Two Body Decay Vertices(46)

$\Delta[2000][+1]^+$ Two Body Decay Vertices(46)

There are 46 vertices in this part

Vertex 47: $\gamma^{0}_{\gamma }~({p_3})~-N[1675]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{47}=g~(-\gamma_5{\hat {p_3}}\gamma_\gamma {p_3}_\mu {p_3}... ...+\gamma_5{p_3}_\alpha g_{\mu , \gamma }g_{\nu ,\beta }f_{1366}i) \end{eqnarray*}$

Vertex 48: $\Delta[2000][+1]^-({p_1})~-N[1675]^+({p_2})~-\gamma^{0}_{\gamma }~({p_3})~$

$\begin{eqnarray*} &V_{48}=g~(\gamma_5{\hat {p_3}}\gamma_\gamma {p_3}_\mu {p_3}_... ...-\gamma_5{p_3}_\alpha g_{\mu ,\gamma } g_{\nu ,\beta }f_{1366}i) \end{eqnarray*}$

Vertex 49: $\gamma^{0}_{\gamma }~({p_3})~-N[1680]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{49}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...-\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1358}i) \end{eqnarray*}$

Vertex 50: $\Delta[2000][+1]^-({p_1})~-N[1680]^+({p_2})~-\gamma^{0}_{\gamma }~({p_3})~$

$\begin{eqnarray*} &V_{50}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...+\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1358}i) \end{eqnarray*}$

Vertex 51: $\gamma^{0}_{\gamma }~({p_3})~-N[2000]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{51}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...-\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1351}i) \end{eqnarray*}$

Vertex 52: $\Delta[2000][+1]^-({p_1})~-N[2000]^+({p_2})~-\gamma^{0}_{\gamma }~({p_3})~$

$\begin{eqnarray*} &V_{52}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...+\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1351}i) \end{eqnarray*}$

Vertex 53: $\gamma^{0}_{\gamma }~({p_3})~-\Delta[1905][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{53}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...-\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1344}i) \end{eqnarray*}$

Vertex 54: $\Delta[2000][+1]^-({p_1})~-\Delta[1905][+1]^+({p_2})~-\gamma^{0} _{\gamma }~({p_3})~$

$\begin{eqnarray*} &V_{54}=g~({p_3}_\mu {p_3}_\nu {p_3}_\beta g_{\alpha ,\gamma ... ...+\gamma_ \gamma {p_3}_\mu {p_3}_\alpha g_{\nu ,\beta }f_{1344}i) \end{eqnarray*}$

Vertex 55: $\gamma^{0}_{\gamma }~({p_3})~-\Delta[1930][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{55}=g~(-\gamma_5{\hat {p_3}}\gamma_\gamma {p_3}_\mu {p_3}... ...+\gamma_5{p_3}_\alpha g_{\mu , \gamma }g_{\nu ,\beta }f_{1338}i) \end{eqnarray*}$

Vertex 56: $\Delta[2000][+1]^-({p_1})~-\Delta[1930][+1]^+({p_2})~-\gamma^{0} _{\gamma }~({p_3})~$

$\begin{eqnarray*} &V_{56}=g~(\gamma_5{\hat {p_3}}\gamma_\gamma {p_3}_\mu {p_3}_... ...-\gamma_5{p_3}_\alpha g_{\mu ,\gamma } g_{\nu ,\beta }f_{1338}i) \end{eqnarray*}$

Vertex 57: $\gamma^{0}_{\beta }~({p_3})~-N[1520]^-({p_2})~-\Delta[2000][+1]^+ ({p_1})~$

$\begin{eqnarray*} &V_{57}=g~(-{p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{966}i- \... ...alpha f_{967}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha }f_{964}i) \end{eqnarray*}$

Vertex 58: $\Delta[2000][+1]^-({p_1})~-N[1520]^+({p_2})~-\gamma^{0}_{\beta }~ ({p_3})~$

$\begin{eqnarray*} &V_{58}=g~({p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{966}i+ \s... ...alpha f_{967}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha } f_{964}i) \end{eqnarray*}$

Vertex 59: $\gamma^{0}_{\beta }~({p_3})~-N[1700]^-({p_2})~-\Delta[2000][+1]^+ ({p_1})~$

$\begin{eqnarray*} &V_{59}=g~(-{p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{961}i- \... ...alpha f_{962}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha }f_{959}i) \end{eqnarray*}$

Vertex 60: $\Delta[2000][+1]^-({p_1})~-N[1700]^+({p_2})~-\gamma^{0}_{\beta }~ ({p_3})~$

$\begin{eqnarray*} &V_{60}=g~({p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{961}i+ \s... ...alpha f_{962}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha } f_{959}i) \end{eqnarray*}$

Vertex 61: $\gamma^{0}_{\beta }~({p_3})~-N[1720]^-({p_2})~-\Delta[2000][+1]^+ ({p_1})~$

$\begin{eqnarray*} &V_{61}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{956}i) \end{eqnarray*}$

Vertex 62: $\Delta[2000][+1]^-({p_1})~-N[1720]^+({p_2})~-\gamma^{0}_{\beta }~ ({p_3})~$

$\begin{eqnarray*} &V_{62}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{956}i) \end{eqnarray*}$

Vertex 63: $\gamma^{0}_{\beta }~({p_3})~-N[1900]^-({p_2})~-\Delta[2000][+1]^+ ({p_1})~$

$\begin{eqnarray*} &V_{63}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{951}i) \end{eqnarray*}$

Vertex 64: $\Delta[2000][+1]^-({p_1})~-N[1900]^+({p_2})~-\gamma^{0}_{\beta }~ ({p_3})~$

$\begin{eqnarray*} &V_{64}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{951}i) \end{eqnarray*}$

Vertex 65: $\gamma^{0}_{\beta }~({p_3})~-\Delta[1232][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{65}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{941}i) \end{eqnarray*}$

Vertex 66: $\Delta[2000][+1]^-({p_1})~-\Delta[1232][+1]^+({p_2})~-\gamma^{0} _{\beta }~({p_3})~$

$\begin{eqnarray*} &V_{66}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{941}i) \end{eqnarray*}$

Vertex 67: $\gamma^{0}_{\beta }~({p_3})~-\Delta[1600][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{67}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{936}i) \end{eqnarray*}$

Vertex 68: $\Delta[2000][+1]^-({p_1})~-\Delta[1600][+1]^+({p_2})~-\gamma^{0} _{\beta }~({p_3})~$

$\begin{eqnarray*} &V_{68}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{936}i) \end{eqnarray*}$

Vertex 69: $\gamma^{0}_{\beta }~({p_3})~-\Delta[1700][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{69}=g~(-{p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{931}i- \... ...alpha f_{932}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha }f_{929}i) \end{eqnarray*}$

Vertex 70: $\Delta[2000][+1]^-({p_1})~-\Delta[1700][+1]^+({p_2})~-\gamma^{0} _{\beta }~({p_3})~$

$\begin{eqnarray*} &V_{70}=g~({p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{931}i+ \s... ...alpha f_{932}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha } f_{929}i) \end{eqnarray*}$

Vertex 71: $\gamma^{0}_{\beta }~({p_3})~-\Delta[1920][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{71}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{926}i) \end{eqnarray*}$

Vertex 72: $\Delta[2000][+1]^-({p_1})~-\Delta[1920][+1]^+({p_2})~-\gamma^{0} _{\beta }~({p_3})~$

$\begin{eqnarray*} &V_{72}=g~(\gamma_5{\hat {p_3}}\gamma_\beta {p_3}_\mu {p_3}_\... ... \sqrt{{p_2}^2}\gamma_5 g_{\mu ,\beta }g_{\nu ,\alpha }f_{926}i) \end{eqnarray*}$

Vertex 73: $\gamma^{0}_{\beta }~({p_3})~-\Delta[1940][+1]^-({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{73}=g~(-{p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{921}i- \... ...alpha f_{922}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha }f_{919}i) \end{eqnarray*}$

Vertex 74: $\Delta[2000][+1]^-({p_1})~-\Delta[1940][+1]^+({p_2})~-\gamma^{0} _{\beta }~({p_3})~$

$\begin{eqnarray*} &V_{74}=g~({p_3}_\mu {p_3}_\nu g_{\alpha ,\beta }f_{921}i+ \s... ...alpha f_{922}i+\gamma_\beta {p_3}_\mu g_{\nu ,\alpha } f_{919}i) \end{eqnarray*}$

Vertex 75: $\gamma^{0}_{\alpha }~({p_3})~-\overline{P}({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{75}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{498}i-... ...3}_\nu f_{497} \\ &- \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{498}i) \end{eqnarray*}$

Vertex 76: $\Delta[2000][+1]^-({p_1})~-P({p_2})~-\gamma^{0}_{\alpha }~({p_3} )~$

$\begin{eqnarray*} &V_{76}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{498}i-... ...3}_\nu f_{497} \\ &+ \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{498}i) \end{eqnarray*}$

Vertex 77: $\gamma^{0}_{\alpha }~({p_3})~-\overline{N[1440]}({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{77}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{493}i-... ...3}_\nu f_{492} \\ &- \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{493}i) \end{eqnarray*}$

Vertex 78: $\Delta[2000][+1]^-({p_1})~-N[1440]({p_2})~-\gamma^{0}_{\alpha }~( {p_3})~$

$\begin{eqnarray*} &V_{78}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{493}i-... ...3}_\nu f_{492} \\ &+ \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{493}i) \end{eqnarray*}$

Vertex 79: $\gamma^{0}_{\alpha }~({p_3})~-\overline{N[1535]}({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{79}=g~(-\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}... ...\\ &- \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{490}i) \end{eqnarray*}$

Vertex 80: $\Delta[2000][+1]^-({p_1})~-N[1535]({p_2})~-\gamma^{0}_{\alpha }~( {p_3})~$

$\begin{eqnarray*} &V_{80}=g~(\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}_... ...\\ &+ \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{490}i) \end{eqnarray*}$

Vertex 81: $\gamma^{0}_{\alpha }~({p_3})~-\overline{N[1650]}({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{81}=g~(-\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}... ...\\ &- \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{488}i) \end{eqnarray*}$

Vertex 82: $\Delta[2000][+1]^-({p_1})~-N[1650]({p_2})~-\gamma^{0}_{\alpha }~( {p_3})~$

$\begin{eqnarray*} &V_{82}=g~(\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}_... ...\\ &+ \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{488}i) \end{eqnarray*}$

Vertex 83: $\gamma^{0}_{\alpha }~({p_3})~-\overline{N[1710]}({p_2})~- \Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{83}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{487}i-... ...3}_\nu f_{486} \\ &- \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{487}i) \end{eqnarray*}$

Vertex 84: $\Delta[2000][+1]^-({p_1})~-N[1710]({p_2})~-\gamma^{0}_{\alpha }~( {p_3})~$

$\begin{eqnarray*} &V_{84}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{487}i-... ...3}_\nu f_{486} \\ &+ \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{487}i) \end{eqnarray*}$

Vertex 85: $\gamma^{0}_{\alpha }~({p_3})~-\overline{\Delta[1620][+1]}({p_2})~ -\Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{85}=g~(-\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}... ...\\ &- \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{480}i) \end{eqnarray*}$

Vertex 86: $\Delta[2000][+1]^-({p_1})~-\Delta[1620][+1]({p_2})~-\gamma^{0}_{ \alpha }~({p_3})~$

$\begin{eqnarray*} &V_{86}=g~(\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}_... ...\\ &+ \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{480}i) \end{eqnarray*}$

Vertex 87: $\gamma^{0}_{\alpha }~({p_3})~-\overline{\Delta[1750][+1]}({p_2})~ -\Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{87}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{479}i-... ...3}_\nu f_{478} \\ &- \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{479}i) \end{eqnarray*}$

Vertex 88: $\Delta[2000][+1]^-({p_1})~-\Delta[1750][+1]({p_2})~-\gamma^{0}_{ \alpha }~({p_3})~$

$\begin{eqnarray*} &V_{88}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{479}i-... ...3}_\nu f_{478} \\ &+ \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{479}i) \end{eqnarray*}$

Vertex 89: $\gamma^{0}_{\alpha }~({p_3})~-\overline{\Delta[1900][+1]}({p_2})~ -\Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{89}=g~(-\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}... ...\\ &- \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{476}i) \end{eqnarray*}$

Vertex 90: $\Delta[2000][+1]^-({p_1})~-\Delta[1900][+1]({p_2})~-\gamma^{0}_{ \alpha }~({p_3})~$

$\begin{eqnarray*} &V_{90}=g~(\gamma_5{\hat {p_3}}\gamma_\alpha {p_3}_\mu {p_3}_... ...\\ &+ \sqrt{{p_2}^2}\gamma_5{p_3}_\nu g_{\mu ,\alpha } f_{476}i) \end{eqnarray*}$

Vertex 91: $\gamma^{0}_{\alpha }~({p_3})~-\overline{\Delta[1910][+1]}({p_2})~ -\Delta[2000][+1]^+({p_1})~$

$\begin{eqnarray*} &V_{91}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{475}i-... ...3}_\nu f_{474} \\ &- \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{475}i) \end{eqnarray*}$

Vertex 92: $\Delta[2000][+1]^-({p_1})~-\Delta[1910][+1]({p_2})~-\gamma^{0}_{ \alpha }~({p_3})~$

$\begin{eqnarray*} &V_{92}=g~( \sqrt{{p_1}^2}{p_3}_\nu g_{\mu ,\alpha }f_{475}i-... ...3}_\nu f_{474} \\ &+ \gamma_\alpha {p_3}_\mu {p_3}_\nu f_{475}i) \end{eqnarray*}$