How can a bicycle keep its momentum while changing direction?

Your momentum is not conserved because there are external forces acting on the you + bicycle system. Though there are several external forces, the main one is friction.

The friction from the ground will will provide a torque and force on your bicycle, hence your angular momentum will not be conserved.

With no forces, the bicycle will travel in a straight line at constant speed. If a forces is applied forward, it will follow the same direction but speed up. If backward, it will slow down.

A sideways force is neither forward nor backward. It will neither speed the bike up, nor slow it down. It will change the direction.

There are of course forces with components in the direction of motion and perpendicular to it. The effect of such a force is the same as each force applied separately.

You can see this from energy as well.

$$P = vec{F} cdot vec{v}$$

If the angle between $vec{F}$ and $vec{v}$ is less than $pi/2$, then $P > 0$ and the bike gains kinetic energy. If the angle between $vec{F}$ and $vec{v}$ is greater than $pi/2$, then $P < 0$, and the bike loses kinetic energy. If the angle is exactly $pi/2$, then $vec{F} cdot vec{v} = P = 0$, and the kinetic energy stays constant.

Bicycles are designed so when you lean, the front wheel turns. This steers you in a circle. If you pedal hard enough to overcome friction, the net forward/backward force is $0$, and your speed stays constant.

If you go in a circle at constant speed, there is always a sideways centripetal force. In this case, the source is static friction from the wheel's contact with the street. (You couldn't turn on ice, where there is no friction.)

If you don't pedal as you turn, the sideways force still causes you to turn. But now there is also a net backward force that slows you as you proceed.