Provided by: palp_2.20-2_amd64
NAME
mori.x, mori-<num>d.x - star triangulations of a polytope P* in N
SYNOPSIS
mori.x [-<Option-string>] [in-file [out-file]]
DESCRIPTION
Mori cone of the corresponding toric ambient spaces intersection rings of embedded (CY) hypersurfaces The mori-<num>d.x variant programs, where <num> is one of 4, 5, 6 and 11 work in different dimensions ; mori.x defaults to dimension 6. Options (concatenate any number of them into <Option-string>): -h print this information -f use as filter -g general output: triangulation and Stanley-Reisner ideal -I incidence information of the facets (ignoring IPs of facets) -m Mori generators of the ambient space -P IP-simplices among points of P* (ignoring IPs of facets) -K points of P* in Kreuzer polynomial form -b arithmetic genera and Euler number -i intersection ring -c Chern classes of the (CY) hypersurface -t triple intersection numbers -d topological information on toric divisors & del Pezzo conditions -a all of the above except h, f, I and K -D lattice polytope points of P* as input (default CWS) -H arbitrary (also non-CY) hypersurface `H = c1*D1 + c2*D2 + ...' input: coefficients `c1 c2 ...' -M manual input of triangulation Input 1) standard: degrees and weights `d1 w11 w12 ... d2 w21 w22 ...' 2) alternative (use -D): `d np' or `np d' (d=Dimension, np=#[points]) and (after newline) np*d coordinates Output as specified by options
SEE ALSO
A complete manual is available here : http://arxiv.org/abs/1205.4147