Contractivity, Complete Contractivity and Curvature inequalities

Abstract: Let $|\cdot|{\mathbf A}$ be a norm on $\mathbb C^m$ given by the formula $|(z_1,\ldots,z_m)|{\mathbf A}=|z_1A_1+\cdots+z_mA_m|{\rm op}$ for some choice of an $m$-tuple of $n\times n$ linearly independent matrices $\mathbf A=(A_1, \ldots, A_m).$ Let $\Omega\mathbf A\subset \mathbb C^m$ be the unit ball with respect to the norm $|\cdot|{\mathbf A}.$ %For a holomorphic function $f$ on $\Omega\mathbf A,$ let %$\rho_{V}(f):=\left ( %\begin{smallmatrix} %f(w)I_p& \sum_{i=1}^{m} \partial_if(w)V_{i} \ %0 & f(w)I_q %\end{smallmatrix}\right ),$ where $V_1, \ldots, V_m$ are $p\times q$ %matrices. Given $p\times q$ matrices $V_1, \ldots, V_m$ and a function $f \in \mathcal O(\Omega_\mathbf A),$ the algebra of function holomorphic on an open set $U$ containing the closed unit ball $\bar{\Omega}\mathbf A$ define $$\rho{V}(f):=\left ( \begin{smallmatrix} f(w)I_p& \sum_{i=1}^{m} \partial_if(w)V_{i} \ 0 & f(w)I_q \end{smallmatrix}\right ),$$ $w\in \Omega_\mathbf A.$ Clearly, $\rho_{V}$ defines an algebra homomorphism. We study contractivity (resp. complete contractivity) of such homomorphisms. The characterization of those balls in $\mathbb C^2$ for which contractive linear maps are always completely contractive remained open. We answer this question for balls of the form $\Omega_\mathbf A$ in $\mathbb C^2.$ The class of homomorphisms of the form $\rho_V$ arise from localization of operators in the Cowen-Douglas class of $\Omega.$ The (complete) contractivity of a homomorphism in this class naturally produces inequalities for the curvature of the corresponding Cowen-Douglas bundle. This connection and some of its very interesting consequences are discussed.