Note: If anyone can double-check my numbers and result at the end of this answer, that would be much appreciated.
This looks like a question that can be broken down as per your bullet points, so I think I'll do it like that.
Is earth's gravity strong enough to have a second moon further from us than our current moon?
As JDługosz pointed out, the answer to this depends on whether or not the moon is inside Earth's Hill sphere, the region in which it can hold satellites in stable orbits. The general formula for a body of mass $m$ orbiting a body of mass $M$ with a semi-major axis of $a$ is
$$r\approx a\sqrt[3]{\frac{M}{3m}}$$
For Earth, this is[1]
$$r_{\oplus}\approx a_{\oplus}\sqrt[3]{\frac{M_{\odot}}{3m_{\oplus}}}=1.496\times10^{9}\text{ meters}$$
This is roughly one tenth of the distance to the Sun (and four times the Moon's orbital radius). It doesn't take into account influences from the other planets, but that shouldn't be an issue. After all, Venus and Mars are both much further than 0.1 AU away from Earth, even at their closest passes.
Regarding your request for different angular velocities: Two bodies in circular orbits with different radii will always move at different angular and tangential velocities, so you're fine there.
Is there a certain size it would have to be?
So long as the mass of the extra moon is much less than that of the planet, there should be no ill effects on either Earth or the Moon. Any non-zero mass will perturb the orbit of the Earth a bit, so there's no cutoff line. You just have to specify what limit is okay with you.
It's interesting to think of the effects of the moon on the Moon. I have something to say on the subject - something that I've been meaning to write about for a while - but I'll make that a separate section.
Can an orbit like this be stable? (two moons, one half the size of the moon and moving at different speeds, relative to earth)
Well, yes, it can - again, so long as the moon is far enough away from the Moon. The places where the setup are unstable can be found easily - again, this will come later. The short answer, though, is that this should be perfectly safe. Just use Newton's law of gravitation:
$$F=G\frac{m_{\text{Moon}}\frac{1}{2}m_{\text{Moon}}}{(r_{\text{Moon}}-r_{\text{moon}})^2}$$
This gives you the force at closest approach - which should be minimal, for large enough values of $r_{\text{moon}}$.
Here's the section on stability - the stability of the Moon's orbit - which I alluded to earlier. I'm going to base it strongly off of these lecture notes.
Here, we use the disturbing function, which has the same magnitude as the gravitational potential from the perturbing1 body - in this case, the extra moon. The general form of it is
$$\mathcal{R}=-\frac{Gm_{12}m_3}{R}+\frac{Gm_2m_3}{|\mathbf{R}-\alpha_1\mathbf{r}|}+\frac{Gm_1m_3}{|\mathbf{R}+\alpha_2\mathbf{r}|}\tag{1}$$
where the subscripts $_1$, $_2$, and $_3$ refer to Earth, the Moon, and the moon, respectively, $m_{ij}=m_i+m_j$, $\alpha_i=m_i/m_{12}$.
To analyze this, we have to expand it - basically, write it in another form using summations and functions called spherical harmonics. For those interested, the lecture notes provide a full derivation, but to make it short, the intermediate expansion is
$$\mathcal{R}=G\mu_im_3\sum_{l=2}^{\infty}\sum_{m=-l}^l\left(\frac{4\pi}{2l+1}\right)\mathcal{M}_l\left(\frac{r^l}{R^{l+1}}\right)Y_{lm}(\theta,\varphi)Y_{lm}^*(\Theta,\psi)\tag{2}$$
where
$$\mathcal{M}_l=\frac{m_1^{l-1}+(-1)^lm_2^{l-1}}{m_{12}^{l-1}}$$
and $Y_{ab}(\beta,\gamma)$ is a spherical harmonic.
Why do we care? Good question. The disturbing function allows us to identify orbital resonances2, which can help a system stay stable.
To do this, we have the expand the disturbing function again, this time as a Fourier expansion. We get
$$\mathcal{R}=G\mu_im_3\sum_{l=2}^{\infty}\sum_{m=-l}^{l}c_{lm}M_l\left(r^le^{imf_i}\right)\left(\frac{e^{-imf_o}}{R^{l+1}}\right)e^{im(\varpi_i-\varpi_o)}\tag{3}$$
where
$$c_{lm}=\frac{(l-m)!}{(l+m)!}[P_l^m(0)]^2$$
where $P_l^m(x)$ is an associated Legendre polynomial and $f$ and $\varpi$ are orbital elements.
This can all be expanded further by way of . . . am I boring you? Well, I'll skip to the good bit. I just wanted to emphasize that this one little function contains a lot of information.
We eventually arrive at a function $\phi_{n'nm}$ that is called the resonance angle, given by
$$\phi_{n'nm}=n'M_i-nM_o+m(\varpi_i-\varpi_o)\tag{4}$$
$M$ is the mean anomaly and $\varpi$ is the argument of periapsis.
We can find the rate of change of this with respect to time, $\dot{\phi}$, and then write a function $\mathcal{E}$ as
$$\mathcal{E}=\frac{1}{2}\dot{\phi}^2-\omega^2(\cos\phi+1)$$
There are three possible classes of values of $\mathcal{E}$:
- $\mathcal{E}>0$: The system is circulating.
- $\mathcal{E}<0$: The system is librating.
- $\mathcal{E}=0$: The system is at an unstable equilibrium (think of a pendulum pointed straight up).
We can then write down another equation where
$$\ddot{\phi}\propto\sin\phi$$
The associated $\mathcal{E}$ tells us if the system is stable.
There's an explicit stability algorithm by the author of the lecture notes in a related paper (see Mardling (2008) using a different expansion. It should be able to give you a yes-or-no answer for resonant stability for given orbits of the Moon and the moon. I'll see if I can apply it here.
The precise algorithm is
(1) Identify which $[n : 1](2)$ resonance the system is near and calculate the distance $\delta_{\sigma n}$ from that resonance: $\delta_{\sigma n} =\sigma-n$, where $n = \lfloor\sigma\rfloor$. (the nearest integer for which $n \leq \sigma$);
(2) Take the associated resonance angle to be zero rather than the definition (2.18) (see discussion below): $\phi_{2n1} = 0$;
(3) Calculate the induced eccentricity from (5.1) and (if $m_1 = m_2$) the maximum octopole eccentricity from (5.3). Determine $e_i = \text{max}[e^{(ind)}_i, e^{(oct)}_i]$ for use in $s^{(22)}_1 (e_i)$;
(4) Calculate $\mathcal{A}_{2n1}$ from (3.6);
(5) Calculate $\mathcal{E}_{2n1}$ and $\mathcal{E}_{2 \ n+1\ 1}$: deem the system unstable if $\mathcal{E}_{2n1} < 0$ and $\mathcal{E}_{2 \ n+1\ 1} < 0$.
I've run some numbers, and gone through a resonance or two. Mardling focused on $[n:1](2)$ resonances, which are important here. I found that for a $[2:1](2)$ resonance, the system is unstable at most eccentricities, but it seems - judging from some of the graphs given - that at higher resonances, the system is perfectly stable.
I ran through a certain combination of values to test for stability; it would be awesome of someone could check them. Here they are, with intermediate values (the subscripts $_i$ and $_o$ refer to the inner and outer satellites, the Moon and the moon).
The given data are (I've chosen the last two):
$$m_1=m_{\text{Earth}}=5.9722\times10^{24}\text {kg}=81.285 m_2$$
$$m_2=7.3462\times10^{22}=1m_2$$
$$m_3\equiv\frac{1}{2}m_2$$
$$e_i(0)=0.0549$$
$$e_o(0)=0.01$$
$$a_o=2.75a_i$$
The intermediate values are:
$$\sigma=4.5466$$
$$n=\lfloor\sigma\rfloor=4$$
$$\delta\sigma_4=\sigma-4=0.5466$$
$$n=4,n'=1,m=2$$
$$e_i^{(eq)}=0.02206$$
$$A=1.4891$$
$$e_i^{(oct)}=0.09902$$
$$l=l_{min}=2$$
$$s_{224}=0.44833$$
$$F_4^{(22)}(e_o)=2.712\times10^{-6}$$
$$f_4^{(22)}(e_o)=2.6513\times10^{-6}$$
$$\beta_4=5.6513\times10^{-8}$$
$$e_i^{(ind)}=0.0549$$
$$e_i=\text{max}[e_i^{(ind)},e_i^{(oct)}]=e_i^{(oct)}=0.09902$$
$$s_4^{(22)}(e_i)=-0.16443$$
$$\mathcal{M}_2=1$$
$$M_i^{(2)}=0.006114$$
$$M_o^{(2)}=0.0119568$$
$$\sigma_4=1$$
$$c_{(22)}=\frac{3}{8}$$
$$\mathcal{A}_{241}=3.9059\times10^{-8}$$
$$\delta\sigma_{41}=\sigma-n/n'=0.5466$$
$$\bar{\mathcal{E}}_{241}=0.1493857019$$
This is greater than zero, so the system is stable.
Update, 28 October 2016
I've been going through and checking some of these numbers again, in the process of trying to write an algorithm around this, and I'm fairly certain that there are some errors, potentially including (and thus starting with) $s_4^{(22)}(e_i)$. This may mean that the system is unstable, as kingledion's results show.
I've been running some simulations of my own, using the European Space Agency's open source ORSA software. I've only done four or five runs over shot periods of time, but they're starting to fall into two categories: Either the secondary moon is slowly ejected, or the two go into separate elliptical orbits, with periodic changes in eccentricity and semi-major axes. For the sake of accuracy, I've only run the simulations over one year, but it seems like there may be stable setups and there may be unstable setups.
Additionally, I haven't included the Sun in this, so I don't know how it could change any of this.
1 In this case, I'm talking about perturbing the Moon.
2 Specifically, orbit-orbit resonances.
