KIND=1 Spin Transfer Couplings

The definition of the KIND=1 spin transfer couplings is not given in the Computer Physics Reports article, so in versions after March 1998 these are redefined for IP3=0 or 1, and new Racah algebra factors included.

We want to calculate the coupling interactions of the monopole operator ${\bf S}([\ell,s_p]s_t,s_t)$ , where $s_p$ is the spin transfer of the projectile $I_p$ , $s_t$ is the spin transfer of the target $I_t$ , and $\ell$ is the orbital angular momentum transfer. These coupled operators are defined following in Bohr & Mottelson, Vol. 1, section 1A-5c, as

$\displaystyle (F_{\lambda_1} G_{\lambda_2})_{\lambda \mu} = \sum_{\mu_1 \mu_2}... ...a_2 \mu_2 \vert \lambda \mu \rangle F_{\lambda_1\mu_1} G_{\lambda_2\mu_2} \ ,$ (13)

applied for the case of $F_{s_t} = [\ell,s_p]s_t$ and $G_{s_t}=s_t$ . The overall ${\bf S}$ operator is a monopole (scalar), for which the tensor product is thus of the kind

$\displaystyle (F_{\lambda} G_{\lambda})_{00} = (2\lambda+1)^{-1/2} \sum_{\mu} (-1)^{\lambda-\mu} ~ F_{\lambda\mu} G_{\lambda-\mu} \ .$ (14)

This differs from common definitions (eg of Satchler) by a factor of $(-1)^\lambda (2\lambda+1)^{-1/2}$ .

Reduced matrix elements are defined everywhere in FRESCO by:

$\displaystyle \langle j_f m_f \vert \hat{O}_{\lambda \mu} \vert J_i m_i \rangle... ...j_f m_f \rangle ~ \langle j_f \vert\vert \hat{O}_\lambda \vert\vert j_i\rangle$ (15)

The matrix elements of this operator are

	$\displaystyle \langle(LI_p)J,I_t;J_TM_T \vert ~{\bf S}([\ell,s_p]s_t,s_t) ~\vert (L'I_p')J',I_t';J_TM_T \rangle$
$\textstyle =$	$\displaystyle (-1)^{s_t+J_T+J'+I_t} \left\{ \begin{array}{ccc} J' & I_t' & J_T ... ...rac{1}{\sqrt{4\pi}} ~ \hat{\ell} \hat{L} \langle L 0 \ \ell 0 \vert L'0 \rangle$
	$\displaystyle \times \langle I_p\vert\vert s_p\vert\vert I_p'\rangle \langle I_t\vert\vert s_t\vert\vert I_t'\rangle$	(16)

In using KIND=1 couplings with IP3=0, the first line of these factors is generated automatically.
The product of the reduced matrix elements for the intrinsic nuclear states, $\langle I_p\vert\vert s_p\vert\vert I_p'\rangle \langle I_t\vert\vert s_t\vert\vert I_t'\rangle$ , has to be included explicitly in the factor FSCALE, or in the radial form factors. The radial shapes have to be read in from data files.

With IP3=2, implying jlmP input for target-only couplings,

the projectile diagonal reduced matrix element $\langle I_p\vert\vert s_p=0\vert\vert I_p\rangle = \hat{I_p}$ is supplied by Fresco,
the factor $1/\sqrt{4\pi}$ is omitted above,
and an additional symmetric factor of $((2I_t'+1)(2I_t+1))^{1/4}$ is supplied to allow the monopole radial form factors to have their physical values for any target spin.
The forward and reverse form factors should be identical for Hermitian couplings.

With IP3=3, implying a similar input for projectile-only couplings,

the target diagonal reduced matrix element $\langle I_t\vert\vert s_t=0\vert\vert I_t\rangle = \hat{I_t}$ is supplied by Fresco,
the factor $1/\sqrt{4\pi}$ is omitted above,
and an additional symmetric factor of $((2I_t'+1)(2I_t+1))^{1/4}$ is supplied to allow the monopole radial form factors to have their physical values for any target spin. The forward and reverse form factors should be identical for Hermitian couplings.