Is there a quasistatic process that is not reversible?
Most quasi-static processes are irreversible. The issue comes down to the following: the term quasi-static applies to the description of a single system undergoing a process, whereas the term irreversible applies to the description of the process as a whole, which often involves multiple interacting systems.
In order to use the term quasi-static, one has to have a certain system in mind. A system undergoes a quasi-static process when it is made to go through a sequence of equilibrium states.
A process is irreversible if either (a) the system undergoes a non-quasi-static process, (b) the system undergoes a quasi-static process but is exchanging energy with another system that is undergoing a non-quasi-static process, or (c) two systems are exchanging energy irreversibly, usually via heat flow across a finite temperature difference.
One can imagine a (admittedly idealized, as most of basic thermodynamics in physics) process in which two systems undergo quasi-static processes while exchanging energy via heat due to a finite temperature difference between them. The irreversibility comes about due heating due to the temperature difference between them rather than due to irreversibilities inside each system.
In your question you mentioned two examples -- (1) slowly moving something that has friction, and (2) gradually mixing two chemicals that react spontaneously ($\Delta G\gg0$).
Then you said neither of these count as quasi-static because of (1) stiction, and (2) minimum droplet size due to surface tension.
I see your objections as pointless nitpicking. First, with slight creativity, we can get around these objections. (1) Instead of friction between two solids, call it viscous drag of a solid in a liquid. (2) Put the acid and base on two sides of a barrier with extraordinarily small pores in it, such that one molecule passes through every minute. OK, you'll say, but that's still one molecule at a time, not truly infinitesimal. That brings us to the second point, which is that you can do this kind of nitpicking with any so-called quasi-static process. Take an ideal Carnot engine. It's ideal! It has perfectly-insulating walls and perfectly-frictionless pistons and infinite reservoirs with infinitesimally slow heat transfer. None of these things are physically possible!
The whole notion of "quasi-static" is an ideal which is conceptually useful even if it is kinda inconsistent with practical realities in many (perhaps all) cases.
What we mean by "quasi-static" is really: Start with fast change, and make it slower and slower, and see what the limit is as rate goes to zero. If a Carnot engine has the same efficiency at one cycle per minute, per week, and per century, we can safely extrapolate that an ideally-quasi-static Carnot engine, with one cycle per eternity, would have the same efficiency. The latter may not be physically possible for various reasons, but that's OK, we don't need to actually imagine building it.
Likewise, if mixing chemicals together over the course of one hour releases the same amount of heat (within 0.0001%) as over the course of one month, we can say that both mixing processes are essentially quasi-static, and nobody really cares whether or not it's physically possible to mix them together smoothly over the course of 500 millenia.
There are several definitions for quasi-static. They are not equivalent. There is some confusion about it in the literature, notably on Wikipedia's page.
First, before you ask if quasi-static implies reversible, you must make clear you are talking about the same system. March's answer explains this. I'll focus on the question once this confusion is cleared: you are talking about the same system.
As far as I know, the word reversible does not make sense for a non thermally isolated system. Hence you must choose a thermally isolated system, in other words, an adiabatic process. If a sub-system is not thermally isolated, then consider the larger system. Now we're ready to get at the core of the question.
Among all the definitions for quasi-static we find:
- the equilibrium is sufficient at each infinitesimal step for the macroscopic variables (such as temperature) to be defined. Not clear: for each sub-system, for the global system?
- the motion is very slow.
- the change is slow enough so that the system is at equilibrium at each infinitesimal step
I'll focus the latest definition, which I'll call "truly quasi-static". With this definition, quasi-static is equivalent to reversible. Let's focus on the statistical mechanics foundations (with classical mechanics as a background). In statistical mechanics, a "truly quasi-static" process can be defined as:
"The process is equivalent to a progressive change in the system's Hamiltonian that is:
- Adiabatic : the change does not depend on the unknown micro-state (position in the phase space).
- slow and smooth enough so that the system has time to go through its full energy orbit (in the phase space) for each infinitesimal change in the Hamiltonian. In other words the system can be considered at equilibrium at each infinitesimal step."
This is officially the definition of "adiabatic reversible". When you write $dU = -PdV$ ($V$ is any variable the Hamiltonian depends on and $P$ is the generalized force), you mean this kind of process. Even though this defines "reversible", it is interesting because it does so thanks to an intuitive concept of quasi staticity (slow change) instead of the intuitive concept of reversibility (the reversed process leads to the initial state). The two definitions are equivalent. This constitutes a theorem.
Usual examples :
- moving the piston of an insulated gas chamber (much slower than the speed of sound).
- moving a piston of a gas chamber in thermal contact with another gas (slow enough to allow thermal equilibrium at each step). In this example, the system under consideration is the union of the two gases.
- Counter-example : the irreversible Joule (free) expansion
This definition excludes heat transfer, since in the case of heat, the Hamiltonian varies in a way that depends on the micro-state (during each collision with a mollecule from the other system for example). It excludes friction. If the motion happens to be very slow but the pores are very small, then the Hamiltonian varies abruptly. It also excludes this interesting case mentioned by Huang : “a gas that freely expands into successive infinitesimal volume elements”. Indeed, if the potential wall is smooth, this cannot be a free expansion but a usual reversible expansion.
Now, consider this definition of quasistatic : "The system is at equilibrium during the process (so that temperatue and other variables are defined almost everywhere) except possibly in small places where some irreversibility happens".
This allows friction and viscosity. With this definition, you can say that quasistatic does not imply reversible.