Boundary Cochains and the Toeplitz Index on the Half-Lattice

Abstract

We study the operator algebra of a rank-one boundary defect in a semi-infinite tight-binding chain, T=U+ E on 2(Z 0), with U the forward unilateral shift and E= e0,· e0. The Lie algebra A=span\UaE(U*)b,\,Un\ has finitely supported, trace-zero commutators, the noncommutativity confined to the boundary and vanishing on the bulk. To each site we attach a 2-cochain ωj(X,Y)= ej,[X,Y]ej; each is a Chevalley--Eilenberg coboundary, yet H2(A,C) is infinite-dimensional, carried by the abelian bulk and classifying the central extensions. On the polynomial Toeplitz algebra obtained by adjoining U*, the total cochain Σjωj(Tf,Tg) equals the symbol pairing 12πi f\,dg, which for conjugate symbols g=1/f is the Fredholm index; the ωj thus form a site-resolved index density, ωj(Un,(U*)n)=-1\j<n\, localized at the edge. For modulated couplings with j c, the index is fixed by the bulk limit and undergoes a topological transition as |c| crosses~1, independently of the boundary profile.