Really nice problem in my opinion. First with drawing a nice diagram we can see that BC should be tangent to k. On the other side we have PQX=XBD=XAP so we can conlude that BD is tangent to circumcircle of AXB. We have QC is tangent to to circumcircle of AYC too. Let F be a point on BC (F is between D and E) such that DF=BD. Because of given condition FE=EC. Using power of point we have that DF is tangent to circumcircle of AXF and EF is tangent to circumcircle of AYF and XFD=XAF and YFE=YAF gives us that AXFY is cyclic. So F belongs to k and BC is tangent to. Now using power of point we have: BF^2/CF^2=BP×AB/CQ×AC=AB^2/AC^2 (because of Thales BP/CQ=AB/AC) so BF/CF=AB/AC so AF is angle bisector by angle bisector lemma and we are done.