Física (fisica.sty) Table 1: Nomenclatura \ra \to aa \usaa \hb \S. \boldoverdot Re \re Im \im a \lrd \lrp C \CC IR \RR \square \btd \triangle \hexagon \ / \pentagon \bull spontaneous symmetry breaking vacuum expectation value irreducible representation left hand side right hand side tr det Tr Det < > MS DR s αs tan β BR Branching Ratio SU(2) L SU(2) R U(1) B L SU(2) L SU(2) R SU(2) L U(1) Y Standard Model λ phys L eff α phys m phys s w c w cos θ sin θ t w m Z Z m t m W \ssb \\ \vevt \\ \irrep \\ \lhs \\ \rhs \\ \tr \ \det \ \Tr \ \Det \\ $\gl$ \ $\ms$ \ $\dr$ \\ \rs \ \as \ \tanb \\ \BR \ \BRl \\ $\ssu$ \\ $\sul$ $\sur$ \\ $\sulu$ \\ \sm \ $\lp$ \ $\leff$\\ $\aph$ $\mph$ $\sw$ \\ $\cw$ $\c$ $\s$ $\tw$ \\ $\mz$ \ $\ZPP$ \ $\mt$ $\mw$ Puntos ( ),..., ( ), ( ), ( ), ( ), ( ) \dashes, \dots, \\ \daashdash, \\ \dotdash, \dotdotdash, \\ \dotdashdotdotdash, \dotdotdashdash Unidades 1
ev, kev, MeV, GeV, TeV, mm, cm, km,, gr, kg, pb, pb 1 yr 1, fb 1, pb 1 $\ev, \kev, \mev, \gev, \tev $, \\ $\milm, \cm, \m, \km, \gr, \kg $, \\ $\pbarn, \lumun, \ifb, \ipb $ Heavy math users ( a b ) c d cinco 2 f x y 2 1 f x P m n r $\mat{a}{b}{c}{d}$ $P\low{m} \ \m{r}{n}$\\ $\square{\mathchoice\sqr54\sqr54\sqr33\sqr23}$ \\ $\anti{cinco}$ \ $\partder{f}{x}$ \\ $\secder{f}{x}{y}$ \ \partt \\ $\sqr{3}{2}$ \ $\stackunder{1}{2}$ ( f x a AB U D ) (1) \matr{cc} \tila a & AB_{\dis U} \\ \partder{f}{x} & D \ematr Letras con slash s/ p/ /t /u /E \slasha{s} \slashb{p} \FMslash{t} \FMSlash{u} \miss{e} a/ / a/ b/ c/ d/ /q /D \slash{a} \slpar \sla \slb \slc \sld \lnq \sld /A / / /λ r/ /p /k /K < > < > \sla \slp \nsl \slla \slr \lnp \lnk \lnk \fletxeta \ltwid \gl \gtwid Parentesis de Dirac 2
Table 2: Muestras de defs personales h 0 \hl H 0 \hh A 0 \ha m h 0 \mhl m H 0 \mhh m A 0 \mha H ± \hpm m H ± \mhpm e + e \epem l + l \lplm µ + µ \mupmum µν \mn γ \gam δφ \dphi τ + \taup τ \taum W \wm W + \wp M ++ \mpp M \mmm M + \mmp A \asym L \lum A1 \asymi dl γγ \dlgg A 1 max \aimax t t \ttbar b b \bbbar γγ \gamgam q q γ \qqg W + W \WW t W + b \twbdec t W b \tbwbdec e + e Z HZ \hprod t \tbar b \bbar H t t \hdec t t W + W b b \ttbardec W + W b b \wwbb Φ1 \pot Φ 1 \pod Φ 2 \pht Φ 2 \phtd Φ2 \phtt Φ 2Φ 2 \phtpt W \w Z \z b \b t \t pp \ppbar E T \et /E T \misset /E \misse p T \pt [ \lbr ] \rbr /D / v 2 v i j f g 1 2 3 v s a b [a, b] y (e) [w] {r} B t $ \dsl \ \delsl \ \absq{v}$ \\ $\abs{v} \ \bra{i} \ \ket{j}$ \\ $\bracket{f}{g} \ \EV{1}{2}{3} \ \vev{v}$ \\ $\bfm{s} \ \bfrac {a}{b} \ \com{a}{b}$ \\ $\pep{y} \ \pap{e} \ \bab{w}$ \\ 3 $\cac{r} \ \undertilde{\rm B}$ \\ $\undertilde{t}$
Varios encuentro dificil creer que esto este encuadrado! \boxtext{encuentro dificil \\ creer que esto este encuadrado!} c \lrover{c} \bentarrow \longbent \onedk{h}{he} \dk{p}{eh}{bb} \dkp{ep}{xh}{x}{ff} \bothdk{ep}{exh}{e ff}{y}{w} H He (2) p eh bb (3) ep XHX ff (4) ep exhef f Y (5) W 4
Títulos de revistas (refs.sty) Ann.Phys.(NY )76(88)3, ActaPhys.Polon.B76(88)3, Ann.Rev.Nucl.Part.Sci.76(88)4 Commun.Math.Phys.76(88)3, Comm.Nucl.Part.Phys.76(88)5, Fortschr.Phys.76(88)3, JournalEurophys.Lett.76(88)6 ibid.76(88)7, Nature76(88)8, Int.J.Mod.Phys.A76(88)3, SovietPhys, JETP 76(88)3, J.Math.Phys.76(88)3, J.Prog.Part.Nucl.Phys.76(88)3, Lett.Math.Phys.76(88)3, Mod.Phys.Lett.A76(88)3, Nature76(88)3, NuovoCim.76(88)3, Nucl.Phys.B(Proc.Suppl.)76(88)3, Nucl.Phys.76(88)3, Prog.Part.Nucl.Phys.76(88)3, Phys.Lett.76(88)9 Phys.Rev.76(88)3, Phys.Rep.76(88)3, Phys.Rev.Lett.76(88)3, Prog.Theor.Phys.76(88)3, Prog.Theor.Phys.Suppl.76(88)3, ParticleWorld 76(88)3, Rep.onProg.inPhys.76(88)3, Rev.Mod.Phys.76(88)3, Riv.del NuovoCim.76(88)3, Science76(88)3, Sov.J.Nucl.Phys.76(88)3, Sov.Phys. Usp.76(88)3, Usp.Fiz.Naut.76(88)3, Yad.Fiz.76(88)3, Zeit.furPhysik 76(88)3, Z.Physik 76(88)3, Z.Eksp.Teor.Fiz.76(88)3, Z.Eksp.Teor.Fiz.Pisma.Red.76(88)3, $\ap{76}{88}{ 3}$, \\ $\app{76}{88}{ 3}$, \\ $\arnps{76}{88}{ 4}$ \\ $\CMP{76}{88}{ 3}$, \\ $\cnpp{76}{88}{ 5}$, \\ $\fp{76}{88}{ 3}$, \\ $\jel{76}{88}{ 6}$ \\ $\ib{76}{88}{7}$, $\nat{76}{88}{8}$, \\ $\ijmp{76}{88}{ 3}$, \\ $\jetp{76}{88}{ 3}$, \\ $\JMP{76}{88}{ 3}$, \\ $\jppnp{76}{88}{ 3}$, \\ $\LMP{76}{88}{ 3}$, \\ $\mpl{76}{88}{ 3}$, \\ $\nat{76}{88}{ 3}$, \\ $\n.c.{76}{88}{ 3}$, \\ $\nps{76}{88}{ 3}$, \\ $\np{76}{88}{ 3}$, \\ $\ppnp{76}{88}{ 3}$, \\ $\pl{76}{88}{9}$ $\pr{76}{88}{ 3}$, \\ $\prep{76}{88}{ 3}$, \\ $\prl{76}{88}{ 3}$, \\ $\ptp{76}{88}{ 3}$, \\ $\ptps{76}{88}{ 3}$, \\ $\pw{76}{88}{ 3}$, \\ $\rpp{76}{88}{ 3}$, \\ $\rmp{76}{88}{ 3}$, \\ $\r.n.c.{76}{88}{ 3}$, \\ $\Sci{76}{88}{ 3}$, \\ $\sjnp{76}{88}{ 3}$, \\ $\sp{76}{88}{ 3}$, \\ $\ufn{76}{88}{ 3}$, \\ $\yf{76}{88}{ 3}$, \\ $\zp{76}{88}{ 3}$, \\ $\Zp{76}{88}{ 3}$, \\ $\zetf{76}{88}{ 3}$, \\ $\zetfpr{76}{88}{ 3}$, 5
these proceedings in preparation private communication op. cit. JOJO 76 88 3 EL mio, JMHL, 76 88, 3 EL mio, 76 \tp \\ \ip \\ \pc \ \opc \\ \artref{jojo}{76}{88}{ 3} \\ \cartref{el mio}{jmhl}{76}{88}{ 3} \\ \bookref{el mio}{76} a a 1 b b 1 c c 1 \begin{displaymath} \left\{ \begin{array}{ll} a & \textrm{a}{\scriptstyle {}_1} \\ b & \textrm{b}{\displaystyle {}_1} \\ c & \textrm{c}{}_1 \end{array} \right \end{displaymath} [ i n n 2 =? d da/db c/ d 2 f/ g h A s T d 1 2 (m n ) (n m ) $\dif \ \deriv{a}{b} \ \derpar{c}{d} $ \\ $\dderpar{f}{g}{h} \ A\presup{s}$ \\ $T\presub{d} \ \restric{1}{2}$ \\ $(\relstack{m}{n})$ \ $(\invstackrel{m}{n})$ \ie \cf \ibid \etal \eg \etc \via \hb \it i.e. \it cf. \it ibid. \it et.al. \it e.g. \it etc. \it via \hfill\break (1) Ā ˆp /Nota que es una nota /Nota que es una nota \bref{uno} \ $\agh{a}$ \ $\Op{p}$ \\ \nota{nota que es una nota} \\ \notp{nota que es una nota} 6
\nota[1] \makebox[0pt]{\,\,\,\,\,/}#1 \notp[1] \makebox[0pt]{\,\,\,\,/}#1 \noi \noindent \nn \nonumber \bc \begin{center} \ec \end{center} \be \begin{equation} \ee \end{equation} \bef \begin{figure} \eef \end{figure} \bet \begin{table} \eet \end{table} (def.sty) \bea \begin{eqnarray} \eea \end{eqnarray} \ba \begin{array} \ea \end{array} \beqd \begin{displaymath} \eeqd \end{displaymath} \btabu \begin{tabular} \etabu \end{tabular} \bi \begin{itemize} \ei \end{itemize} \ben \begin{enumerate} \een \end{enumerate} \nl \nextline \cl \centerline \vs \vskip \hs \hskip \ss \smallskip \ms \medskip \bsk \bigskip \br \break \itb \item{$\bullet$} \half \frac{1}{2}} \\ \eps \epsilon \mvec#1 \bold{#1} \\ \neg#1 \rlap/#1 \dfrac#1#2 \ifmath{{\displaystyle {#1 \over #2}}} \tint \textstyle \int \\ \tsum \mathop{\textstyle \sum } 7