For a local field F and an Artinian local coefficient ring Λ with the same positive residue characteristic p we define, for any e∈ℕ, a category ℭ(e)(Λ) of GL 2(F)-equivariant coefficient systems on the Bruhat-Tits tree X of PGL 2(F). There is an obvious functor from the category of GL 2(F)-representations over Λ to ℭ(e)(Λ). If F=ℚp then ℭ(1)(Λ) is equivalent to the category of smooth GL 2(ℚp)-representations over Λ generated by their invariants under a pro-p-Iwahori subgroup. For general F and e we show that the subcategory of all objects in ℭ(e)(Λ) with trivial central character is equivalent to a category of representations of a certain subgroup of Aut (X) consisting of “locally algebraic automorphisms of level e”. For e=1 there is a functor from this category to that of modules over the (usual) pro-p-Iwahori Hecke algebra; it is a bijection between irreducible objects.

Finally, we present a parallel of Colmez' functor V↦𝐃(V): to objects in ℭ(e)(Λ) (for any F) we assign certain étale (ϕ,Γ)-modules over an Iwasawa algebra 𝔬[[N^0,1(1)]] which contains the (usually considered) Iwasawa algebra 𝔬[[N0]]. This assignment preserves finite generation.