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We give a simple way to study the isotypical components of the homology of simplicial complexes with actions of finite groups and use it for Milnor fibres of isolated complete intersection singularity (icis). We study the homology of images of mappings ft that arise as deformations of complex map germs 
$f:(\mathbb{C}^n,S)\to(\mathbb{C}^p,0)$, with n < p, and the behaviour of singularities (instabilities) in this context. We study two generalizations of the notion of image Milnor number µI given by Mond and give a workable way of compute them, in corank one, with Milnor numbers of icis. We also study two unexpected traits when 
$p \gt n+1$: stable perturbations with contractible image and homology of 
$\text{im} f_t$ in unexpected dimensions. We show that Houston’s conjecture, µI constant in a family implies excellency in Gaffney’s sense, is false, but we give a correct modification of the statement of the conjecture which we also prove.
