The Baryon octet-vector meson interaction and dynamically generated

resonances in the S=0 sector Bao-Xi SUN (孙宝玺 ) Beijing University of Technology Hirschegg 2014 Hadrons from Quarks and Gluons, Jan. 12-18, 2014

Content1. Vector meson-baryon decuplet interaction S. Sarkar, B. -X. Sun, E. Oset, M. J. Vicente

Vacas, EPJA 44: 431 (2010).2. Vector meson-baryon octet interaction E. Oset, A. Ramos, EPJA 44: 445 (2010).3. Vector meson-baryon octet interaction K. P. Khemchandani, H. Kaneko, H. Nagahiro, A.

Hosaka, PRD 83:114041 (2011)4. My present work on Vector meson-baryon octet

interaction

Lippman-Schwinger EqutionWith a kernel of effective interaction, we can solve the LS equation. The amplitude satisfies the unitary relation exactly, and the properties of hadronic resonances generated dynamically can be obtained. These resonances do not appear in the effective Lagrangian density.

1[1 ]T V VGT VG V

Hidden-gauge symmetry• In order to construct the vector meson-baryon

octet interaction Largrangian density, we consider the SU(3) flavor local gauge symmetry neglecting the mass term, and then we obtain

,L g B V B B B V

Vector-vector Interaction

Vector octet-baryon decuplet interaction

• Now I will discuss the interaction between vector mesons and baryon decuplet in the chiral unitary approach. Because the interaction Lagrangian is not known, we will try to obtain the vector octet –baryon decuplet interaction potentials by comparing the pseudoscalar meson – baryon decuplet interaction.

Interaction Vertex• When the momentum transfer is far less than the mass of the

vector meson in the propagator, we can neglect the square of the momentum in the propagator. Therefore the t-channel interaction between vector meson and baryon is obtained:

u-channel and s-channel

• We neglected the contribution from s-channel and u-channel interaction since we thought their effects are trivial at that time.

Vector meson – baryon loop function in the dimensional regularization scheme

Vector meson-baryon loop function accounting for the width of the intermediate states

S. Sarkar, B. X. Sun, E.Oset et al., EPJA 44, 431 (2010)

S. Sarkar, B. X. Sun, E.Oset et al., EPJA 44, 431 (2010)

• Ten resonances in the different strangeness and isospin channels. Degenerate in JP=1/2-, 3/2-, 5/2-.

Vector-baryon octet interaction• E. Oset and A. Ramos, EPJA 44, 445 (2010).

Tensor coupling between vector meson and baryon octet

• K. P. Khemchandani, H. Kaneko, H. Nagahiro and A. Hosaka, PRD 83, 114041 (2011). In this article, a tensor coupling term between vector meson and baryon octet

is added, which is relevant to the magnetic moments of the baryons, and is also gauge invariant.

K. P. Khemchandani et al.,PRD 83, 114041 (2011)

K. P. Khemchandani et al.,PRD 83, 114041 (2011)

• In addition to t-channel, the s-channel,u-channel and contact interaction are taken into account, and a non-relativistic interaction potential between vector meson and baryon octet with strangeness S=0 is obtained.

• When u-channel and s-channel are taken into account, the hadronic resonances generated dynamically with different spins are not degenerate again.

Results for Strangeness S=0• S=0 K. P. Khemchandani et al.,PRD 83, 114041 (2011)

• I=1/2, S=0, E. Oset and A. Ramos, EPJA 44, 445 (2010).

SU(3) vector –baryon interaction

• The SU(3) generalized form of the vector meson baryon interaction Lagrangian can be written as

Mixing of the vector octet and singlet

• In order to obtain the right couplings for the physical omega meson and phi meson, we need to consider the mixing of their octet and singlet components.

Vector meson-baryon-baryon vertices

• The Lagrangian related to the s-, u-, t-channel interactions is explicitly written as

• Moreover, the contact term between the vector meson and the baryon can be obtained from

t- channel interaction

• If the momentum of the initial meson is similar to that of the final vector meson, i.e., q_2~q_1, the momentum transfer k=q_2-q_1 is trivial null approximately, and then the t- channel interaction can be written as

BBV vertex

The vertex of two baryons and a vector meson

and the coupling constants g_1 and g_2 are different for different baryons and meson, these coupling constant can be obtained from SU(3) symmetry.

t-channel supplement

• However, if the difference between q_2 and q_1 is taken into account, an additional term should be supplemented in the t- channel of the baryon and meson interaction.

u- , s- channel interactions

• The u- channel and s- channel interactions between the baryon and the vector meson can be written as

Contact term

• The contact interaction between baryons and mesons is written as

• Of course, the coupling constant can be obtained from SU(3) symmetry.

Total potentials • the total kernel of the vector meson- baryon

octet interaction is a summation of the t-, s-, u- channels and contact term, which is functions of the total energy in the center of mass system and the scattering angleθ.

• Moreover, we should emphasize that we have not made any approximation to obtain of the vector meson-baryon octet potential.

Lippman-Schwinger Equation

• The relativistic coupling-channel Lippman-Schwinger equation is written as

with a loop function in the on-shell factorization approach

S-wave approxiamtion

• the amplitude T can be expanded in a series of Legendre polynomials

with the coefficient

• In the S-wave approximation, only the T_0 is calculated for different channels.

I=1/2,S=0,J=1/2 channels

Pole positions and couplings

I=1/2,S=0,J=3/2,J_z=1/2 channels

Pole positions and couplings

I=3/2, S=0, J=1/2 Channels

Pole positions and couplings

I=3/2, S=0, J=3/2, J_z=1/2 channels

Summary 1• 1. 14 poles are found in the complex total

energy plane for the channel with strangeness zero S=0, and the couplings to baryons and vector mesons are also calculated. Their PDG counterparts are discussed.

• 2. The spin of the dynamically generated resonances are determined, and the spin of the resonance is not degenerate again.

• 3. The contact term plays an important role.

Scattering angle θ=0

• The forward scattering amplitude are the same as each other when the orientation of the total spin takes inverse values, which is easy to understand since the spin is conserved when θ is zero.

Total spin is not conserved• However, the amplitudes at non-zero

scattering angle θ are different when the orientation of the total spin takes different values, which implies the total spin is not conserved in the S-wave approximation in the relativistic framework.

Partial wave analysis

• In the partial wave analysis, I calculate the amplitudes with different spins:

• <1,0; ½, ½|T|1,0; ½, ½>,• <1,1; ½, ½|T|1,1; ½, ½>,• <1,-1; ½, ½|T|1,-1; ½, ½>,• <1,1; ½, -½|T|1,0; ½, ½>,• <1,0; ½, -½|T|1,-1; ½, ½>.

S=0 and I=1/2 channel

Partial wave analysis

• Since the spins are not conserved in the interaction process, for example, the amplitudes <1,1; ½, ½|T|1,1; ½, ½>

• and <1,-1; ½, -½|T|1,-1; ½, -½> take different values at a fixed total energy in the center of mass system, the results might depend on the choice of the spins of the initial and final states. It means we can only obtain some approximate results.

•

•

• Thanks