entropy

# Entropy ## When to Use Use this skill when working on entropy problems in information theory. ## Decision Tree 1. **Shannon Entropy** - H(X) = -sum p(x) log2 p(x) - Maximum for uniform distribution: H_max = log2(n) - Minimum = 0 for deterministic (one outcome certain) - `scipy.stats.entropy(p, base=2)` for discrete 2. **Entropy Properties** - Non-negative: H(X) >= 0 - Concave in p - Chain rule: H(X,Y) = H(X) + H(Y|X) - `z3_solve.py prove "entropy_nonnegative"` 3. **Joint and Conditional Entropy** - H(X,Y) = -sum sum p(x,y) log2 p(x,y) - H(Y|X) = H(X,Y) - H(X) - H(Y|X) <= H(Y) with equality iff independent 4. **Differential Entropy (Continuous)** - h(X) = -integral f(x) log f(x) dx - Can be negative! - Gaussian: h(X) = 0.5 * log2(2*pi*e*sigma^2) - `sympy_compute.py integrate "-f(x)*log(f(x))" --var x` 5. **Maximum Entropy Principle** - Given constraints, max entropy distribution is least biased - Uniform for no constraints - Exponential for E[X] = mu constraint - Gaussian for E[X], Var[X] constraints ## Tool Commands ### Scipy_Entropy ```bash uv run python -c "from scipy.stats import entropy; p = [0.25, 0.25, 0.25, 0.25]; H = entropy(p, base=2); print('Entropy:', H, 'bits')" ``` ### Scipy_Kl_Div ```bash uv run python -c "from scipy.stats import entropy; p = [0.5, 0.5]; q = [0.9, 0.1]; kl = entropy(p, q); print('KL divergence:', kl)" ``` ### Sympy_Entropy ```bash uv run python -m runtime.harness scripts/sy...