# difference in mathematica between Inverse[_] and (_)^(-1) for WishartDistribution

Does anyone know why the following random distributions of matrices generate different plots? (This is code to generate a plot of the PDFs for first cells from a set of 10x10 matrices sampled using an inverse Wishart distribution; amazingly, the plots are different depending on the way one performs the matrix inverse - and it seems the right plots are obtained by Inverse[_], why?)

base code:

``````   << MultivariateStatistics`;
Module[{dist, p, k, data, samples, scale, graphics, distribution},
p = 10;
k = 13;
samples = 500;
dist = WishartDistribution[IdentityMatrix[p], k];
(* a samples x p x p array *)
data = Inverse[#] & /@ RandomVariate[dist, samples];
(* distribution graphics *)
distribution[i_, j_] := Module[{fiber, f, mean, rangeAll, colorHue},
fiber = data[[All, i, j]];
dist = SmoothKernelDistribution[fiber];
f = PDF[dist];
Plot[f[z], {z, -2, 2},
PlotLabel -> ("Mean=" <> ToString[Mean[fiber]]),
PlotRange -> All]
];
Grid @ Table[distribution[i, j], {i, 1, 3}, {j, 1, 5}]
]
``````

code variant: above, change line

``````data = Inverse[#] & /@ RandomVariate[dist, samples];
``````

by this

``````data = #^(-1) & /@ RandomVariate[dist, samples];
``````

and you will see the plotted distributions are different.

-

`Inverse` computes a matrix inverse, i.e. if `a` is a square matrix, then `Inverse[a].a` will be the identity matrix.
`a^(-1)` is the same as `1/a`, i.e. it gives you the reciprocal of each matrix element. The `^` operator gives powers element-wise. If you want a matrix power, use `MatrixPower`.