I'm having trouble getting my shapes to work for a Dirichlet Process Gaussian Mixture Model. My data `observations`

has shape `(number of samples, number of dimensions)`

. Each Gaussian's mean should be drawn from an isotropic prior, and each Gaussian's covariance should be the identity matrix. I thought I set this up correctly, but I'm getting the following error:

`Input dimension mis-match. (input[0].shape[1] = 13, input[1].shape[1] = 2)`

My code is:

```
import numpy as np
import pymc3 as pm
import theano.tensor as tt
num_obs, obs_dim = observations.shape
max_num_clusters = 13
def stick_breaking(beta):
portion_remaining = tt.concatenate([[1], tt.extra_ops.cumprod(1 - beta)[:-1]])
return beta * portion_remaining
with pm.Model() as model:
w = pm.Deterministic("w", stick_breaking(beta))
cluster_means = pm.MvNormal(f'cluster_means',
mu=pm.floatX(np.zeros(obs_dim)),
cov=pm.floatX(gaussian_mean_prior_cov_scaling * np.eye(obs_dim)),
shape=(max_num_clusters, obs_dim))
comp_dists = pm.MvNormal.dist(mu=cluster_means,
cov=gaussian_cov_scaling * np.eye(obs_dim),
shape=(max_num_clusters, obs_dim))
obs = pm.Mixture(
"obs",
w=w,
comp_dists=comp_dists,
observed=observations,
shape=obs_dim)
```

Can someone clarify how to get the shapes to work?