```python
import numpy as np

# Grid parameters
nx = 100
ny = 100
nt = 1000
dx = 2.0/(nx-1)
dy = 2.0/(ny-1)
dt = 0.0003

# Initialize arrays
x = np.linspace(0, 2, nx)
y = np.linspace(0, 2, ny)
X, Y = np.meshgrid(x, y)

u = np.ones((ny, nx))
v = np.ones((ny, nx))

# Set initial conditions
u[(Y>=0.5) & (Y<=1) & (X>=0.5) & (X<=1)] = 2.0
v[(Y>=0.5) & (Y<=1) & (X>=0.5) & (X<=1)] = 2.0

# Time stepping
for n in range(nt):
    # Copy values
    un = u.copy()
    vn = v.copy()
    
    # Update interior points
    u[1:-1,1:-1] = un[1:-1,1:-1] - \
                   dt*un[1:-1,1:-1]*(un[1:-1,1:-1]-un[1:-1,0:-2])/dx - \
                   dt*vn[1:-1,1:-1]*(un[1:-1,1:-1]-un[0:-2,1:-1])/dy
                   
    v[1:-1,1:-1] = vn[1:-1,1:-1] - \
                   dt*un[1:-1,1:-1]*(vn[1:-1,1:-1]-vn[1:-1,0:-2])/dx - \
                   dt*vn[1:-1,1:-1]*(vn[1:-1,1:-1]-vn[0:-2,1:-1])/dy
    
    # Boundary conditions
    u[0,:] = 1  # Bottom
    u[-1,:] = 1 # Top
    u[:,0] = 1  # Left
    u[:,-1] = 1 # Right
    
    v[0,:] = 1  # Bottom
    v[-1,:] = 1 # Top
    v[:,0] = 1  # Left
    v[:,-1] = 1 # Right

# Save final solutions
np.save('u.npy', u)
np.save('v.npy', v)
```