SUBROUTINE rings(ngrid, declin, ptime, rad, flat, eclipse) ! Calculates Saturn's rings shadowing ! Includes rings opacities measured by Cassini/UVIS ! Authors: M. Sylvestre, M. Capderou, S. Guerlet, A. Spiga use comdiurn_h use comgeomfi_h implicit none INTEGER, INTENT(IN) :: ngrid ! horizontal grid dimension REAL, INTENT(IN) :: declin ! latitude of the subsolar point REAL, INTENT(IN) :: ptime ! UTC time in sol fraction : ptime=0.5 at noon REAL, INTENT(IN) :: rad ! equatorial radius of the planet REAL, INTENT(IN) :: flat ! flattening of the planet REAL, DIMENSION(ngrid), INTENT(OUT) :: eclipse ! absorption of the light by the rings REAL :: rpol ! polar radius of the planet REAL :: e ! shape excentricity of the planet : (1-e*e) = (1-f)*(1-f) INTEGER, PARAMETER :: nb_a = 4 ! number of subdivisions of the A ring INTEGER, PARAMETER :: nb_b = 3 ! number of subdivisions of the B ring INTEGER, PARAMETER :: nb_c = 3 ! number of subdivisions of the C ring INTEGER, PARAMETER :: nb_ca = 2 ! number of subdivisions in the Cassini division INTEGER :: i ! arrays for the rings. TBD: dynamical? REAL, DIMENSION(nb_a) :: A_Rint ! internal radii of the subdivisions of the A ring REAL, DIMENSION(nb_a) :: A_Rext ! external radii of the subdivisions of the A ring REAL, DIMENSION(nb_b) :: B_Rint ! internal radii of the subdivisions of the B ring REAL, DIMENSION(nb_b) :: B_Rext ! external radii of the subdivisions of the B ring REAL, DIMENSION(nb_c) :: C_Rint ! internal radii of the subdivisions of the C ring REAL, DIMENSION(nb_c) :: C_Rext ! external radii of the subdivisions of the C ring REAL, DIMENSION(nb_ca) :: Ca_Rint ! internal radii of the subdivisions of the Cassini Division REAL, DIMENSION(nb_ca) :: Ca_Rext ! external radii of the subdivisions of the Cassini Division ! Opacities of the rings : for each one we can give different opacities for each part REAL, DIMENSION(nb_a) :: tau_A ! opacity of the A ring REAL, DIMENSION(nb_b) :: tau_B ! opacity of the B ring REAL, DIMENSION(nb_c) :: tau_C ! opacity of the C ring REAL, DIMENSION(nb_ca) :: tau_Ca ! opacity of the Cassini Division ! Parameters used to calculate if a point is under a ring subdivision's shadow REAL :: phi_S ! subsolar point longitude REAL, PARAMETER :: pi=acos(-1.0) REAL, DIMENSION(:), ALLOCATABLE:: x, y, z ! cartesian coordinates of the points on the planet REAL :: xs, ys, zs ! cartesian coordinates of the points of the subsolar point REAL, DIMENSION(:), ALLOCATABLE :: k REAL, DIMENSION(:), ALLOCATABLE :: N ! parameter to compute cartesian coordinates on a ellipsoidal planet REAL, DIMENSION(:), ALLOCATABLE :: r ! distance at which the incident ray of sun crosses the equatorial plane ! measured from the center of the planet REAL :: Ns ! (same for the subsolar point) ! equinox --> no shadow (AS: why is this needed?) if(declin .eq. 0.) then eclipse(:) = 0. return endif ! 1) INITIALIZATION ! Generic rpol = (1.- flat)*rad e = sqrt(2*flat - flat**2) ALLOCATE(x(ngrid)) ALLOCATE(y(ngrid)) ALLOCATE(z(ngrid)) ALLOCATE(k(ngrid)) ALLOCATE(N(ngrid)) ALLOCATE(r(ngrid)) eclipse(:) = 2000. ! Model of the rings with Cassini/UVIS opacities ! Size of the rings A_Rint(1) = 2.03*rad A_Rext(1) = 2.06*rad A_Rint(2) = 2.06*rad A_Rext(2) = 2.09*rad A_Rint(3) = 2.09*rad A_Rext(3) = 2.12*rad A_Rint(4) = 2.12*rad A_Rext(4) = 2.27*rad B_Rint(1) = 1.53*rad B_Rext(1) = 1.64*rad B_Rint(2) = 1.64*rad B_Rext(2) = 1.83*rad B_Rint(3) = 1.83*rad B_Rext(3) = 1.95*rad C_Rint(1) = 1.24*rad C_Rext(1) = 1.29*rad C_Rint(2) = 1.29*rad C_Rext(2) = 1.43*rad C_Rint(3) = 1.43*rad C_Rext(3) = 1.53*rad Ca_Rint(1) = 1.95*rad Ca_Rext(1) = 1.99*rad Ca_Rint(2) = 1.99*rad Ca_Rext(2) = 2.03*rad ! Opacities of the rings tau_A(1) = 1.24 tau_A(2) = 0.81 tau_A(3) = 0.67 tau_A(4) = 0.58 tau_B(1) = 1.29 tau_B(2) = 5.13 tau_B(3) = 2.84 tau_C(1) = 0.06 tau_C(2) = 0.10 tau_C(3) = 0.14 tau_Ca(1) = 0.06 tau_Ca(2) = 0.24 ! Convert to cartesian coordinates N(:) = rad / sqrt(1-(e**2)*sinlat(:)**2) x(:) = N(:)*coslat(:)*coslon(:) y(:) = N(:)*coslat(:)*sinlon(:) z(:) = N(:)*(1-e**2)*sinlat(:) ! 2) LOCATION OF THE SUBSOLAR POINT ! subsolar longitude is deduced from time fraction ptime ! SG: the minus sign is important! ... otherwise subsolar point adopts a reverse rotation phi_S = -(ptime - 0.5)*2.*pi ! write(*,*) 'subsol point coords : ', declin*180./pi, phi_S*180./pi ! subsolar latitude is declin (declination of the sun) ! now convert in cartesian coordinates : Ns = rad/sqrt(1-(e**2)*sin(declin)**2) xs = Ns*cos(declin)*cos(phi_S) ys = Ns*cos(declin)*sin(phi_S) zs = Ns*(1-e**2)*sin(declin) ! 3) WHERE DOES THE INCIDENT RAY OF SUN CROSS THE EQUATORIAL PLAN ? k(:) = -z(:)/zs r(:) = (k(:)*xs + x(:))**2 + (k(:)*ys + y(:))**2 r(:) = sqrt(r(:)) ! 4) SO WHERE ARE THE SHADOW OF THESE RINGS ? ! Summer hemisphere is not under the shadow of the rings where(lati(:)*declin .gt. 0.) eclipse(:) = 1000. end where ! No shadow of the rings by night where(x(:)*xs + y(:)*ys + z(:)*zs .lt. 0.) eclipse(:) = 1000. end where ! if the incident rays of sun cross a ring, there is a shadow do i=1, nb_A where(r(:) .ge. A_Rint(i) .and. r(:) .le. A_Rext(i) .and. eclipse(:) .ne. 1000.) eclipse(:) = 1. - exp(-tau_A(i)/abs(sin(declin))) end where end do do i=1, nb_B where(r(:) .ge. B_Rint(i) .and. r(:) .le. B_Rext(i) .and. eclipse(:) .ne. 1000.) eclipse(:) = 1. - exp(-tau_B(i)/abs(sin(declin))) end where enddo do i=1, nb_C where(r(:) .ge. C_Rint(i) .and. r(:) .le. C_Rext(i) .and. eclipse(:) .ne. 1000.) eclipse(:) = 1. - exp(-tau_C(i)/abs(sin(declin))) end where enddo do i=1, nb_ca where(r(:) .ge. Ca_Rint(i) .and. r(:) .le. Ca_Rext(i) .and. eclipse(:) .ne. 1000.) eclipse(:) = 1. - exp(-tau_Ca(i)/abs(sin(declin))) end where enddo ! At the other places and the excluded ones, eclipse is 0. where(eclipse(:) .eq. 2000. .or. eclipse(:) .eq. 1000.) eclipse(:) = 0. end where ! 5) CLEAN THE PLACE DEALLOCATE(x) DEALLOCATE(y) DEALLOCATE(z) DEALLOCATE(k) DEALLOCATE(N) DEALLOCATE(r) END SUBROUTINE rings