Coordinate-wise Armijo's condition

Abstract

Let z=(x,y) be coordinates for the product space Rm1× Rm2. Let f:Rm1× Rm2→ R be a C1 function, and ∇ f=(∂ xf,∂ yf) its gradient. Fix 0<α <1. For a point (x,y) ∈ Rm1× Rm2, a number δ >0 satisfies Armijo's condition at (x,y) if the following inequality holds: eqnarray* f(x-δ ∂ xf,y-δ ∂ yf)-f(x,y)≤ -α δ (||∂ xf||2+||∂ yf||2). eqnarray* When f(x,y)=f1(x)+f2(y) is a coordinate-wise sum map, we propose the following coordinate-wise Armijo's condition. Fix again 0<α <1. A pair of positive numbers δ 1,δ 2>0 satisfies the coordinate-wise variant of Armijo's condition at (x,y) if the following inequality holds: eqnarray* [f1(x-δ 1∇ f1(x))+f2(y-δ 2∇ f2(y))]-[f1(x)+f2(y)]≤ -α (δ 1||∇ f1(x)||2+δ 2||∇ f2(y)||2). eqnarray* We then extend results in our recent previous results, on Backtracking Gradient Descent and some variants, to this setting. We show by an example the advantage of using coordinate-wise Armijo's condition over the usual Armijo's condition.