infinity от set theory. Не
demonstrated Ьу Zermelo 's axiomatics 01' set theory (incl. the axiom of choice) that there exist
lInintended interpretations of anу infinite set. ТЬе very notion of set was also «relative». We сan apply
his argurnentation to Gбdеl's incompleteness theorems as well as to his completeness theorem (1930).
Then both the incompleteness of Реапо arithmetic and the completel1ess of first-order logic tum out to
ье also «relative» in Skolem 's sense. Skolem 's «relativity» argumentation of that kind сan ье applied
to а уету wide range of problems and сan ье spoken of the relativity of discreteness and continuity,
of fil1iteness and infinity, of Cantor 's kinds of infinities, etc. The relativity of Skolemian type helps
us for generaIizing Einstein 's principle of relativity from the invarial1ce of the physical laws toward
diffeomorphisms to their invariance toward anу morphisms (including and especiaIly the discrete ones).
Such а kind of generalization from diffeomorphisms (,>,Ihen the notion of velocity always makes sense)
to anу kind of morphism (when 'velocity' тау от тау not make sense) is an extension of the general
Skolemian type оГ relativity between discreteness and continuity от between finiteness and infinity.
Particularly, Lorentz invariance gains constrained vaIidity, becallse the уету notion ofvelocity is limited
to diffeomorphisms. [п the case of entanglement, the physical interaction is discrete. 'Velocity' and
consequently 'Lorentz invariance' do not make sense. Тhat is the simplest explanation ofthe argurnent
EPR, which tums into а paradox оnJу if the universal validity of 'velocity' and 'Lогелtz invariance'
is implicitly accepted. Correspondingly, а тоте generaI class oftopologies is to ье considered, including
discrete от inseparable kinds.
Portafolio final comunicación y expresión ll - ivan alarcon .pptxivandavidalarconcata
Los muros paramétricos son una herramienta poderosa en el diseño arquitectónico que ofrece diversas ventajas, tanto en el proceso creativo como en la ejecución del proyecto.
2. Si vas a escuchar a la
gente, escucha a los
triunfadores. Escucha a las
personas que saben lo que
hacen y que demuestran el
valor de lo que hacen. ( Louise
Hay)
3.
4. Lo se muy bien, lo sabes tú,
siempre estaré cerca de tu
lado…..
5.
6. Créate un buen grupo de
apoyo, especialmente para
cuando no quieras hacer
algo. Ellos te ayudarán a
crecer. ( Louise Hay)
No importa que sean un poco extraños…….
7.
8. Si planta una semilla de
amistad, recogerá un ramo de
felicidad. (Lois L. Kaufman)
9.
10. Si esperamos a ser perfectos
para amarnos a nosotros
mismos, perderemos la vida
entera. Ya somos
perfectos, aquí y ahora.
( Louise Hay)
11.
12. ¿Qué es un amigo? Es un único
alma que vive en dos cuerpos.
(Aristóteles)
A veces hasta en mas ….
13.
14. Un abrazo vale mil palabras. Un
amigo más.
Y un abrazo puede venir de quien menos lo esperas….